Your search keyword '"Applied mathematics"' showing total 7,974 results

1. An electrical engineering perspective on naturality in computational physics.

Author

Kotiuga, P. Robert and Lahtinen, Valtteri

Abstract

We look at computational physics from an electrical engineering perspective and suggest that several concepts of mathematics, not so well-established in computational physics literature, present themselves as opportunities in the field. We discuss elliptic complexes and highlight the category theoretical background and its role as a unifying language between algebraic topology, differential geometry, and modelling software design. In particular, the ubiquitous concept of naturality is central. Natural differential operators have functorial analogues on the cochains of triangulated manifolds. In order to establish this correspondence, we derive formulas involving simplices and barycentric coordinates, defining discrete vector fields and a discrete Lie derivative as a result of a discrete analogue of Cartan’s magic formula. This theorem is the main mathematical result of the paper. [ABSTRACT FROM AUTHOR]

Published

2024

2. Splitting iteration methods to solve non-symmetric algebraic Riccati matrix equation YAY-YB-CY+D=0.

Author

Erfanifar, Raziyeh and Hajarian, Masoud

Subjects

*APPLIED mathematics, *ALGEBRAIC equations, *TRANSPORT theory, *MATRIX functions, *ENGINEERING mathematics, *RICCATI equation

Abstract

The non-symmetric algebraic Riccati equation (NARE) occurs in several areas of applied mathematics and engineering such as spectral factorizations of rational matrix functions, constructive rational matrix functions, transport theory, optimal controls, and structured stability radius. Using new weight splitting on matrices, we propose several efficient iterative methods for computing a solution of the NARE. Under suitable conditions, the proposed methods converge to the minimal non-negative solution of the NARE. Numerical examples indicate that the proposed methods are superior to the alternately linearized implicit iteration method and other splitting methods in terms of computational cost, accuracy, and CPU time. [ABSTRACT FROM AUTHOR]

Published

2024

3. Varieties with a Torus Action of Complexity One Having a Finite Number of Automorphism Group Orbits.

Author

Gaifullin, S. A. and Chunaev, D. A.

Subjects

*AUTOMORPHISM groups, *APPLIED mathematics, *ABELIAN groups, *FUNCTION algebras, *RING theory, *TORIC varieties, *RATIONAL points (Geometry)

Abstract

The article explores the conditions under which a specific type of variety, known as a trinomial variety, will have a finite number of automorphism group orbits. Trinomial varieties are defined as the spectrum of trinomial algebras, which are based on certain data. The authors provide examples of classes of varieties that have a finite number of orbits, such as algebraic groups, toric varieties, and spherical varieties. They also examine trinomial hypersurfaces and generalize previous results to prove a sufficient condition for the finiteness of the number of orbits on a trinomial variety. The authors discuss the connection between locally nilpotent derivations and automorphisms of the variety, and provide preliminary information on locally nilpotent derivations and trinomial varieties. The text is technical in nature and may be of interest to researchers studying algebraic geometry. [Extracted from the article]

Published

2024

4. Exploring Limit Cycles of Differential Equations through Information Geometry Unveils the Solution to Hilbert's 16th Problem.

Author

da Silva, Vinícius Barros, Vieira, João Peres, and Leonel, Edson Denis

Subjects

*DIFFERENTIABLE dynamical systems, *INFORMATION theory, *DIFFERENTIAL equations, *FISHER information, *DETECTION limit, *APPLIED mathematics

Abstract

The detection of limit cycles of differential equations poses a challenge due to the type of the nonlinear system, the regime of interest, and the broader context of applicable models. Consequently, attempts to solve Hilbert's sixteenth problem on the maximum number of limit cycles of polynomial differential equations have been uniformly unsuccessful due to failing results and their lack of consistency. Here, the answer to this problem is finally obtained through information geometry, in which the Riemannian metrical structure of the parameter space of differential equations is investigated with the aid of the Fisher information metric and its scalar curvature R. We find that the total number of divergences of | R | to infinity provides the maximum number of limit cycles of differential equations. Additionally, we demonstrate that real polynomial systems of degree n ≥ 2 have the maximum number of 2 (n − 1) (4 (n − 1) − 2) limit cycles. The research findings highlight the effectiveness of geometric methods in analyzing complex systems and offer valuable insights across information theory, applied mathematics, and nonlinear dynamics. These insights may pave the way for advancements in differential equations, presenting exciting opportunities for future developments. [ABSTRACT FROM AUTHOR]

Published

2024

5. Implementation and Linearization of a Coupled Panel and Vortex Particle Method in State-Space Form.

Author

Hussien, Hussien A. A. H., Cocco, Alessandro, and Saetti, Umberto

Abstract

This paper describes the implementation and linearization of a coupled panel and vortex particle method in a state-variable form. More specifically, the coupled panel and vortex particle dynamics are formulated as a nonlinear system of ordinary differential equations in first-order form to be self-contained and inherently linearizable. Linearization of this coupled panel and vortex particle method is demonstrated via finite differencing and a novel analytical linearization technique to yield a linear time-invariant representation. The code is implemented in MATLAB® and validated against an open-source aerodynamic solver for a fixed wing in both stationary and unsteady conditions. The linearized models are verified against the nonlinear dynamics both in the time and frequency domains. Linearized models accurately represent the wake dynamics about the equilibrium condition for moderate amplitude inputs and for input frequencies covering the typical frequency range of flight dynamics and flight controls, i.e., 0.3-30 rad/s. Analytical linearization is shown to abate the cost of linearization over perturbation methods by O(n2), where n is the total number of states of the system. Linearized models of the coupled panel and vortex particle dynamics have applications in the flight dynamics of both fixed- and rotary-wing vehicles, where these dynamics can be used to augment the rigid-body dynamics. The coupled rigid-body and wake dynamics can be leveraged to assess the stability, response characteristics, and handling qualities of vehicles experiencing aerodynamic interactions between rotors, wings, and/or obstacles. [ABSTRACT FROM AUTHOR]

Published

2024

6. Nonlinear Nonmodal Analysis of Hypersonic Flow over Blunt Cones.

Author

Scholten, Anton, Paredes, Pedro, Choudhari, Meelan M., Fei Li, Carpenter, Mark, and Bailey, Michelle

Abstract

The linear amplification of modal disturbances that lead to boundary-layer transition in two-dimensional/axisymmetric hypersonic configurations is strongly reduced by the presence of a blunt nose tip, and the mechanisms underlying the low Mack's second-mode N-factor values at the observed onset of transition over the cone frustum are currently unknown. Linear nonmodal analysis has shown that both planar and oblique traveling disturbances that peak within the entropy-layer experience appreciable energy amplification for moderate to large nose-tip bluntness. The present study extends the previous linear analysis by including the nonlinear effects. Specifically, the harmonic Navier-Stokes equations (HNSE) are solved with a fully implicit formulation and the Newton-Raphson method. The increased number of degrees of freedom for the nonlinear system presents difficulties for solution strategies based on direct solution of the linearized system. Such difficulties are overcome by using the generalized minimal residual method (GMRES) iterative method with a preconditioner corresponding to a simplified Jacobian without the cross-derivative terms. The HNSE solver is verified by comparing with nonlinear parabolized stability equation results for the nonlinear evolution of planar waves in an incompressible Blasius boundary layer and in a Mach 6 flow over a blunt cone. Finally, nonlinear nonmodal results are presented for planar traveling disturbances over a blunt cone configuration with reduced transition N factor as measured in wind-tunnel experiments. The nonmodal analysis demonstrates that entropy-layer disturbances generated close to the nose tip can seed the amplification of higher-frequency Mack's second-mode instabilities farther downstream and hence can lead to a reduction in the transition N factor. [ABSTRACT FROM AUTHOR]

