Showing total 617 results

1. On the uniqueness of a meromorphic function and its higher difference operator under the purview of two shared sets.

Author

Mallick, Sanjay and Basak, Pratap

Subjects

*MEROMORPHIC functions, *DIFFERENCE operators, *MALAYS (Asian people), *MATHEMATICS

Abstract

In the paper, we investigate the uniqueness problem of a meromorphic function and its difference operator to the most general setting via two shared set problems and thus improve a recent result of Chen–Chen (Bull Malays Math Sci Soc 35(3): 765-774, 2012). [ABSTRACT FROM AUTHOR]

Published

2024

2. Harary and hyper-Wiener indices of some graph operations.

Author

Balamoorthy, S., Kavaskar, T., and Vinothkumar, K.

Subjects

*DIVISOR theory, *MATHEMATICS

Abstract

In this paper, we obtain the Harary index and the hyper-Wiener index of the H-generalized join of graphs and the generalized corona product of graphs. As a consequence, we deduce some of the results in (Das et al. in J. Inequal. Appl. 2013:339, 2013) and (Khalifeh et al. in Comput. Math. Appl. 56:1402–1407, 2008). Moreover, we calculate the Harary index and the hyper-Wiener index of the ideal-based zero-divisor graph of a ring. [ABSTRACT FROM AUTHOR]

Published

2024

3. Theta lifts to certain cohomological representations of indefinite orthogonal groups.

Author

Miyazaki, Takuya and Saito, Yohei

Subjects

*AUTOMORPHIC forms, *CUSP forms (Mathematics), *MATHEMATICS

Abstract

Howe and Tan (Bull Am Math Soc 28:1–74, 1993) investigated a degenerate principal series representation of indefinite orthogonal groups O (b + , b -) and explicitly described its composition series. In particular it contains a unique unitarizable irreducible submodule Π , which is isomorphic to a cohomological representation. In this paper we construct orthogonal automorphic forms locally corresponding to Π as theta liftings of holomorphic Mp 2 (R) cusp forms by using the Borcherds' method (Invent Math 132:491–562, 1998). We propose a special choice of Schwartz functions to define the liftings, which yields precise descriptions of their Fourier expansions. [ABSTRACT FROM AUTHOR]

Published

2024

4. A relation-theoretic set-valued version of Prešić-Ćirić theorem and applications.

Author

Shukla, Satish, Rai, Shweta, and Shukla, Rahul

Subjects

*METRIC spaces, *MATHEMATICS

Abstract

In this paper, we establish a relation-theoretic set-valued version of the fixed point result of Ćirić and Prešić (Acta Math. Univ. Comen. LXXVI(2):143–147, 2007) on metric spaces endowed with an arbitrary binary relation. The results of this paper, generalize and unify the fixed point results of Ćirić and Prešić (Acta Math. Univ. Comen. LXXVI(2):143–147, 2007), Shukla and López (Quaest. Math. 45(3):1–16, 2019), and Shukla and Radenović (An. Ştiinţ. Univ. 'Al.I. Cuza' Iaşi, Mat. 63(2):339–350, 2017) in product spaces. Some examples are provided that justify and establish the importance of our results. As applications of our main result, we have established the existence of solutions to differential inclusion problems and the weak asymptotical stability and a global attractivity of the equilibrium point of a difference inclusion problem. The use of arbitrary binary relations in our results permits us to apply the results to the differential inclusion problems and difference inclusion problems with weaker assumptions than those used in the papers mentioned above. [ABSTRACT FROM AUTHOR]

Published

2023

5. Exact sequences for dual Toeplitz algebras on hypertori.

Author

Benaissa, Lakhdar and Guediri, Hocine

Subjects

*HARDY spaces, *ALGEBRA, *C*-algebras, *TOEPLITZ operators, *CALCULUS, *MATHEMATICS

Abstract

In this paper, we construct a symbol calculus yielding short exact sequences for the dual Toeplitz algebra generated by all bounded dual Toeplitz operators on the Hardy space associated with the polydisk D n in the unitary space C n , that have been introduced and well studied in our earlier paper (Benaissa and Guediri in Taiwan J Math 19: 31–49, 2015), as well as for the C*-subalgebra generated by dual Toeplitz operators with symbols continuous on the associated hypertorus T n . [ABSTRACT FROM AUTHOR]

Published

2023

6. A remark about asymptotic stability in Duffing equations: lateral stability in Comb-drive finger MEMS.

Author

Núñez, D. and Murcia, L.

Subjects

*DUFFING equations, *FINGERS, *MATHEMATICS

Abstract

In this short paper we tackle two subjects. First, we provide a lower bound for the first eigenvalue of the antiperiodic problem for a Hill's equation based on L p -conditions, and as a consequence, we introduce an adjusted statement of the main result about the asymptotic stability of periodic solutions for the general Duffing equation in (Torres in Mediterr. J. Math. 1(4):479–486, 2004) (Theorem 4). This appropriate version of the result arises because of one subtlety in the proof provided in (Torres in Mediterr. J. Math. 1(4):479–486, 2004). More precisely, the lower bound of the first antiperiodic eigenvalue associated with Hill's equations of potential a (t) employed there may be negative, thus the conclusion is not completely attained. Hence, the adjustments considered here provide a mathematically correct result. On the other hand, we apply this result to obtain a lateral asymptotic stable periodic oscillation in the Comb-drive finger MEMS model with a cubic nonlinear stiffness term and linear damping. This fact is not typical in Comb-drive finger devices, thus our results could provide a new possibility; a new design principle for stabilization in Comb-drive finger MEMS. [ABSTRACT FROM AUTHOR]

Published

2023

7. On the Structure of Singular Points of a Solution to Newton's Least Resistance Problem.

Author

Plakhov, Alexander

Subjects

*CONVEX domains, *CONVEX geometry, *CONVEX bodies, *CONCAVE functions, *MATHEMATICS

Abstract

We consider the following problem stated in 1993 by Buttazzo and Kawohl (Math Intell 15:7–12, 1993): minimize the functional ∫ ∫ Ω (1 + | ∇ u (x , y) | 2 ) - 1 d x d y in the class of concave functions u : Ω → [0,M], where Ω ⊂ R 2 is a convex domain and M > 0. It generalizes the classical minimization problem, which was initially stated by I. Newton in 1687 in the more restricted class of radial functions. The problem is not solved until now; there is even nothing known about the structure of singular points of a solution. In this paper we, first, solve a family of auxiliary 2D least resistance problems and, second, apply the obtained results to study singular points of a solution to our original problem. More precisely, we derive a necessary condition for a point being a ridge singular point of a solution and prove, in particular, that all ridge singular points with horizontal edge lie on the top level and zero level sets. [ABSTRACT FROM AUTHOR]