Published

2024

7. Fuzzy Metric Spaces Of The Two-Fold Fuzzy Algebra.

Author

Al-Tameemi, Hazim M. Wali

Subjects

*METRIC spaces, *ALGEBRA, *GEOMETRIC connections, *APPLIED mathematics, *FUZZY sets, *VECTOR spaces

Abstract

This paper is dedicated to defining and studying for the first time the concept of fuzzy metric spaces based on two-fold fuzzy algebras, where the elementary properties of this new concept will be studied and presented by many theorems and related examples that explain the validity of our work. Also, many different types of open and closed balls will be discussed, as well as the relationships between these metric substructures. Keywords: fuzzy metric space, two-fold algebra, open ball, closed ball, torus Introduction and basic concepts The applications of neutrosophic sets and fuzzy sets are very wide and open research areas. In the literature, we can find many neutrosophic and fuzzy algebraic structures with deep connection with applied mathematics and number theory [5-11]. The concept of two-fold algebra was presented by Smarandache in [4], where many suggestions for the algebraic structure related to this algebra were defined and presented. This new idea has been used in [1] to study the two-fold algebra based on the standard fuzzy number theoretical system [3]. In [2], Hatip et.al. proposed the two-fold vector space and two-fold algebraic module based on fuzzy mappings, where they have studied the elementary properties of these new generalizations with many interesting examples. This work is motivated by the modern idea of two-fold algebra, and metric spaces, where we can combine those to different structures in one algebraic structure called two-fold. [ABSTRACT FROM AUTHOR]

Published

2024

8. Solution of Integral Equations of Fredholm Kind Involving Incomplete ℵ-Function, Generalized Extended Mittag-Leffler Function and S-Function.

Author

Kumar, Devendra and Dassani, Rishi

Subjects

*FREDHOLM equations, *SCHUR functions, *INTEGRAL transforms, *MELLIN transform, *APPLIED mathematics, *INTEGRAL equations

Abstract

The main objective of this paper is to solve Fredholm integral equations (IEs) that involve Sfunction, generalized extended Mittag-Leffler function (GEMLF), and incomplete ℵ-function as the kernel. These types of integral equations appear frequently in applied mathematics, particularly in mathematical physics, engineering, and finance. To solve these integral equations, we employ two powerful mathematical tools, namely fractional calculus (FC) and integral transforms. Specifically, we use the Weyl operator and Mellin transform to solve the integral equation associated with S-functions, GEMLF, and incomplete ℵ-functions. These techniques allow us to express the solution in a closed form, which is essential for practical applications. Moreover, we present several special cases of the solutions obtained, which provide additional insights into the behavior of the solutions. These results are significant for the study of integral equations, as they can be used to derive several known results. Furthermore, the techniques used in this study can be applied to other integral equations that involve different types of functions. [ABSTRACT FROM AUTHOR]

Published

2024

9. Investigating the invariant solutions of (1+1)-dimensional Sawada–Kotera model using Lie symmetries analysis.

Author

Nadeem, Muhammad, Jabeen, Shamoona, and Arqub, Omar Abu

Subjects

*ORDINARY differential equations, *MATHEMATICAL physics, *APPLIED mathematics, *APPLIED sciences, *DYNAMICAL systems

Abstract

Here attention is focused on the (1+1)-dimensional Sawada–Kotera (SK) model that is prominent in mathematical physics and engineering to analyze plasmas and coherent systems for communication. Our techniques offer fresh perspectives on the model’s attributes and structure, deepening our comprehension of the underlying dynamics. First, the SK model is reduced to ordinary differential equations by constructing the Lie symmetries and using the associated transformation. Graphs are used to build and display invariant solutions. This strategy has caused the revelation of novel constant solutions that have not been found in the previous works. We offer new understandings of nature and changes observed during the SK derivation by taking advantage of the Lie symmetries powerful tools. Next, the fluctuating layout of proposed framework is examined from several perspectives such as sensitivity and bifurcation analysis. We examined the bifurcation analysis of planar dynamical system by using bifurcation theory. We also include an external periodic perturbation term that breaks regular patterns in the perturbed dynamical system. Graphical structures are provided to display the invariant solutions. The sensitivity of the SK model is determined to be strong after sensitivity analysis under different initial conditions. These results are fascinating, fresh, and conceptually useful for understanding the suggested framework. In mathematics and the applied sciences, forecasting and learning about new technologies are greatly aided by the dynamic aspect of system processing. [ABSTRACT FROM AUTHOR]

Published

2024

10. Some new Milne-type inequalities.

Author

Bosch, Paul, Rodríguez, José M., Sigarreta, José M., and Tourís, Eva

Subjects

*INTEGRAL inequalities, *FRACTIONAL integrals, *APPLIED mathematics, *GENERALIZATION, *ARGUMENT

Abstract

Inequalities play a main role in pure and applied mathematics. In this paper, we prove a generalization of Milne inequality for any measure space. The argument in the proof of this inequality allows us to obtain other Milne-type inequalities. Also, we improve the discrete version of Milne inequality, which holds for any positive value of the parameter p. Finally, we present a Milne-type inequality in the fractional context. [ABSTRACT FROM AUTHOR]

Published

2024

11. The forgotten p-versine and p-coversine family of functions revisited.

Author

Alibrahim, Ali Hamzah and Das, Saptarshi

Subjects

*MATHEMATICAL functions, *APPLIED mathematics, *MATHEMATICAL analysis, *SPECIAL functions, *MATHEMATICAL physics

Abstract

This study delves into special class of generalized p-trigonometric functions, examining their connection to the established counterparts like p-cosine and p-sine functions. We here explore the new class of functions called the p-versine, p-coversine, p-haversine, and p-hacovercosine, by providing comprehensive definitions and properties. Grounded in the characteristics of p-cosine and p-sine functions, the newly proposed functions offer unique mathematical insights. Our work contributes towards a thorough understanding of these new special functions, showcasing their potential applications in diverse scientific domains, from mathematical analysis to physics and engineering. This paper contributes as a valuable resource for future applied mathematics researchers, engaging with these new mathematical functions, enhancing the ability to model complex patterns from diverse real-world applications. [ABSTRACT FROM AUTHOR]

Published

2024

12. Preface: Integrable systems and their applications, celebrating the 70th birthday of Athanassios S. Fokas.

Author

Ablowitz, Mark J., He, Jingsong, and Pelloni, Beatrice

Subjects

*APPLIED mathematics, *BIRTHDAYS, *COLLEGE teachers

Abstract

This special issue of Studies in Applied Mathematics is dedicated to the 70th birthday of Professor Thanasis Fokas. It contains a selection of papers that all use in some ways the ground‐breaking mathematical ideas and techniques introduced by Thanasis over his long and exceptionally prolific career. [ABSTRACT FROM AUTHOR]

Published

2024

13. Well-Posedness of the Schrödinger–Korteweg–de Vries System with Robin Boundary Conditions on the Half-Line.

Author

Huang, Po-Chun and Pan, Bo-Yu

Subjects

*ION acoustic waves, *SOBOLEV spaces, *MATHEMATICAL physics, *APPLIED mathematics, *POLYNOMIALS

Abstract

The Schrödinger–Korteweg–de Vries (SKdV) system can describe the nonlinear dynamics of phenomena such as Langmuir and ion acoustic waves, which are highly valuable for studying wave behavior and interactions. The SKdV system has wide-ranging applications in physics and applied mathematics. In this article, we investigate the local well-posedness of the SKdV system with Robin boundary conditions and polynomial terms in the Sobolev space. We want to enhance the applicability of this type of SKdV system. Our verification process is as follows: We estimate Fokas solutions for the Robin problem with external forces. Next, we define an iteration map in suitable solution space and prove the iteration map is a contraction mapping and onto some closed ball B (0 , r) . Finally, by the contraction mapping theorem, we obtain the uniqueness solution. Moreover, we show that the data-to-solution map is locally Lipschitz continuous and conclude with the well-posedness of the SKdV system. [ABSTRACT FROM AUTHOR]

Published

2024

14. Extract the information via multiple repeated observations under randomly distributed noise.

Author

Zhong, Min, Li, Xinyan, and Liu, Xiaoman

Subjects

*REGULARIZATION parameter, *APPLIED mathematics, *CONFIDENCE intervals, *STATISTICS, *NOISE

Abstract

Extracting the useful information has been used almost everywhere in many fields of mathematics and applied mathematics. It is a classical ill-posed problem due to the unstable dependence of approximations on small perturbation of the data. The traditional regularization methods depend on the choice of the regularization parameter, which are closely related to an available accurate upper bound of noise level; thus it is not appropriate for the randomly distributed noise with big or unknown variance. In this paper, a purely data driven statistical regularization method is proposed, effectively extracting the information from randomly noisy observations. The rigorous upper bound estimation of confidence interval of the error in L 2 norm is established, and some numerical examples are provided to illustrate the effectiveness and computational performance of the method. [ABSTRACT FROM AUTHOR]

Published

2024

15. Matrices as a diagonal quadratic form over rings of integers of certain quadratic number fields.

Author

Nullwala, Murtuza and Garge, Anuradha S.

Subjects

*RINGS of integers, *QUADRATIC forms, *APPLIED mathematics, *MATRIX rings, *INTERNET publishing

Abstract

Let $ \mathcal {O} $ O denote the ring of integers of a quadratic field $ \mathbb {Q}(\sqrt {-7}) $ Q (− 7). In 2022, Murtuza and Garge [Murtuza N, Garge A. Universality of certain diagonal quadratic forms for matrices over a ring of integers, Indian Journal of Pure and Applied Mathematics, Published online; December 2022.] gave a necessary and sufficient condition for a diagonal quadratic form $ a_1X_1^2+a_2X_2^2+a_3X_3^2 $ a 1 X 1 2 + a 2 X 2 2 + a 3 X 3 2 where $ a_i\in \mathbb {\mathcal {O}} $ a i ∈ O for $ 1\leq i \leq ~3 $ 1 ≤ i ≤ 3 for representing all $ 2\times 2 $ 2 × 2 matrices over $ \mathcal {O} $ O . Let K denote a quadratic field such that its ring of integers $ \mathcal {O}_K $ O K is a principal ideal domain and 2 is a product of two distinct primes. It is a well-known fact that $ \mathbb {Q}(\sqrt {-7}) $ Q (− 7) is the only imaginary quadratic field with the above properties. Let $ D_K $ D K denote the discriminant of K. We have $ D_K\equiv 1(\text{mod }8) $ D K ≡ 1 (mod 8) if and only if 2 is a product of two distinct primes in $ \mathcal {O}_K $ O K . With $ \mathcal {O}_K $ O K as above, in this paper we generalize our earlier result. We give a necessary and sufficient condition for a diagonal quadratic form $ {\sum _{i=1}^{m}a_iX_i^2} $ ∑ i = 1 m a i X i 2 where $ a_i\in \mathcal {O}_K $ a i ∈ O K , $ 1\leq i \leq m $ 1 ≤ i ≤ m to represent all $ 2\times 2 $ 2 × 2 matrices over $ \mathcal {O}_K $ O K . This result is a conjecture stated in [Murtuza N, Garge A. Universality of certain diagonal quadratic forms for matrices over a ring of integers, Indian Journal of Pure and Applied Mathematics, Published online; December 2022]. [ABSTRACT FROM AUTHOR]

Published

2024

16. Current developments and trends in quantum crystallography.

Author

Krawczuk, Anna and Genoni, Alessandro

Subjects

*ELECTRON distribution, *QUANTUM chemistry, *QUANTUM theory, *CRYSTALLOGRAPHY, *APPLIED mathematics

Abstract

Quantum crystallography is an emerging research field of science that has its origin in the early days of quantum physics and modern crystallography when it was almost immediately envisaged that X‐ray radiation could be somehow exploited to determine the electron distribution of atoms and molecules. Today it can be seen as a composite research area at the intersection of crystallography, quantum chemistry, solid‐state physics, applied mathematics and computer science, with the goal of investigating quantum problems, phenomena and features of the crystalline state. In this article, the state‐of‐the‐art of quantum crystallography will be described by presenting developments and applications of novel techniques that have been introduced in the last 15 years. The focus will be on advances in the framework of multipole model strategies, wavefunction‐/density matrix‐based approaches and quantum chemical topological techniques. Finally, possible future improvements and expansions in the field will be discussed, also considering new emerging experimental and computational technologies. [ABSTRACT FROM AUTHOR]

Published

2024

17. Inversion of Vandermonde matrices via synthetic division formulation.

Author

Ahmad, Shamsatun Nahar, Kadir, Nur Khairani Izzati Abdul, Nazri, Muhammad Aiman Wafi, and Razali, Wan Muhammad Sirhan

Subjects

*VANDERMONDE matrices, *MATRIX inversion, *PYTHON programming language, *APPLIED mathematics, *INVERSE functions

Abstract

Vandermonde matrices are fundamental in applied mathematics, natural sciences, and engineering. The inverse form of the Vandermonde matrix (V) is one of its most important characteristics. The purpose of this paper is to develop an algorithm for the inverse of Vandermonde matrix, V-1 in the Python programming language using the Synthetic Division method. To compute the elements of V-1, the Synthetic Division uses arithmetic operations, multiplications, and additions. Consequently, inverse matrix computations require less time compared to a method that involved the multiplication of two matrices. In addition, the efficiency and time required to compute V-1 using Synthetic Division versus the numpy.linalg.inv() function in the Python NumPy module are compared. The study found that the NumPy inverse function demonstrated that the time computation of inverse matrices is consistent, except for certain sizes. In contrast, the Synthetic Division algorithm appears consistent regardless of matrix size. Therefore, Synthetic Division is an effective and efficient method for computing V-1. [ABSTRACT FROM AUTHOR]

Published

2024

18. Preface: Proceedings of the International Conference on Numerical Analysis and Applied Mathematics 2022 (ICNAAM-2022).