Published

2023

8. Inequalities for Rational Functions with Prescribed Poles.

Author

Rather, N. A., Iqbal, A., and Dar, Ishfaq

Subjects

*POLISH people, *POLYNOMIALS, *GENERALIZATION, *MATHEMATICS

Abstract

For rational functions , where is a polynomial of degree at the most and , with we use simple but elegant techniques to strengthen generalizations of certain results which extend some widely known polynomial inequalities of Erdős-Lax and Turán to rational functions . In return these reinforced results, in the limiting case, lead to the corresponding refinements of the said polynomial inequalities. As an illustration and as an application of our results, we obtain some new improvements of the Erdős-Lax and Turán type inequalities for polynomials. These improved results take into account the size of the constant term and the leading coefficient of the given polynomial. As a further factor of consideration, during the course of this paper we will demonstrate how some recently obtained results could have been proved without invoking the results of Dubinin [Distortion theorems for polynomials on the circle, Sb. Math. 191(12) (2000) 1797–1807]. [ABSTRACT FROM AUTHOR]

Published

2023

9. Some new integral inequalities for higher-order strongly exponentially convex functions.

Author

Bisht, Jaya, Sharma, Nidhi, Mishra, Shashi Kant, and Hamdi, Abdelouahed

Subjects

*INTEGRAL inequalities, *CONVEX functions, *FRACTIONAL integrals, *APPLIED mathematics, *GENERALIZED integrals, *MATHEMATICS

Abstract

Integral inequalities with generalized convexity play an important role in both applied and theoretical mathematics. The theory of integral inequalities is currently one of the most rapidly developing areas of mathematics due to its wide range of applications. In this paper, we study the concept of higher-order strongly exponentially convex functions and establish a new Hermite–Hadamard inequality for the class of strongly exponentially convex functions of higher order. Further, we derive some new integral inequalities for Riemann–Liouville fractional integrals via higher-order strongly exponentially convex functions. These findings include several well-known results and newly obtained results as special cases. We believe that the results presented in this paper are novel and will be beneficial in encouraging future research in this field. [ABSTRACT FROM AUTHOR]

Published

2023

10. Alternative proofs of some classical metric fixed point theorems by using approximate fixed point sequences.

Author

Berinde, Vasile and P̆acurar, M̆ad̆alina

Subjects

*NONEXPANSIVE mappings, *BANACH spaces, *MATHEMATICS

Abstract

The notion of approximate fixed point sequence, emphasized in Chidume (Geometric properties of Banach spaces and nonlinear iterations. Lecture Notes in Mathematics, 1965. Springer-Verlag London, Ltd., London, 2009), is a very useful tool in proving convergence theorems for fixed point iterative schemes in the class of nonexpansive-type mappings. In the present paper, our aim is to present simple and unified alternative proofs of some classical fixed point theorems emerging from Banach contraction principle, by using a technique based on the concepts of approximate fixed point sequence and graphic contraction. [ABSTRACT FROM AUTHOR]

Published

2023

11. On shrinking projection method for cutter type mappings with nonsummable errors.

Author

Ibaraki, Takanori and Saejung, Satit

Subjects

*METRIC projections, *FUNCTION spaces, *BANACH spaces, *MONOTONE operators, *CONVEX functions, *MATHEMATICS

Abstract

We prove two key inequalities for metric and generalized projections in a certain Banach space. We then obtain some asymptotic behavior of a sequence generated by the shrinking projection method introduced by Takahashi et al. (J. Math. Anal. Appl. 341:276–286, 2008) where the computation allows some nonsummable errors. We follow the idea proposed by Kimura (Banach and Function Spaces IV (ISBFS 2012), pp. 303–311, 2014). The mappings studied in this paper are more general than the ones in (Ibaraki and Kimura in Linear Nonlinear Anal. 2:301–310, 2016; Ibaraki and Kajiba in Josai Math. Monogr. 11:105–120, 2018). In particular, the results in (Ibaraki and Kimura in Linear Nonlinear Anal. 2:301–310, 2016; Ibaraki and Kajiba in Josai Math. Monogr. 11:105–120, 2018) are both extended and supplemented. Finally, we discuss our results for finding a zero of maximal monotone operator and a minimizer of convex functions on a Banach space. [ABSTRACT FROM AUTHOR]

Published

2023

12. Generalized Lommel–Wright function and its geometric properties.

Author

Zayed, Hanaa M. and Mehrez, Khaled

Subjects

*GAMMA functions, *CONVEX functions, *STAR-like functions, *FACTORIALS, *MATHEMATICS

Abstract

The normalization of the combination of generalized Lommel–Wright function J κ 1 , κ 2 κ 3 , m (z) (m ∈ N , κ 3 > 0 and κ 1 , κ 2 ∈ C ) defined by J κ 1 , κ 2 κ 3 , m (z) : = Γ m (κ 1 + 1) Γ (κ 1 + κ 2 + 1) 2 2 κ 1 + κ 2 z 1 − (κ 2 / 2) − κ 1 J κ 1 , κ 2 κ 3 , m (z) , where J κ 1 , κ 2 κ 3 , m (z) : = (1 − 2 κ 1 − κ 2) J κ 1 , κ 2 κ 3 , m (z) + z (J κ 1 , κ 2 κ 3 , m (z)) ′ and J κ 1 , κ 2 κ 3 , m (z) = (z 2) 2 κ 1 + κ 2 ∑ n = 0 ∞ (− 1) n Γ m (n + κ 1 + 1) Γ (n κ 3 + κ 1 + κ 2 + 1) (z 2) 2 n , was previously introduced and some of its geometric properties have been considered. In this paper, we report conditions for J κ 1 , κ 2 κ 3 , m (z) to be starlike and convex of order α, 0 ≤ α < 1 , inside the open unit disk using some technical manipulations of the gamma and digamma functions, as well as inequality for the digamma function that has been proved (Guo and Qi in Proc. Am. Math. Soc. 141(3):1007–1015, 2013). In addition, a method presented by Lorch (J. Approx. Theory 40(2):115–120 1984) and further developed by Laforgia (Math. Compet. 42(166):597–600 1984) is applied to establish firstly sharp inequalities for the shifted factorial that will be used to obtain the order of starlikeness and convexity. We compare then the obtained orders of starlikeness and convexity with some important consequences in the literature as well as the results proposed by all techniques to demonstrate the accuracy of our approach. Ultimately, a lemma by (Fejér in Acta Litt. Sci. 8:89–115 1936) is used to prove that the modified form of the function J κ 1 , κ 2 κ 3 , m (z) defined by I κ 1 , κ 2 κ 3 , m (z) = J κ 1 , κ 2 κ 3 , m (z) ∗ z / (1 + z) is in the class of starlike and convex functions, respectively. Further work regarding the function J κ 1 , κ 2 κ 3 , m (z) is underway and will be presented in a forthcoming paper. [ABSTRACT FROM AUTHOR]

Published

2022

13. Quasiaffine transforms of Hilbert space operators.

Author

Gamal', Maria F. and Kérchy, László

Subjects

*HILBERT transform, *HILBERT space, *MATHEMATICS, *INVARIANT subspaces

Abstract

Ampliation quasisimilarity was applied as a tool in Foias and Pearcy (J Funct Anal 219:134–142, 2005) to reduce the hyperinvariant subspace problem to a particular class of operators. The seemingly weaker pluquasisimilarity relation was introduced in Bercovici et al. (Acta Sci Math Szeged 85:681–691, 2019) and studied also in Kérchy (Acta Sci Math Szeged 86:503–520, 2020). The problem whether these two relations are actually equivalent is addressed in the present paper. The following more general, related question is studied in details: under what conditions is the operator A a quasiaffine transform of B, whenever A can be injected into B and A can be also densely mapped into B. [ABSTRACT FROM AUTHOR]

Published

2023

14. Data block decomposition and intelligent secure acquisition of microdata.

Author

Zhang, Xiuquan, Shen, Lin, and Shi, Kaiquan

Subjects

*CANTOR sets, *BIG data, *MATHEMATICAL models, *DYNAMIC models, *MATHEMATICS

Abstract

P-sets (P stands for Packet) is a set model with dynamic characteristics, which is obtained by introducing dynamic characteristics into Cantor set and improving Cantor set. According to the fact that the characteristics of class I big data are completely consistent with the basic characteristics of P-sets, this paper gives research on theory and application on class I big data from the view of mathematics. Here we introduce Class I big data which need some new definitions of data block, microdata and data link. Based on these concepts, decomposition theorem of data block and microdata relation theorem are given, and then attribute reasoning theorem and microdata intelligent discovery and the intelligent secure acquisition algorithm of microdata are also proposed. By using these theoretical results, the applications of secure acquisition of microdata are presented. In summary, P-sets mathematical model provides a new theory and method for studying class I big data. [ABSTRACT FROM AUTHOR]

Published

2023

15. Common terms of k-Pell numbers and Padovan or Perrin numbers.

Author

Normenyo, Benedict Vasco, Rihane, Salah Eddine, and Togbé, Alain

Subjects

*GENERALIZATION, *MATHEMATICS, *SHIFT registers, *RECURSIVE sequences (Mathematics)

Abstract

Let k ≥ 2 . A generalization of the well-known Pell sequence is the k-Pell sequence. For this sequence, the first k terms are 0 , ... , 0 , 1 and each term afterwards is given by the linear recurrence P n (k) = 2 P n - 1 (k) + P n - 2 (k) + ⋯ + P n - k (k). In this paper, we extend the previous work (Rihane and Togbé in Ann Math Inform 54:57–71, 2021) and investigate the Padovan and Perrin numbers in the k-Pell sequence. [ABSTRACT FROM AUTHOR]

Published

2023

16. Blow-up time estimate for porous-medium problems with gradient terms under Robin boundary conditions.

Author

Shen, Xuhui

Subjects

*DIFFERENTIAL inequalities, *BLOWING up (Algebraic geometry), *CONVEX domains, *OPEN-ended questions, *MATHEMATICS

Abstract

This paper deals with the blow-up phenomena connected to the following porous-medium problem with gradient terms under Robin boundary conditions: { u t = Δ u m + k 1 u p − k 2 | ∇ u | q in Ω × (0 , t ∗) , ∂ u ∂ ν + γ u = 0 on ∂ Ω × (0 , t ∗) , u (x , 0) = u 0 (x) ≥ 0 in Ω ‾ , where Ω ⊂ R n (n ≥ 3 ) is a bounded and convex domain with smooth boundary ∂Ω. The constants p, q, m are positive, and p > q > m > 1 , q > 2 . By making use of the Sobolev inequality and the differential inequality technique, we obtain a lower bound for the blow-up time of the solution. In addition, an example is given as an application of the abstract results obtained in this paper. Our results can be regarded as an answer to the open question raised by Li et al. in (Z. Angew. Math. Phys. 70:1–18, 2019). [ABSTRACT FROM AUTHOR]

Published

2022

17. On the blow-up criterion for the Hall-MHD problem with partial dissipation in R3.

Author

Du, Baoying

Subjects

*MATHEMATICS

Abstract

In this paper, we investigate the 3D incompressible Hall-magnetohydrodynamics with partial dissipation. Based on the results in (Du in Bound. Value Probl. 2022:6, 2022; Du and Liu in Acta Math. Sci. 42A:5, 2022; Fei and Xiang in J. Math. Phys. 56:051504, 2015), we establish an improved blow-up criterion for classical solutions. Furthermore, using the blow-up criterion, we also obtain the existence of the classical solutions only under the condition that the initial data ∥ V 0 ∥ H 1 + ∥ B 0 ∥ H 2 are sufficiently small. [ABSTRACT FROM AUTHOR]

Published

2023

18. On Superspecial abelian surfaces over finite fields III.

Author

Xue, Jiangwei, Yu, Chia-Fu, and Zheng, Yuqiang

Subjects

*CONJUGACY classes, *QUATERNIONS, *FINITE fields, *MATHEMATICS, *ARITHMETIC, *ALGEBRA

Abstract

In the paper (J Math Soc Jpn 72(1):303–331, 2020), Tse-Chung Yang and the first two current authors computed explicitly the number | SSp 2 (F q) | of isomorphism classes of superspecial abelian surfaces over an arbitrary finite field F q of even degree over the prime field F p . There it was assumed that certain commutative Z p -orders satisfy an étale condition that excludes the primes p = 2 , 3 , 5 . We treat these remaining primes in the present paper, where the computations are more involved because of the ramification. This completes the calculation of | SSp 2 (F q) | in the even degree case. The odd degree case was previous treated by Tse-Chung Yang and the first two current authors in (Doc Math 21:1607–1643, 2016). To complete the proof of our main theorem, we give a classification of lattices over local quaternion Bass orders, which is a new input to our previous works. [ABSTRACT FROM AUTHOR]

Published

2021

19. On initial inverse problem for nonlinear couple heat with Kirchhoff type.

Author

Nam, Danh Hua Quoc

Subjects

*NONLINEAR equations, *PHENOMENOLOGICAL biology, *PHENOMENOLOGICAL theory (Physics), *MATHEMATICS, *LAX pair

Abstract

The main objective of the paper is to study the final model for the Kirchhoff-type parabolic system. Such type problems have many applications in physical and biological phenomena. Under some smoothness of the final Cauchy data, we prove that the problem has a unique mild solution. The main tool is Banach's fixed point theorem. We also consider the non-well-posed problem in the Hadamard sense. Finally, we apply truncation method to regularize our problem. The paper is motivated by the work of Tuan, Nam, and Nhat [Comput. Math. Appl. 77(1):15–33, 2019]. [ABSTRACT FROM AUTHOR]

Published

2021

20. Realization of a Fourth-Order Linear Time-Varying Differential System with Nonzero Initial Conditions by Cascaded two Second-Order Commutative Pairs.