Subjects

*CONFERENCES & conventions, *NUMERICAL analysis, *NONPROFIT organizations, *METHODS engineering, *APPLIED mathematics

Abstract

The document is a preface to the Proceedings of the International Conference on Numerical Analysis and Applied Mathematics 2022 (ICNAAM-2022). The conference aims to bring together leading scientists in the field of Numerical and Applied Mathematics and attract high-quality research papers. The selection of papers included in the volume was based on an international peer review process. The preface expresses gratitude to the Scientific Committee, organizers, invited speakers, and others involved in the conference. It also mentions the inclusion of the Proceedings in the AIP Conference Proceedings series. The document provides information about the conference details, the European Society of Computational Methods in Sciences and Engineering (ESCMSE), and the categories of membership in the society. [Extracted from the article]

Published

2024

19. Predicting natural increase of water level using machine learning.

Author

Sruthi, Mamidala, Sravanthi, Thota, Shaik, Mohammed Ali, Padmaja, Chittireddy, and Krishna, U. M. Gopal

Subjects

*MACHINE learning, *WATER use, *APPLIED mathematics, *THRIFTINESS, *AGRICULTURE, *WATER levels

Abstract

Since heavy rain can beget numerous disasters, downfall vaticination is pivotal. The cast should be accurate, and it also encourages people to take preventives. For nations like India, whose frugality is largely dependent on husbandry, the delicacy of the downfall statement is veritably important. Due to the atmosphere's dynamic character, applied mathematics ways are unfit to guarantee dependable perfection for a statement about rush. Retrogression may be used in the vaticination of rush utilising machine learning approaches. The thing of this design is to make the styles and approaches used in the field of rush vaticination accessible tonos-experts while also furnishing a comparison of the colourful machine learning algorithms. [ABSTRACT FROM AUTHOR]

Published

2024

20. Integral Equations: New Solutions via Generalized Best Proximity Methods.

Author

Albargi, Amer Hassan and Ahmad, Jamshaid

Subjects

*VOLTERRA equations, *INTEGRAL equations, *APPLIED mathematics

Abstract

This paper introduces the concept of proximal (α , F) -contractions in F -metric spaces. We establish novel results concerning the existence and uniqueness of best proximity points for such mappings. The validity of our findings is corroborated through a non-trivial example. Furthermore, we demonstrate the applicability of these results by proving the existence of solutions for Volterra integral equations related to population growth models. This approach not only extends best proximity theory, but also paves the way for further research in applied mathematics and beyond. [ABSTRACT FROM AUTHOR]

Published

2024

21. What is an Imaginary Number? The Plane and Beyond.

Author

Powell, Andrew

Subjects

*COMPLEX numbers, *REAL numbers, *APPLIED mathematics, *MATHEMATICAL physics, *ALGEBRA

Abstract

In this article I argue that i is a quantity associated with the two-dimensional real number plane, whether as a vector, a bi-vector, a point or a transformation (rotation). This position provides a foundation for the complex numbers and accounts for complex numbers in some equations of applied mathematics and physics. I also argue that complex numbers are fundamentally geometrical and can be described by geometric algebra, and that moreover the meaning of complex numbers in physics varies with dimension and geometry of the manifold. [ABSTRACT FROM AUTHOR]

Published

2024

22. Conic Optimization and Interior Point Methods: Theory, Computations, and Applications.

Author

Illés, Tibor, Jarre, Florian, de Klerk, Etienne, and Lesaja, Goran

Subjects

*INTERIOR-point methods, *HISTORY of mathematics, *LINEAR complementarity problem, *KERNEL functions, *CONIC sections, *APPLIED mathematics, *COMPUTATIONAL mathematics, *STOCHASTIC control theory

Abstract

This special issue of the Journal of Optimization Theory & Applications focuses on the work of Professors Cornelis Roos and Florian A. Potra in the field of optimization. The issue includes a biographical sketch of both professors, highlighting their achievements. The papers in the special issue cover various topics such as conic optimization, interior point methods, proximal methods, convex optimization, and stochastic optimal control. The authors of the papers have close connections to Professors Roos and Potra, either as students, visitors, or co-authors. The document is a compilation of research papers on interior-point methods (IPMs) and their applications in optimization and conic programming. The papers cover theoretical developments of IPMs, algorithms for linear complementarity problems (LCPs), weighted LCPs, and sufficient linear complementarity problems. There are also papers on new computational approaches for IPMs, applications of IPMs in different fields such as mechanics and support vector machines, and the theory and application of conic optimization. The document also includes papers on proximal methods for convex and non-convex problems, as well as papers on convexity and convex optimization. The volume concludes with acknowledgments to the authors, reviewers, and editor-in-chief. [Extracted from the article]

Published

2024

23. Kink, Dark, Bright, and Singular Optical Solitons to the Space–Time Nonlinear Fractional (4+1)-Dimensional Davey–Stewartson–Kadomtsev–Petviashvili Model.

Author

Alsharidi, Abdulaziz Khalid and Junjua, Moin-ud-Din

Subjects

*PLASMA physics, *OPTICAL solitons, *SOLITONS, *APPLIED mathematics, *DEFINITIONS

Abstract

The new types of exact solitons of the space–time fractional nonlinear (4+1)-dimensional Davey–Stewartson–Kadomtsev–Petviashvili (DSKP) model are achieved by applying the unified technique and modified extended tanh-expansion function technique. A novel definition of the fractional derivative known as the truncated M-fractional derivative is also used. This model describes both the non-elastic and elastic interactions between internal waves. This model is used to represent intricate nonlinear phenomena like shallow-water waves, plasma physics, and others. The obtained results are in the form of kink, singular, bright, periodic, and dark solitons. The observed results are verified and represented by 2D and 3D graphs. The observed results are not present in the literature due to the use of fractional derivatives. The impact of the truncated M-fractional derivative on the observed results is also represented by graphs. Hence, our observed results are fruitful for the future study of these models. The applied techniques are simple, fruitful, and reliable in solving the other models in applied mathematics. [ABSTRACT FROM AUTHOR]

Published

2024

24. Optimization Design of Phononic Crystals Based on BPNN‐MPA in Applied Mathematical Analysis.

Author

Ge, Peiyun and Barbu, Tudor

Subjects

*PHONONIC crystals, *MATHEMATICAL analysis, *FINITE element method, *BACK propagation, *APPLIED mathematics

Abstract

Traditional finite element analysis methods have the problem of expensive and unstable band structure diagram calculation when generating phononic crystals. Therefore, this study combines back propagation neural networks with ocean predator algorithms to optimize the geometric structure of phononic crystals. The results show that the coefficient of determination for the predicted bandgap width and lower bound of Model 3 is 1.00, which is better than the comparison model. However, Models 2 and 5 have poor predictive performance for bandgap width due to overfitting during actual training. Therefore, after using the ocean predator algorithm for hyperparameter adjustment, it is found that the maximum number of failures in the validation set of Model 5 is 30, the number of hidden layer nodes is 30, and after 500 experiments, the average error of the bandgap width is 5.26%, and the average error of the lower bound of the bandgap is 1.33%. The average error of the bandgap width after hyperparameter adjustment is 4.89%, and the average error of the lower bound of the bandgap is 1.21%, both of which are effectively reduced and better than the comparison model. Overall, the combination model has high computational efficiency and stability in phononic crystal optimization and can be practically applied in the design and optimization of phononic crystal geometric structures. [ABSTRACT FROM AUTHOR]

Published

2024

25. A New Class of Coordinated Non-Convex Fuzzy-Number-Valued Mappings with Related Inequalities and Their Applications.

Author

Rakhmangulov, Aleksandr, Aljohani, A. F., Mubaraki, Ali, and Althobaiti, Saad

Subjects

*INTEGRAL inequalities, *APPLIED mathematics, *GENERALIZED integrals, *NUMERICAL integration, *INTEGRALS, *MATHEMATICS

Abstract

Both theoretical and applied mathematics depend heavily on integral inequalities with generalized convexity. Because of its many applications, the theory of integral inequalities is currently one of the areas of mathematics that is evolving at the fastest pace. In this paper, based on fuzzy Aumann's integral theory, the Hermite–Hadamard's type inequalities are introduced for a newly defined class of nonconvex functions, which is known as  U · D preinvex fuzzy number-valued mappings ( U · D preinvex  F · N · V · M s) on coordinates. Some Pachpatte-type inequalities are also established for the product of two  U · D preinvex  F · N · V · M s, and some Hermite–Hadamard–Fejér-type inequalities are also acquired via fuzzy Aumann's integrals. Additionally, several new generalized inequalities are also obtained for the special situations of the parameters. Additionally, some of the interesting remarks are provided to acquire the classical and new exceptional cases that can be considered as applications of the main outcomes. Lastly, a few suggested uses for these inequalities in numerical integration are made. [ABSTRACT FROM AUTHOR]