Author

Ibrahim, Salisu and Koksal, Mehmet Emir

Subjects

*TIME-varying systems, *LINEAR systems, *PHYSICAL sciences, *MATHEMATICS

Abstract

Decomposition is an important tool that is used in many differential systems for solving real engineering problems and improving the stability of a system. It involves breaking down of high-order linear systems into lower-order commutative pairs. Commutativity plays an essential role in mathematics, and its applications are extended in physical science and engineering. This paper explicitly expresses all form of necessary and sufficient conditions for decomposition of any kind of fourth-order linear time-varying system as commutative pairs of two second-order systems. Regarding the nonzero initial conditions, additional requirements are derived in order to satisfy the decomposition process. In this paper, explicit method for reducing fourth-order linear time-varying systems (LTVS) into two second-order commutative pairs is derived and solved. The method points out the effect of disturbance and sensitivity on the systems and also highlights the necessary and sufficient conditions for commutativity of the decomposed systems. The results are illustrated by solving some examples. [ABSTRACT FROM AUTHOR]

Published

2021

21. Approximation of function using generalized Zygmund class.

Author

Nigam, H. K., Mursaleen, Mohammad, and Rani, Supriya

Subjects

*ERROR functions, *GENERALIZED spaces, *APPROXIMATION error, *FOURIER series, *MATHEMATICS, *PERIODIC functions

Abstract

In this paper we review some of the previous work done by the earlier authors (Singh et al. in J. Inequal. Appl. 2017:101, 2017; Lal and Shireen in Bull. Math. Anal. Appl. 5(4):1–13, 2013), etc., on error approximation of a function g in the generalized Zygmund space and resolve the issue of these works. We also determine the best error approximation of the functions g and g ′ , where g ′ is a derived function of a 2π-periodic function g, in the generalized Zygmund class X z (η) , z ≥ 1 , using matrix-Cesàro (T C δ) means of its Fourier series and its derived Fourier series, respectively. Theorem 2.1 of the present paper generalizes eight earlier results, which become its particular cases. Thus, the results of (Dhakal in Int. Math. Forum 5(35):1729–1735, 2010; Dhakal in Int. J. Eng. Technol. 2(3):1–15, 2013; Nigam in Surv. Math. Appl. 5:113–122, 2010; Nigam in Commun. Appl. Anal. 14(4):607–614, 2010; Nigam and Sharma in Kyungpook Math. J. 50:545–556, 2010; Nigam and Sharma in Int. J. Pure Appl. Math. 70(6):775–784, 2011; Kushwaha and Dhakal in Nepal J. Sci. Technol. 14(2):117–122, 2013; Shrivastava et al. in IOSR J. Math. 10(1 Ver. I):39–41, 2014) become particular cases of our Theorem 2.1. Several corollaries are also deduced from our Theorem 2.1. [ABSTRACT FROM AUTHOR]

Published

2021

22. Some results of neutrosophic normed space VIA Tribonacci convergent sequence spaces.

Author

Khan, Vakeel A., Arshad, Mohammad, and Khan, Mohammad Daud

Subjects

*SEQUENCE spaces, *TOPOLOGICAL property, *NORMED rings, *MATHEMATICS

Abstract

The concept of Tribonacci sequence spaces by the domain of a regular Tribonacci matrix was introduced by Yaying and Hazarika (Math. Slovaca 70(3):697–706, 2000). In this paper, by using the domain of regular Tribonacci matrix T = (t i k) and the concept of neutrosophic convergence, we introduce some neutrosophic normed space in Tribonacci convergent spaces and prove some topological and algebraic properties based results with respect to these spaces. [ABSTRACT FROM AUTHOR]

Published

2022

23. On the analytical derivation of efficient sets in quad-and-higher criterion portfolio selection.

Author

Qi, Yue and Steuer, Ralph E.

Subjects

*DIVIDEND yield, *ALGORITHMS, *MATHEMATICS, *PARABOLOID, *SUSTAINABILITY

Abstract

This paper provides results in the area of the analytical derivation of the efficient set of a mean-variance portfolio selection problem that has more than three criteria. By "analytical" we mean derived by formula as opposed to being computed by algorithm. By "more than three criteria", we mean that beyond the mean and variance of regular portfolio selection, the problems addressed have two or more additional linear objectives. The additional objectives might include sustainability, dividend yield, liquidity, and R&D as extra objectives like these are being seen with greater frequency. While not all multiple criteria portfolio selection problems lend themselves to an analytical derivation, a certain class does and the problems in this class are covered by the mathematics of this paper. [ABSTRACT FROM AUTHOR]

Published

2020

24. Superblock-based performance optimization for Sunway Math Library on SW26010 many-core processor.

Author

Cao, Hao, Guo, Shaozhong, Hao, Jiangwei, Xia, Yuanyuan, and Xu, Jinchen

Subjects

*MATHEMATICS, *COMPILERS (Computer programs)

Abstract

The SW26010 many-core processor is based on the Sunway architecture that is composed of management and computing processing elements (MPE and CPE, respectively), each of which is equipped with a stand-alone math library. The issue is that each Sunway Math Library (SML) version is written in assembly which is outside the power of compilers that take high-level languages as input; existing optimization approaches thus mainly rely on manual strategies, which are considered inefficient. In this paper, we leverage the concept of superblock scheduling, a well-known compilation technique, and present a tool named SMPOT to optimize the SML. SMPOT first builds a superblock using a novel tail duplication algorithm, and then uses code motion restrictions to avoid code compensation, followed by matching the machine model. Finally, it reorders instructions on the main path by an activation algorithm based on available computing resources. The experimental results show that SMPOT can effectively improve the performance of the SML. The main path performance of MPE functions is improved by 10.61% on average and overall performance by 5.40%. The main path performance of CPE functions is improved by 5.72% on average and overall performance by 2.98%. [ABSTRACT FROM AUTHOR]

Published

2022

25. CFD researches of centrifugal compressor stage vane diffusers in interests of math modeling.

Author

Borovkov, Aleksey, Galerkin, Yuri, Petukhov, Evgeniy, Drozdov, Aleksandr, Yadikin, Vladimir, Rekstin, Aleksey, Semenovskiy, Vasiliy, Solovyeva, Olga, and Marenina, Lyubov

Subjects

*CENTRIFUGAL compressors, *FLOW separation, *MATHEMATICS, *MATHEMATICAL models, *MATHEMATICAL optimization

Abstract

The paper presents results of CFD parametric study of centrifugal compressor stage vane diffusers in the Ansys CFX. The results obtained will be used to build a mathematical model of vane diffuser in optimization design system. Objects of research are vane diffusers with external relative diameter (relative to the diameter of the impeller) equal to 1.5; vane inlet angle of 20°; relative vane heights of 0.025, 0.034, 0.045, 0.06, and 0.08; and vane profile curvature angles of 10, 15, and 20 °. The characteristics of polytrophic efficiency, loss coefficient, recovery coefficient, ratio of inlet and outlet velocities, and flow deviation angle versus incidence angle are set. The analysis of the flow structure in the vane diffuser channels is presented. Unlike with a straight vane cascade, the deviation angle in the circular rows of vane diffusers tends to increase with increasing row density. This may be due to the complex nature of the interaction of the active part of the flow with separation zones. In rows with almost straight vanes at a lower density, the separation zone on the pressure side decreases and even shifts to the very end of the suction side. [ABSTRACT FROM AUTHOR]

Published

2022

26. Cognitive Unity of Thales' Mathematics.

Author

Kvasz, Ladislav

Subjects

*CONCORD, *MATHEMATICS, *SCIENTIFIC Revolution, *SEVENTEENTH century, *PARALLEL processing

Abstract

The aim of the paper is to argue for the cognitive unity of the mathematical results ascribed by ancient authors to Thales. These results are late ascriptions and so it is difficult to say anything certain about them on philological grounds. I will seek characteristic features of the cognitive unity of the mathematical results ascribed to Thales by comparing them with Galilean physics. This might seem at a first sight a rather unusual move. Nevertheless, I suggest viewing the process of turning geometry into an axiomatic-deductive science as a process of idealization in mathematics that is parallel to the process of idealization in physics. In Kvasz (Acta Phys Slovaca 62:519–614, 2012) I offered an epistemological reconstruction of the process of idealization in physics during the scientific revolution of the seventeenth century. In the present paper I try to employ these epistemological insights in the process of idealization in physics and propose a reconstruction of the cognitive unity of the mathematical results ascribed to Thales, who can, on the basis of these ascriptions, be seen as one of the initiators of idealization in mathematics. [ABSTRACT FROM AUTHOR]

Published

2020

27. Complete moment convergence of extended negatively dependent random variables.

Author

Song, Mingzhu and Zhu, Quanxin

Subjects

*RANDOM variables, *DEPENDENT variables, *MATHEMATICS

Abstract

In this paper, some results on the complete moment convergence of extended negatively dependent (END) random variables are established. The results in the paper improve and extend the corresponding ones of Qiu et al. (Acta Math. Appl. Sin. 40(3):436–448, 2017) under some weaker conditions. Our results also improve and extend the related known works in the literature. [ABSTRACT FROM AUTHOR]

Published

2020

28. Generalized fractional integral inequalities of Hermite–Hadamard type for harmonically convex functions.

Author

Zhao, Dafang, Ali, Muhammad Aamir, Kashuri, Artion, and Budak, Hüseyin

Subjects

*INTEGRAL inequalities, *FRACTIONAL integrals, *GENERALIZED integrals, *CONVEX functions, *MATHEMATICS

Abstract

In this paper, we establish inequalities of Hermite–Hadamard type for harmonically convex functions using a generalized fractional integral. The results of our paper are an extension of previously obtained results (İşcan in Hacet. J. Math. Stat. 43(6):935–942, 2014 and İşcan and Wu in Appl. Math. Comput. 238:237–244, 2014). We also discuss some special cases for our main results and obtain new inequalities of Hermite–Hadamard type. [ABSTRACT FROM AUTHOR]

Published

2020

29. Local monotonicity coefficients in Orlicz sequence spaces equipped with the p-Amemiya norm.

Author

He, Xin, Cui, Yunan, and Hudzik, Henryk

Subjects

*SEQUENCE spaces, *ORLICZ spaces, *MATHEMATICS

Abstract

In this paper, the monotonicity is investigated with respect to Orlicz sequence space l Φ , p equipped with the p-Amemiya norm, and the necessary and sufficient condition is obtained to guarantee the uniform monotonicity, locally uniform monotonicity, and strict monotonicity for l Φ , p . This completes the results of the paper (Cui et al. in J. Math. Anal. Appl. 432:1095–1105, 2015) which were obtained for the non-atomic measure space. Local upper and lower coefficients of monotonicity at any point of the unit sphere are calculated, l Φ , p is calculated. [ABSTRACT FROM AUTHOR]

Published

2020

30. Existence of groundstates for Choquard type equations with Hardy–Littlewood–Sobolev critical exponent.

Author

Li, Xiaowei and Wang, Feizhi

Subjects

*EQUATIONS, *CRITICAL exponents, *MATHEMATICS

Abstract

In this paper, we consider a class of Choquard equations with Hardy–Littlewood–Sobolev lower or upper critical exponent in the whole space R N . We combine an argument of L. Jeanjean and H. Tanaka (see (Proc. Am. Math. Soc. 131:2399–2408, 2003) with a concentration–compactness argument, and then we obtain the existence of ground state solutions, which extends and complements the earlier results. [ABSTRACT FROM AUTHOR]

Published

2021

31. Evaluating class and school effects on the joint student achievements in different subjects: a bivariate semiparametric model with random coefficients.