Published

2024

26. A mathematical mechanics mixed tape: Editor's foreword to special issue in honor of Alain Goriely.

Author

Mihai, L Angela

Subjects

*ELASTIC solids, *BIOMECHANICS, *KIRCHHOFF'S theory of diffraction, *APPLIED mathematics, *SOLID mechanics

Abstract

This document is a foreword to a special issue of the journal "Mathematics & Mechanics of Solids" dedicated to Professor Alain Goriely. The foreword highlights Professor Goriely's achievements and contributions to the field of mathematics and mechanics, particularly in the areas of nonlinear elasticity and biological growth. It also mentions his involvement in scientific dissemination and his support for junior researchers and graduate students. The special issue includes articles on various topics related to Professor Goriely's research interests, such as theories of rods and shells, materials modeling, energy, biomechanics, and mathematical foundations of mechanics. The foreword expresses the hope that Professor Goriely will find the collection inspiring and wishes him many more successful years of research. [Extracted from the article]

Published

2024

27. On Centralizers of Idempotents with Restricted Range.

Author

Mir, Dilawar J. and Alali, Amal S.

Subjects

*AUTOMORPHISM groups, *GRAPH theory, *APPLIED mathematics, *CODING theory, *AUTOMORPHISMS, *IDEMPOTENTS, *CRYPTOGRAPHY

Abstract

This study delves into the structure and properties of left inverse zero divisor bands within semigroups, identifying their maximal forms and broadening the theoretical landscape of semigroup analysis. A significant focus is placed on the automorphisms of a semigroup S of centralizers of idempotent transformations with restricted range, revealing that these automorphisms are inner ones and induced by the units of S. Additionally, we establish that the automorphism group Aut (S) is isomorphic to U S , the group of units of S. These findings extend previous results on semigroups of transformations, enhancing their applicability and providing a more unified theory. The practical implications of this work span multiple fields, including automata theory, coding theory, cryptography, and graph theory, offering tools for more efficient algorithms and models. By simplifying complex concepts and providing a solid foundation for future research, this study makes significant contributions to both theoretical and applied mathematics. [ABSTRACT FROM AUTHOR]

Published

2024

28. The general Bernstein function: Application to χ-fractional differential equations.

Author

Sadek, Lakhlifa and Bataineh, Ahmad Sami

Subjects

*DIFFERENTIAL equations, *NONLINEAR differential equations, *APPLIED mathematics, *BERNSTEIN polynomials, *COLLOCATION methods, *CALCULUS of variations, *INTEGRAL equations

Abstract

In this paper, we present the general Bernstein functions for the first time. The properties of generalized Bernstein basis functions are given and demonstrated. The classical Bernstein polynomial bases are merely a subset of the general Bernstein functions. Based on the new Bernstein base functions and the collocation method, we present a numerical method for solving linear and nonlinear χ-fractional differential equations (χ-FDEs) with variable coefficients. The fractional derivative used in this work is the χ-Caputo fractional derivative sense (χ-CFD). Combining the Bernstein functions basis and the collocation methods yields the approximation solution of nonlinear differential equations. These base functions can be used to solve many problems in applied mathematics, including calculus of variations, differential equations, optimal control, and integral equations. Furthermore, the convergence of the method is rigorously justified and supported by numerical experiments. [ABSTRACT FROM AUTHOR]

Published

2024

29. Investigating wave solutions and impact of nonlinearity: Comprehensive study of the KP-BBM model with bifurcation analysis.

Author

Rayhanul Islam, S. M. and Khan, Kamruzzaman

Subjects

*NONLINEAR evolution equations, *HAMILTON'S principle function, *HOPF bifurcations, *APPLIED mathematics, *DYNAMICAL systems, *EXPONENTIAL functions

Abstract

In this paper, we investigate the (2+1)-dimensional Kadomtsev-Petviashvili-Benjamin-Bona Mahony equation using two effective methods: the unified scheme and the advanced auxiliary equation scheme, aiming to derive precise wave solutions. These solutions are expressed as combinations of trigonometric, rational, hyperbolic, and exponential functions. Visual representations, including three-dimensional (3D) and two-dimensional (2D) combined charts, are provided for some of these solutions. The influence of the nonlinear parameter p on the wave type is thoroughly examined through diverse figures, illustrating the profound impact of nonlinearity. Additionally, we briefly investigate the Hamiltonian function and the stability of the model using a planar dynamical system approach. This involves examining trajectories, isoclines, and nullclines to illustrate stable solution paths for the wave variables. Numerical results demonstrate that these methods are reliable, straightforward, and potent tools for analyzing various nonlinear evolution equations found in physics, applied mathematics, and engineering. [ABSTRACT FROM AUTHOR]

Published

2024

30. Investigation of (2+1)-dimensional extended Calogero–Bogoyavlenskii–Schiff equation by generalized Kudryashov method and two variable (G′G,1G)-expansion method.

Author

Arshed, Saima, Akram, Ghazala, Sadaf, Maasoomah, Latif, Rimsha, and Ahmad, Hijaz

Subjects

*APPLIED mathematics, *ORDINARY differential equations, *NONLINEAR differential equations, *PLASMA physics, *SINE-Gordon equation, *FLUID dynamics, *NONLINEAR optics

Abstract

This paper investigates a recently introduced (2 + 1) -dimensional extended Calogero–Bogoyavlenskii–Schiff equation. The considered model is widely used in fluid dynamics, nonlinear optics and plasma physics. The study of the governing equation has provided insights into the dynamical behaviors of wave systems, which is an important area of research in applied mathematics and theoretical physics. Firstly, the description of the generalized Kudryashov and the two variable ( G ′ G , 1 G) -expansion methods is presented. The governing model is converted into a nonlinear ordinary differential equation by utilizing the traveling wave hypothesis. A family of exact traveling wave solutions such as solitons and solitary waves are extracted using the two proposed methods for the governing model. The graphical demonstrations are presented to examine the physical behavior of the constructed solutions. Kink solitary wave, singular kink, W-shape soliton, dark-bright soliton and periodic wave solutions are successfully retrieved. The proposed techniques are utilized to examine the governing model for the first time in this work to the best of our knowledge. The acquired results will help in guiding future investigations of the wave phenomena represented by the considered equation. [ABSTRACT FROM AUTHOR]

Published

2024

31. Programmatic Strategies to Engage and Support Undergraduate Women in Applied Mathematics and Computer Science.

Author

Han, Sandie, Kennedy, Nadia Stoyanova, Samaroo, Diana, and Duttagupta, Urmi

Subjects

*SCHOLARSHIPS, *COMPUTER science, *APPLIED mathematics, *UNDERGRADUATES, *SELF-efficacy, *COMMUNITY involvement

Abstract

This paper describes the implementation of a STEM scholarship program which utilized a holistic approach to providing a multi-dimensional student support system. The program has been successful in encouraging and supporting women in Applied Mathematics and Computer Science by offering a diverse suite of extracurricular opportunities, actively engaging them in organized events, research projects, and participation in STEM communities, and helping them achieve higher GPAs and shorter times to graduation. The supported women also benefitted from close mentoring relationships with the faculty mentors. The program emphasized the development of empowering settings for women's engagement and achievement, which act to sustain and expand interest in mathematics and computing, and thereby help them to see themselves as future professionals in the field. [ABSTRACT FROM AUTHOR]