Author

Masci, Chiara, Ieva, Francesca, Agasisti, Tommaso, and Paganoni, Anna Maria

Subjects

*ACADEMIC achievement, *EXPECTATION-maximization algorithms, *DISTRIBUTION (Probability theory), *ALGORITHMS, *MATHEMATICS students, *MATHEMATICS

Abstract

This paper proposes an innovative statistical method to measure the impact of the class/school on student achievements in multiple subjects. We propose a semiparametric model for a bivariate response variable with random coefficients, that are assumed to follow a discrete distribution with an unknown number of support points, together with an Expectation-Maximization algorithm—called BSPEM algorithm—to estimate its parameters. In the case study, we apply the BSPEM algorithm to data about Italian middle schools, considering students nested within classes, and we identify subpopulations of classes, standing on their effects on student achievements in reading and mathematics. The proposed model is extremely informative in exploring the correlation between multiple class effects, which are typical of the educational production function. The estimated class effects on reading and mathematics student achievements are then explained in terms of various class and school level characteristics selected by means of a LASSO regression. [ABSTRACT FROM AUTHOR]

Published

2021

32. Controllability Results for the Rolling of 2-Dimensional Against 3-Dimensional Riemannian Manifolds—Part 1.

Author

Mortada, Amina, Chitour, Yacine, Kokkonen, Petri, and Wehbe, Ali

Subjects

*RIEMANNIAN manifolds, *RIEMANNIAN geometry, *LIE algebras, *MATHEMATICS, *CONTINUATION methods

Abstract

This paper is the first of two parts which considers the rolling (or development) of two Riemannian connected manifolds (M,g) and M ̂ , ĝ of dimensions 2 and 3 respectively, with the constraints of no-spinning and no-slipping. The present work is a continuation of Mortada et al. (Acta Appl Math 139:105–31, 2015), which modeled the general setting of the rolling of two Riemannian connected manifolds with different dimensions as a driftless control affine system on a fibered space Q of dimension eighth, with an emphasis on understanding the local structure of the rolling orbits, i.e., the reachable sets in Q. We show that the possible dimensions of non open rolling orbits belong to the set {2, 5, 6, 7}. In this first part, we describe the structures of orbits of dimension 2, one of the two possible local structure of rolling orbits of dimension 5 and special cases of dimension 7. [ABSTRACT FROM AUTHOR]

Published

2021

33. Approximate Controllability of Second-Grade Fluids.

Author

Ngo, Van-Sang and Raugel, Geneviève

Subjects

*FLUIDS, *TORUS, *PSEUDOPLASTIC fluids, *MATHEMATICS

Abstract

This paper deals with the controllability of the second-grade fluids, a class of non-Newtonian of differential type, on a two-dimensional torus. Using the method of Agrachev and Sarychev (J. Math Fluid Mech., 7(1):108–52 (2005)), Agrachev and Sarychev (Commun Math Phys., 265(3):673–97 (2006)), and of Shirikyan (Commun Math Phys., 266(1):123–51 (2006)), we prove that the system of second-grade fluids is approximately controllable by a finite-dimensional control force. [ABSTRACT FROM AUTHOR]

Published

2021

34. Sharp bounds for a ratio of the q-gamma function in terms of the q-digamma function.

Author

Alzahrani, Faris, Salem, Ahmed, and El-Shahed, Moustafa

Subjects

*GAMMA functions, *REAL numbers, *MONOTONIC functions, *MATHEMATICS

Abstract

In the present paper, we introduce sharp upper and lower bounds to the ratio of two q-gamma functions Γ q (x + 1) / Γ q (x + s) for all real number s and 0 < q ≠ 1 in terms of the q-digamma function. Our results refine the results of Ismail and Muldoon (Internat. Ser. Numer. Math., vol. 119, pp. 309–323, 1994) and give the answer to the open problem posed by Alzer (Math. Nachr. 222(1):5–14, 2001). Also, for the classical gamma function, our results give a Kershaw inequality for all 0 < s < 1 when letting q → 1 and a new inequality for all s > 1 . [ABSTRACT FROM AUTHOR]

Published

2021

35. Towards efficient tile low-rank GEMM computation on sunway many-core processors.

Author

Han, Qingchang, Yang, Hailong, Dun, Ming, Luan, Zhongzhi, Gan, Lin, Yang, Guangwen, and Qian, Depei

Subjects

*MATRIX multiplications, *TILES, *ARITHMETIC, *MATRICES (Mathematics), *MATHEMATICS

Abstract

Tile low-rank general matrix multiplication (TLR GEMM) is a novel method of matrix multiplication on large data-sparse matrices, which can significantly reduce storage footprint and arithmetic complexity under given accuracy. To implement high-performance TLR GEMM on Sunway many-core processor, the following challenges remain to be addressed: 1) design an efficient parallel scheme; 2) provide an efficient kernel library of math functions commonly used in TLR GEMM. This paper proposes swTLR GEMM, an efficient implementation of TLR GEMM. We assign LR GEMM computation to a single computing processing element (CPE) and use grouped task queue to process different data tiles of the TLR matrix. Moreover, we implement an efficient kernel library (swLR Kernels) for low-rank matrix operations. To scale to massive (CGs), we organize the CGs into the CG grid and partition the matrices into blocks accordingly. We also apply Cannon's algorithm to enable efficient communication when processing the matrix blocks across CGs simultaneously. The experiment results show that the DGEMM kernel in swLR Kernels achieves 102 × speedup on average. In terms of overall performance, swTLR GEMM-LLD and swTLR GEMM-LLL achieve 91 × and 20.1 × speedup on average, respectively. In addition, our implementation of swTLR GEMM exhibits good scalability when running on 1,024 CGs of Sunway processors (66,560 cores in total). [ABSTRACT FROM AUTHOR]

Published

2021

36. Hamiltonian description of nonlinear curl forces from cofactor systems.

Author

Ghose-Choudhury, A. and Guha, Partha

Subjects

*HAMILTONIAN systems, *HOMOGENEOUS polynomials, *MATHEMATICS, *OPTICS

Abstract

Recently, Berry and Shukla presented (J Phys A 45:305201, 2012; J Phys A 46:422001, 2013; Proc R Soc A 471:20150002, 2015) a fundamental new dynamics concerning forces (accelerations) depending only on position, i.e. without velocity-dependent dissipation, which was partly anticipated in the papers of cofactor systems introduced by the Linköping school (Rauch-Wojciechowski et al. in J Math Phys 40:6366–6398, 1999; Lundmark in Stud Appl Math 110(3):257–296, 2003; Lundmark in Integrable nonconservative Newton systems with quadratic integrals of motion. Linköping Studies in Science and Technology. Thesis No. 756, Linköping Univ., Linköping, 1999). In this paper, we extend their results to nonlinear curl forces, where the nonlinearity is with respect to the coordinate dependence of the forces, and study the Hamiltonians for homogeneous quadratic and cubic cases presenting the conditions for existence of Hamiltonian curl forces. In particular, we examine the existence and expressions of the Hamiltonian curl forces for planar systems when the accelerations are given by general (both homogeneous and inhomogeneous) second-order and homogeneous cubic polynomials, and also associate the cubic case with an example from optics. [ABSTRACT FROM AUTHOR]

Published

2019

37. Upper semicontinuity of attractors for nonclassical diffusion equations with arbitrary polynomial growth.

Author

Xie, Yongqin, Li, Jun, and Zhu, Kaixuan

Subjects

*HEAT equation, *POLYNOMIALS, *DECOMPOSITION method, *DYNAMICAL systems, *MATHEMATICS, *AUTONOMOUS differential equations

Abstract

In this paper, we mainly investigate upper semicontinuity and regularity of attractors for nonclassical diffusion equations with perturbed parameters ν and the nonlinear term f satisfying the polynomial growth of arbitrary order p − 1 (p ≥ 2 ). We extend the asymptotic a priori estimate method (see (Wang et al. in Appl. Math. Comput. 240:51–61, 2014)) to verify asymptotic compactness and upper semicontinuity of a family of semigroups for autonomous dynamical systems (see Theorems 2.2 and 2.3). By using the new operator decomposition method, we construct asymptotic contractive function and obtain the upper semicontinuity for our problem, which generalizes the results obtained in (Wang et al. in Appl. Math. Comput. 240:51–61, 2014). In particular, the regularity of global attractors is obtained, which extends and improves some results in (Xie et al. in J. Funct. Spaces 2016:5340489, 2016; Xie et al. in Nonlinear Anal. 31:23–37, 2016). [ABSTRACT FROM AUTHOR]

Published

2021

38. Stability Property of Functional Equations in Modular Spaces: A Fixed-Point Approach.

Author

Saha, P., Mondal, Pratap, and Choudhury, B. S.

Subjects

*FUNCTIONAL equations, *MATHEMATICS

Abstract

We investigate the Hyers–Ulam–Rassias stability property of a quadratic functional equation. The analysis is done in the context of modular spaces. The type of stability considered here is very general in character which has been considered in various domains of mathematics. The speciality of the functional equation considered here is that it has a geometrical background behind its introduction. We approach the problem by applying a fixed point method for which a version of the contraction mapping principle in modular spaces is utilized. Also the results in this paper are established without using some familiar conditions on modular spaces. [ABSTRACT FROM AUTHOR]

Published

2021

39. Some algebraic structures on the generalization general products of monoids and semigroups.

Author

Wazzan, Suha Ahmad, Cevik, Ahmet Sinan, and Ates, Firat

Subjects

*GENERALIZATION, *MONOIDS, *SEMILATTICES, *MATHEMATICS

Abstract

For arbitrary monoids A and B, in Cevik et al. (Hacet J Math Stat 2019:1–11, 2019), it has been recently defined an extended version of the general product under the name of a higher version of Zappa products for monoids (or generalized general product) A ⊕ B δ ⋈ ψ B ⊕ A and has been introduced an implicit presentation as well as some theories in terms of finite and infinite cases for this product. The goals of this paper are to present some algebraic structures such as regularity, inverse property, Green's relations over this new generalization, and to investigate some other properties and the product obtained by a left restriction semigroup and a semilattice. [ABSTRACT FROM AUTHOR]

Published

2020

40. Existence result for a Kirchhoff elliptic system with variable parameters and additive right-hand side via sub- and supersolution method.

Author

Haiour, Mohamed, Boulaaras, Salah, Bouizem, Youcef, and Guefaifia, Rafik

Subjects

*MATHEMATICS

Abstract

The paper deals with the study of the existence result for a Kirchhoff elliptic system with additive right-hand side and variable parameters by using the sub-/supersolution method. Our study is a natural extension result of our previous one in (Boulaaras and Guefaifia in Math. Methods Appl. Sci. 41:5203–5210, 2018), where we discussed only the simple case when the parameters are constant. [ABSTRACT FROM AUTHOR]

Published

2020

41. New Riemann–Liouville fractional Hermite–Hadamard type inequalities for harmonically convex functions.

Author

Şanlı, Zeynep, Kunt, Mehmet, and Köroğlu, Tuncay

Subjects

*INTEGRAL inequalities, *CONVEX functions, *DIFFERENTIABLE functions, *TRAPEZOIDS, *FRACTIONAL integrals, *IDENTITY (Psychology), *MATHEMATICAL equivalence, *MATHEMATICS

Abstract

In this paper, we proved two new Riemann–Liouville fractional Hermite–Hadamard type inequalities for harmonically convex functions using the left and right fractional integrals independently. Also, we have two new Riemann–Liouville fractional trapezoidal type identities for differentiable functions. Using these identities, we obtained some new trapezoidal type inequalities for harmonically convex functions. Our results generalize the results given by İşcan (Hacet J Math Stat 46(6):935–942, 2014). [ABSTRACT FROM AUTHOR]

Published

2020

42. A Dai–Liao conjugate gradient method via modified secant equation for system of nonlinear equations.

Author

Waziri, M. Y., Ahmed, K., and Sabi'u, J.

Subjects

*CONJUGATE gradient methods, *NONLINEAR equations, *BENCHMARK problems (Computer science), *MATHEMATICS

Abstract

In this paper, we propose a Dai–Liao (DL) conjugate gradient method for solving large-scale system of nonlinear equations. The method incorporates an extended secant equation developed from modified secant equations proposed by Zhang et al. (J Optim Theory Appl 102(1):147–157, 1999) and Wei et al. (Appl Math Comput 175(2):1156–1188, 2006) in the DL approach. It is shown that the proposed scheme satisfies the sufficient descent condition. The global convergence of the method is established under mild conditions, and computational experiments on some benchmark test problems show that the method is efficient and robust. [ABSTRACT FROM AUTHOR]

Published

2020

43. A Zygmund-type integral inequality for polynomials.

Author

Mir, Abdullah

Subjects

*INTEGRAL inequalities, *POLYNOMIALS, *MATHEMATICS

Abstract

Let P(z) be a polynomial of degree n which does not vanish in | z | < 1 . Then it was proved by Hans and Lal (Anal Math 40:105–115, 2014) that | z s P (s) + β n s 2 s P (z) | ≤ n s 2 (| 1 + β 2 s | + | β 2 s |) max | z | = 1 | P (z) | , for every β ∈ C with | β | ≤ 1 , 1 ≤ s ≤ n and | z | = 1. The L γ analog of the above inequality was recently given by Gulzar (Anal Math 42:339–352, 2016) who under the same hypothesis proved { ∫ 0 2 π | e i s θ P (s) (e i θ) + β n s 2 s P (e i θ) | γ d θ } 1 γ ≤ n s { ∫ 0 2 π | (1 + β 2 s ) e i α + β 2 s | γ d α } 1 γ { ∫ 0 2 π | P (e i θ) | γ d θ } 1 γ { ∫ 0 2 π | 1 + e i α | γ d α } 1 γ , where n s = n (n - 1) ... (n - s + 1) and 0 ≤ γ < ∞ . In this paper, we generalize this and some other related results. [ABSTRACT FROM AUTHOR]