Published

2024

32. Linear programming problems with cube constraints.

Author

Lestari, Himmawati Puji, Caturiyati, and Harini, Lusi

Subjects

*LINEAR programming, *MATHEMATICAL optimization, *CONVEX domains, *APPLIED mathematics, *CONSTRAINT programming, *CUBES, *CONVEX geometry

Abstract

Linear programming is one of the basic concepts to further study in applied mathematics and optimization. If the constraints of the linear programming problem form a convex region, then the problem must have an optimal solution. Cube is convex and, in terms of geometry, cube is very special. Cube has some special properties that all edges are congruent and also the all sides are congruent. Other special properties of the cube are related to orthogonality and parallelism. This paper discus linear programming problems with cube constraints. This research is study literature research to describe linear programming problems with cube constraints on geometrical angle. Considering the peculiarities of a cube, this linear programming problem must have an optimal solution. The results show the following points: 1) A cube is a convex polyhedron; 2) The steps for solving linear programming with cube constraints are analogous to the steps for solving linear programming in two dimensions using the graphical method, finding all the vertices of the cube and calculating the value of the objective function at all of the vertices, and then determining the vertex point that produces the optimal value; 3) The problem can have a unique solution (vertex) or have infinitely many solutions (the points along the edges or on the side planes of the cube). [ABSTRACT FROM AUTHOR]

Published

2024

33. Study exploration: Difficulties of mathematics teachers in applying technology to online learning.

Author

Fitri and Retnawati, Heri

Subjects

*MATHEMATICS teachers, *ONLINE education, *HIGH school teachers, *APPLIED mathematics, *COVID-19 pandemic

Abstract

This study aims to obtain information about the difficulties of mathematics teachers in applying technology to online learning due to the covid-19 pandemic. This research uses a qualitative method with a case study approach. This study used three junior high school mathematics teacher respondents in Tarakan City for the confidentiality of respondents coded S1, S2, and S3. This study used semi-structured interviews, and a list of questions was developed based on the existing literature. The data analysis technique uses the Bogdan & Biklen model by reducing data, looking for relationships between sub-themes, and making conclusions. Based on the results of the study, it was shown that mathematics teachers in Tarakan City had difficulties in applying technology to their teacher's online lessons during the pandemic include age, lack of experience and training, additional costs and time, and being constrained by poor networks. Therefore, there needs to be assistance and training from the school so that teacher difficulties can be handled properly, especially senior teachers, and the learning process during the pandemic can run as desired. [ABSTRACT FROM AUTHOR]

Published

2024

34. Analysis of the mathematical understanding ability of students tuton class at statistical method course in the open university.

Author

Murnaka, Nerru Pranuta, Arifin, Samsul, Ariani, Audrey Tabitha, and Paduppai, Andi Mardiana

Subjects

*MATHEMATICAL ability, *MATHEMATICAL analysis, *MATHEMATICAL ability testing, *MATHEMATICS, *JUDGMENT sampling, *MATHEMATICAL forms, *APPLIED mathematics

Abstract

Mathematical understanding is one of the five essential skills in learning mathematics. It is essential to develop this mathematical understanding ability to solve problems in real life by applying the mathematics they understand. This study aimed to find out how the mathematical understanding ability of Tuton students in the Statistics Method class at the Open University was determined. The sampling technique used purposive sampling. The instruments used to collect data are in the form of tests of mathematical understanding abilities and documentation. The test results were analyzed based on indicators of mathematical understanding. The results of this study indicate that the students' mathematical understanding ability is high. [ABSTRACT FROM AUTHOR]

Published

2024

35. Mathematical literacy of students with low abilities: A case study of elementary school students.

Author

Yustitia, Via, Kusmaharti, Dian, Wijayanti, Septiana, and Faridah, Luluk

Subjects

*SCHOOL children, *READING ability testing, *LITERACY, *MATHEMATICS, *JUDGMENT sampling, *APPLIED mathematics

Abstract

Mathematical literacy is essential to help someone understand the use of mathematics in everyday life and use it in decision-making to solve a problem. However, the results of PISA 2018 state that Indonesia has low literacy and has not experienced development for the last 10-15 years. This study aimed to analyze mathematical literacy with students with low initial abilities in the material of speed, distance, and time. This study used the descriptive qualitative method. The subject of this study was one student who was selected with a low midterm exam score using a purposive sampling technique, namely class V-A SDN Menanggal 601 Surabaya. Data collection methods used are mathematical literacy tests, interviews, and documentation that mathematics lecturers have validated. The results of this study indicate that the mathematical literacy of students with low initial ability can: 1) formulate real problems but they are incomplete because they do not write completely, do not use mathematics by applying an explicit mathematical model; 2) do not write down the formula, 3) correctly represent the solution that will be used directly. [ABSTRACT FROM AUTHOR]

Published

2024

36. Ethnomathematics exploration in the Ledo Hawu traditional dance of Sabu community.

Author

Dominikus, Wara Sabon, Wiri, Paul Erikson Wada, and Udil, Patrisius Afrisno

Subjects

*DANCE, *MATHEMATICAL logic, *PATTERNS (Mathematics), *APPLIED mathematics, *ETHNOLOGY research, *TRIANGULATION, *MATHEMATICS

Abstract

Mathematics and culture are important and interrelated in everyday life. The purpose of this study is to explore ethnomathematics in the Ledo Hawu traditional dance of the Sabu Community in Raijua District. In addition, through the exploration of ethnomathematics, it can be identified various mathematical concepts in the Ledo Hawu traditional dance of the Sabu community in Raijua District. This research is qualitative-explorative research with an ethnographic design. The subject of this study consisted of 5 people who were dancers and leaders of the cultural society. Data in this research were collected through interviews, observations, and documentation. The data validity test is carried out by triangulation of sources. Data analysis techniques are carried out through data reduction, data display, and conclusion. The results of this study showed that there is ethnomathematics in the Ledo Hawu traditional dance which is indicated by the characteristic of counting, locating, designing, and explaining activities. Based on those activities, mathematical concepts can be identified in the Ledo Hawu traditional dance which includes the concepts of addition, multiplication, geometry, arithmetic sequences, number patterns, geometric transformations, and mathematical logic. Those various mathematical concepts can be developed by designing mathematics learning tools that can be applied in mathematics learning. [ABSTRACT FROM AUTHOR]

Published

2024

37. Continuity Criteria for Locally Bounded Homomorphisms of Certain Lie Groups.

Author

Shtern, A. I.

Subjects

*COMPACT groups, *APPLIED mathematics, *ABELIAN groups, *CONTINUOUS groups, *HOMOMORPHISMS, *LIE groups, *TOPOLOGICAL groups

Abstract

This article, titled "Continuity Criteria for Locally Bounded Homomorphisms of Certain Lie Groups," discusses the continuity of locally bounded homomorphisms in Lie groups. The authors prove that a locally bounded homomorphism of a connected Lie group is continuous if and only if it is continuous on a closed supplementary subgroup. The article provides a theorem and a proof to support this claim. The research was partially supported by the Moscow Center for Fundamental and Applied Mathematics, and the author declares no conflict of interest. [Extracted from the article]

Published

2024

38. Application-oriented numerical computation and optimization–a celebration of 60 years of the IJCM.

Author

Asante-Asamani, Emmanuel, Sheng, Qin, Wade, Bruce A., and Wang, Xiang-Sheng

Subjects

*APPLIED sciences, *PARTIAL differential equations, *GREEN'S functions, *MATHEMATICAL analysis, *APPLIED mathematics, *REACTION-diffusion equations, *HELMHOLTZ equation

Abstract

The International Journal of Computer Mathematics (IJCM) is a well-regarded publication in the field of applied mathematics, first published in 1964. The current issue marks the 60th anniversary of the journal and features 17 carefully selected manuscripts covering various topics, such as differential equations and numerical analysis. These articles showcase the effectiveness and reliability of different numerical methods and offer valuable insights for researchers. The guest editors express their gratitude to their colleagues, the editorial team, and their families for their assistance and support in publishing this special issue. [Extracted from the article]

Published

2024

39. Meixner Multiple Orthogonal Polynomials on Interlacing Lattices.

Author

Aptekarev, A. I., Dyachenko, A. V., and Lysov, V. G.