Published

2020

44. Limit cycle bifurcations in a planar piecewise quadratic system with multiple parameters.

Author

Gong, Shuhua and Han, Maoan

Subjects

*LIMIT cycles, *MATHEMATICS

Abstract

This paper is concerned with the number of limit cycles bifurcating from a period annulus for some planar piecewise smooth non-Hamiltonian systems. We construct a planar piecewise quadratic system with multiple parameters, obtain its lower bound for the maximum number of limit cycles by using Melnikov function method, and find more limit cycles than (Li and Liu in J. Math. Anal. Appl. 428:1354–1367, 2015). [ABSTRACT FROM AUTHOR]

Published

2020

45. Existence of ground state solutions for quasilinear Schrödinger equations with general Choquard type nonlinearity.

Author

He, Yu-bo, Zhou, Jue-liang, and Lin, Xiao-yan

Subjects

*NONLINEAR analysis, *SCHRODINGER equation, *BLOWING up (Algebraic geometry), *MATHEMATICS

Abstract

In this paper, we study the following Choquard type quasilinear Schrödinger equation: − Δ u + u − Δ (u 2) u = (I α ∗ G (u)) g (u) , x ∈ R N , where N ≥ 3 , 0 < α < N , and I α is a Riesz potential. By using the minimization method developed by (Tang and Chen in Adv. Nonlinear Anal. 9:413–437, 2020; Willem in Minimax Theorems, 1996), we establish the existence of ground state solutions with general Choquard type nonlinearity. Our results extend the results obtained by (Chen et al. in Appl. Math. Lett. 102:106141, 2020). [ABSTRACT FROM AUTHOR]

Published

2020

46. The Groups <italic>G</italic>2<italic>n</italic> with Additional Structures.

Author

Kim, Seongjeong

Subjects

*GROUP theory, *ABSTRACT algebra, *FINITE groups, *INTEGERS, *COMPOSITE numbers, *MATHEMATICS

Abstract

In the paper [1], V. O. Manturov introduced the groups Gkn depending on two natural parameters n > k and naturally related to topology and to the theory of dynamical systems. The group G2n, which is the simplest part of Gkn, is isomorphic to the group of pure free braids on n strands. In the present paper, we study the groups G2n supplied with additional structures-parity and points; these groups are denoted by G2n,p and G2n,d. First,we define the groups G2n,p and G2n,d, then study the relationship between the groups G2n, G2n,p, and G2n,d. Finally, we give an example of a braid on n + 1 strands, which is not the trivial braid on n + 1 strands, by using a braid on n strands with parity. After that, the author discusses links in Sg × S1 that can determine diagrams with points; these points correspond to the factor S1 in the product Sg × S1. [ABSTRACT FROM AUTHOR]

Published

2018

47. Multipliers in spaces of Bessel potentials: The case of indices of nonnegative smoothness.

Author

Belyaev, A. and Shkalikov, A.

Subjects

*MULTIPLIERS (Mathematical analysis), *MATHEMATICS, *ELLIPTIC operators, *TOPOLOGY, *PHYSICAL distribution of goods

Abstract

The aim of the paper is to study spaces of multipliers acting from the Bessel potential space H (ℝ) to the other Bessel potential space H (ℝ). We obtain conditions ensuring the equivalence of uniform and standard multiplier norms on the space of multipliers In the case , the space M[ H (ℝ) → H (ℝ) can be described explicitly. Namely, we prove in this paper that the latter space coincides with the space H (ℝ) of uniformly localized Bessel potentials introduced by Strichartz. It is also proved that if both smoothness indices s and t are nonnegative, then such a description is possible only for the given values of the indices. [ABSTRACT FROM AUTHOR]

Published

2017

48. Constructing Service Clusters Based on Service Space.

Author

Du, Yuyue, Wang, Lu, and Qi, Man

Subjects

*WEB services, *COMPUTATIONAL complexity, *MATHEMATICS, *TECHNOLOGICAL innovations, *COMPARATIVE studies

Abstract

With the development of Web services, the quantity of services in clusters has increased rapidly, and the time complexity of service clustering becomes higher. To solve this problem, a new construction method of service clusters is proposed based on service space in this paper. The main innovation is the construction of service space. Firstly, a mathematical space is defined. Then, services are abstracted and quantized to the space based on ontology trees. The experiment illustrates that the time complexity of constructing service clusters is decreased. Moreover, the construction of service space and the mapping rules are shown in this paper. A service cluster and its dynamic library are constructed based on service space. The structure, updating mechanism and generation flows of service clusters are modeled by logic Petri nets. Finally, the validity and advantages of proposed methods are illustrated by some experiments and comparative analysis. [ABSTRACT FROM AUTHOR]

Published

2017

49. Near-coincidence point results in metric interval space and hyperspace via simulation functions.

Author

Ullah, Misbah, Sarwar, Muhammad, Khan, Hasib, Abdeljawad, Thabet, and Khan, Aziz

Subjects

*METRIC spaces, *HYPERSPACE, *DEFINITIONS, *MATHEMATICS

Abstract

Recently, Wu (Mathematics 6(11):219, 2018; Mathematics 6(6):90, 2018) introduced the concept of a near-fixed point and established some results on near fixed points in a metric interval space and hyperspace. Motivated by these papers, we studied the near-coincidence point theorem in these spaces via a simulation function. To show the authenticity of the established results and definitions, we also provide some examples. [ABSTRACT FROM AUTHOR]

Published

2020

50. The arbitrary-order fractional hyperbolic nonlinear scalar conservation law.

Author

Shirkhorshidi, S. M. Reza, Rostamy, D., Othman, W. A. M., and Awang, M. A. Omar

Subjects

*CONSERVATION laws (Physics), *DEFINITIONS, *MATHEMATICS

Abstract

In this paper, we use a new powerful technique of arbitrary-order fractional (AOF) characteristic method (CM) to solve the AOF hyperbolic nonlinear scalar conservation law (HNSCL) of time and space. We present the existence and uniqueness of this class of equations in time and one-dimensional space of fractional arbitrary order. We extend Jumarie's modification of Riemann–Liouville and Caputo's definition of the fractional arbitrary order to introduce some formulae (Appl. Math. Lett. 22:378–385, 2009; Appl. Math. Lett. 18:739–748, 2005). Then, we use these formulae to prove the main theorem. In the application section, we use the analytical technique that is presented in the theorem to solve examples that are given. [ABSTRACT FROM AUTHOR]

Published

2020