Subjects

*ORTHOGONAL polynomials, *APPROXIMATION theory, *PAINLEVE equations, *APPLIED mathematics, *DIFFERENCE operators, *SCIENCE education

Abstract

This article, published in Mathematical Notes, discusses Meixner multiple orthogonal polynomials on interlacing lattices. The article explores the existence and normality of these polynomials, as well as their applications in number theory, approximation theory, random matrix theory, and operator theory. The authors provide proofs and formulas related to these polynomials and their properties. The article concludes with a discussion of the perfectness of the system of positive measures and the uniqueness of the polynomial of multiple orthogonality. [Extracted from the article]

Published

2024

40. Special issue on interdisciplinary perspectives in applied mathematics.

Author

Ram, Mangey, Kharola, Shristi, Kumar, Akshay, Goyal, Nupur, and Anand, Adarsh

Subjects

*APPLIED mathematics, *FUZZY sets, *GOAL programming, *BURGERS' equation

Abstract

This document is a special issue of the journal Nonlinear Studies, featuring interdisciplinary perspectives in applied mathematics. It includes articles on consumer behavior, diffusion of innovation, numerical methods, game theory, and optimization, covering domains such as engineering, management, and physics. The papers have undergone peer review and offer original and high-quality research. The document compiles research contributions on reliability analysis, mathematical modeling, differential equations, and optimization problems, with references for further exploration. The authors express gratitude to the contributors and reviewers for their valuable contributions. [Extracted from the article]

Published

2024

41. The effect of pore-scale contaminant distribution on the reactive decontamination of porous media.

Author

Luckins, Ellen K., Breward, Christopher J. W., Griffiths, Ian M., and Please, Colin P.

Subjects

*CHEMICAL kinetics, *HAZARDOUS substances, *POROUS materials, *LIQUID-liquid interfaces, *SURFACE area, *APPLIED mathematics

Abstract

A porous material that has been contaminated with a hazardous chemical agent is typically decontaminated by applying a cleanser solution to the surface and allowing the cleanser to react into the porous material, neutralising the agent. The agent and cleanser are often immiscible fluids and so, if the porous material is initially saturated with agent, a reaction front develops with the decontamination reaction occurring at this interface between the fluids. We investigate the effect of different initial agent configurations within the pore space on the decontamination process. Specifically, we compare the decontamination of a material initially saturated by the agent with the situation when, initially, the agent only coats the walls of the pores (referred to as the 'agent-on-walls' case). In previous work (Luckins et al., European Journal of Applied Mathematics, 31(5):782–805, 2020), we derived homogenised models for both of these decontamination scenarios, and in this paper we explore the solutions of these two models. We find that, for an identical initial volume of agent, the decontamination time is generally much faster for the agent-on-walls case compared with the initially saturated case, since the surface area on which the reaction can occur is greater. However for sufficiently deep spills of contaminant, or sufficiently slow reaction rates, decontamination in the agent-on-walls scenario can be slower. We also show that, in the limit of a dilute cleanser with a deep initial agent spill, the agent-on-walls model exhibits behaviour akin to a Stefan problem of the same form as that arising in the initially saturated model. The decontamination time is shown to decrease with both the applied cleanser concentration and the rate of the chemical reaction. However, increasing the cleanser concentration is also shown to result in lower decontamination efficiency, with an increase in the amount of cleanser chemical that is wasted. [ABSTRACT FROM AUTHOR]

Published

2024

42. Soliton solutions of DSW and Burgers equations by generalized (G′/G)-expansion method.

Author

Hossain, A. K. M. Kazi Sazzad, Akter, Halida, and Akbar, M. Ali

Subjects

*PARTIAL differential equations, *ORDINARY differential equations, *MATHEMATICAL physics, *APPLIED mathematics, *HAMBURGERS, *BURGERS' equation, *FLUID mechanics, *NONLINEAR evolution equations

Abstract

The nonlinear evolution equations (NLEEs) play a significant role in applied mathematics, including ordinary and partial differential equations, which are frequently used in many disciplines of applied sciences. The Drinfeld–Sokolov–Wilson (DSW) equation and the Burgers equation are the fundamental equations occurring in various areas of physics and applied mathematics, such as nonlinear acoustics and fluid mechanics. The new generalized (G ′ / G) -expansion method is an effective and more powerful mathematical tool for solving NLEEs arising in applied mathematics and mathematical physics. In this article, we investigate further exact solutions as well as soliton solutions to these couple of nonlinear evolution equations by executing the new generalized (G ′ / G) -expansion method. A large number of soliton solutions, including single soliton, bell-shaped soliton, kink-shaped soliton, singular kink soliton, singular soliton, periodic soliton, irregular periodic soliton solutions, and others, have been retrieved. Each of the derived solutions includes an explicit function of the variables in the equations under consideration. We provide some 3D plots to visualize and realize the characteristics of these solutions. It has been established that the suggested techniques are more potential and successful at obtaining soliton solutions for nonlinear evolution equations. [ABSTRACT FROM AUTHOR]

Published

2024

43. A higher degenerated invasive‐invaded species interaction.

Author

Díaz Palencia, José Luis

Subjects

*FIXED point theory, *PARABOLIC operators, *APPLIED mathematics, *POPULATION dynamics, *SPECIES

Abstract

Invasive‐invaded species problems are of relevance in mathematics applied to population dynamics. In this paper, the mentioned dynamics is introduced based on a fourth‐order parabolic operator, together with coupled non‐linear reaction terms. The fourth‐order operator allows us to model a heterogeneous diffusion, as introduced by the Landau–Ginzburg free energy approach. The reaction terms are given by a coupled non‐linear effect in the invasive species, to account for the action of the invaded species and limited resources, and by a non‐Lipschitz term in the invaded species, to account for possible sprouts, once the invasion occurs. The analysis starts by the proof of existence and uniqueness of solutions, making use of the semi‐group theory and a fixed point argument. Asymptotic solutions to the invasive species are explored with an exponential scaling. Afterward, the problem is analyzed with traveling wave profiles, for which a region of positive solutions is explored. [ABSTRACT FROM AUTHOR]

Published

2024

44. On a new version of Hermite–Hadamard-type inequality based on proportional Caputo-hybrid operator.

Author

Tunç, Tuba and Demir, İzzettin

Subjects

*FRACTIONAL calculus, *APPLIED mathematics, *APPLIED sciences, *FRACTIONAL integrals, *MATHEMATICS, *INTEGRAL inequalities

Abstract

In mathematics and the applied sciences, as a very useful tool, fractional calculus is a basic concept. Furthermore, in many areas of mathematics, it is better to use a new hybrid fractional operator, which combines the proportional and Caputo operators. So we concentrate on the proportional Caputo-hybrid operator because of its numerous applications. In this research, we introduce a novel extension of the Hermite–Hadamard-type inequalities for proportional Caputo-hybrid operator and establish an identity. Then, taking into account this novel generalized identity, we develop some integral inequalities associated with the left-side of Hermite–Hadamard-type inequalities for proportional Caputo-hybrid operator. Moreover, to illustrate the newly established inequalities, we give some examples with the help of graphs. [ABSTRACT FROM AUTHOR]

Published

2024

45. On the metric-based resolving parameter of the line graph of certain structures.

Author

Koam, Ali N.A., Ahmad, Ali, Azeem, Muhammad, and Qahiti, Raed

Subjects

*METRIC geometry, *GRAPH theory, *APPLIED mathematics, *MOLECULAR graphs, *MOLECULES, *LINEAR programming

Abstract

Let G be a graph and R = {r1, r2, ..., rk} be an ordered subset of vertices of G, if every two vertices of G have different representation r (v|R) = (d (v, r1) , d (v, r2) , ..., d (v, rk)) with respect to R, then R is said to be a metric-based resolving parameter or resolving set of G and its minimum cardinality is called the metric dimension of graph G. Metric dimension is considered as an important applied concept of graph theory especially in the localization of a network and also in the chemical graph theoretical study of molecular compounds. Therefore, it is hot topic to study for different families of graphs as well. Convex polytopes play an important role both in various branches of mathematics and in applied areas, most notably in linear programming. In this paper, we determine the metric-based resolving parameter of line graph of a convex polytope Sn, and conclude that it has constant metric dimension but vary with the parity of n. This article presents a measurement of the line graph of a convex polytope, denoted as ( S n). The subsequent section provides the metric dimension of the resulting graph. There are two scenarios pertaining to the metric dimension of a selected graph with respect to the metric dimension. The metric dimension of even cycle-based convex polytopes is three, whereas for other values, the metric dimension is four. [ABSTRACT FROM AUTHOR]

Published

2024

46. Statistical inference with regularized optimal transport.

Author

Goldfeld, Ziv, Kato, Kengo, Rioux, Gabriel, and Sadhu, Ritwik

Subjects

*INFERENTIAL statistics, *PROBABILITY measures, *APPLIED mathematics, *FUNCTIONALS, *SCALABILITY, *REGULARIZATION parameter

Abstract

Optimal transport (OT) is a versatile framework for comparing probability measures, with many applications to statistics, machine learning and applied mathematics. However, OT distances suffer from computational and statistical scalability issues to high dimensions, which motivated the study of regularized OT methods like slicing, smoothing and entropic penalty. This work establishes a unified framework for deriving limit distributions of empirical regularized OT distances, semiparametric efficiency of the plug-in empirical estimator and bootstrap consistency. We apply the unified framework to provide a comprehensive statistical treatment of (i) average- and max-sliced |$p$| -Wasserstein distances, for which several gaps in existing literature are closed; (ii) smooth distances with compactly supported kernels, the analysis of which is motivated by computational considerations; and (iii) entropic OT, for which our method generalizes existing limit distribution results and establishes, for the first time, efficiency and bootstrap consistency. While our focus is on these three regularized OT distances as applications, the flexibility of the proposed framework renders it applicable to broad classes of functionals beyond these examples. [ABSTRACT FROM AUTHOR]

Published

2024

47. Two-Dimensional Quaternion Fourier Transform Method in Probability Modeling.

Author

Nurwahidah, Nurwahidah, Bahri, Mawardi, and Rahim, Amran

Subjects

*FOURIER transforms, *QUATERNIONS, *SEPARATION of variables, *APPLIED mathematics, *QUATERNION functions, *PROBABILITY theory

Abstract

The Fourier transform plays a crucial role in statistics, applied mathematics, and engineering sciences. In this study, we give a definition of the two-dimensional quaternion Fourier transform, which is an extension of the two-dimensional Fourier transform. We present a new convolution theorem including this transformation. We study the characteristic function in the setting of quaternion algebra and obtain the essential properties. Based on this, we seek the expected value, variance, covariance, and their basic relations to the two-dimensional quaternion Fourier transform. We illustrate the results by giving examples to see how the obtained results differ from the classical case. [ABSTRACT FROM AUTHOR]

Published

2024

48. Asymptotic Duration for Optimal Multiple Stopping Problems.

Author

Entwistle, Hugh N., Lustri, Christopher J., and Sofronov, Georgy Yu.

Subjects

*APPLIED mathematics, *RANDOM variables, *CONTINUOUS distributions, *INDEPENDENT variables, *DECISION making, *MATHEMATICAL induction

Abstract

We study the asymptotic duration of optimal stopping problems involving a sequence of independent random variables that are drawn from a known continuous distribution. These variables are observed as a sequence, where no recall of previous observations is permitted, and the objective is to form an optimal strategy to maximise the expected reward. In our previous work, we presented a methodology, borrowing techniques from applied mathematics, for obtaining asymptotic expressions for the expectation duration of the optimal stopping time where one stop is permitted. In this study, we generalise further to the case where more than one stop is permitted, with an updated objective function of maximising the expected sum of the variables chosen. We formulate a complete generalisation for an exponential family as well as the uniform distribution by utilising an inductive approach in the formulation of the stopping rule. Explicit examples are shown for common probability functions as well as simulations to verify the asymptotic calculations. [ABSTRACT FROM AUTHOR]

Published

2024

49. REGULARITY OF ALTERNATE QUADRA SUBMERGING POLAR FUZZY GRAPH AND ITS APPLICATION.

Author

A., ANTHONI AMALI and ROSLINE, J. JESINTHA

Subjects

*FUZZY graphs, *APPLIED mathematics, *ARTIFICIAL intelligence

Abstract

Fuzzy soft sets and graphs are invented to solve uncertain problems in the field of Applied mathematics. It is a general mathematical tool introduced with many parameters to model the vagueness of the changing world. The insight learning of the AQSP fuzzy soft graphs paved the way to discover the extension of the AQSP fuzzy soft graph. In this research article we introduce the Regularity of AQSP fuzzy soft graph with definitions, theorems, properties, and real-life applications. The aim of this invention is mainly to obtain the parametric values in submerging level of confidence [-0.5, 0.5] ⊂ [-1,1]. The scope of this new AQSP fuzzy soft graph is to solve the imprecise problems in the field of Mathematical Engineering, Bio Mathematics, Economics, Medical Science, Artificial Intelligence and Machine learning. The regularity of AQSP fuzzy soft graph is combined with the concepts of regular, totally regular, and perfectly regular. The application of this new graph is developed for governing of the women safety vehicle network in different spots with membership submerging values. The future extension can be applied in Approximate reasoning, Mathematical psychology, Decision making for medical diagnosis. [ABSTRACT FROM AUTHOR]

Published

2024

50. Collocation Technique Based on Chebyshev Polynomials to Solve Emden–Fowler-Type Singular Boundary Value Problems with Derivative Dependence.

Author

Kumari, Shabanam, Singh, Arvind Kumar, and Gupta, Utsav

Subjects

*BOUNDARY value problems, *CHEBYSHEV polynomials, *NONLINEAR equations, *NEWTON-Raphson method, *APPLIED mathematics, *COLLOCATION methods

Abstract

In this work, an innovative technique is presented to solve Emden–Fowler-type singular boundary value problems (SBVPs) with derivative dependence. These types of problems have significant applications in applied mathematics and astrophysics. Initially, the differential equation is transformed into a Fredholm integral equation, which is then converted into a system of nonlinear equations using the collocation technique based on Chebyshev polynomials. Subsequently, an iterative numerical approach, such as Newton's method, is employed on the system of nonlinear equations to obtain an approximate solution. Error analysis is included to assess the accuracy of the obtained solutions and provide insights into the reliability of the numerical results. Furthermore, we graphically compare the residual errors of the current method to the previously established method for various examples. [ABSTRACT FROM AUTHOR]

Published

2024