Showing total 14,458 results

1. Bohemian Matrices: Past, Present and Future

Author

Sendra, Juana, Filipe, Joaquim, Editorial Board Member, Ghosh, Ashish, Editorial Board Member, Prates, Raquel Oliveira, Editorial Board Member, Zhou, Lizhu, Editorial Board Member, Corless, Robert M., editor, Gerhard, Jürgen, editor, and Kotsireas, Ilias S., editor

Published

2021

2. Solving of Eigenvalue and Singular Value Problems via Modified Householder Transformations on Shared Memory Parallel Computing Systems

Author

Andreev, Andrey, Egunov, Vitaly, Barbosa, Simone Diniz Junqueira, Editorial Board Member, Filipe, Joaquim, Editorial Board Member, Ghosh, Ashish, Editorial Board Member, Kotenko, Igor, Editorial Board Member, Zhou, Lizhu, Editorial Board Member, Voevodin, Vladimir, editor, and Sobolev, Sergey, editor

Published

2019

3. Reply to comment on the paper “ on a role of quadruple component of magnetic field in defining solar activity in grand cycles” by Usoskin (2017).

Author

Zharkova, V., Popova, E., Shepherd, S., and Zharkov, S.

Subjects

*QUADRUPLE systems (Combinatorics), *SOLAR activity, *MULTIPLE correspondence analysis (Statistics), *SOLAR magnetic fields, *EIGENVALUES

Abstract

In this communication we provide our answers to the comments by Usoskin (2017) on our recent paper (Popova et al, 2017a). We show that Principal Component Analysis (PCA) allows us to derive eigen vectors with eigen values assigned to variance of solar magnetic field waves from full disk solar magnetograms obtained in cycles 21–23 which came in pairs. The current paper (Popova et al, 2017a) adds the second pair of magnetic waves generated by quadruple magnetic sources. This allows us to recover a centennial cycle, in addition to the grand cycle, and to produce a closer fit to the solar and terrestrial activity features in the past millennium. [ABSTRACT FROM AUTHOR]

Published

2018

4. Decay Rate of the Eigenvalues of the Neumann-Poincaré Operator.

Author

Fukushima, Shota, Kang, Hyeonbae, and Miyanishi, Yoshihisa

Abstract

If the boundary of a domain in three dimensions is smooth enough, then the decay rate of the eigenvalues of the Neumann-Poincaré operator is known and it is optimal. In this paper, we deal with domains with less regular boundaries and derive quantitative estimates for the decay rates of the Neumann-Poincaré eigenvalues in terms of the Hölder exponent of the boundary. Estimates in particular show that the less the regularity of the boundary is, the slower is the decay of the eigenvalues. We also prove that the similar estimates in two dimensions. The estimates are not only for less regular boundaries for which the decay rate was unknown, but also for regular ones for which the result of this paper makes a significant improvement over known results. [ABSTRACT FROM AUTHOR]

Published

2024

5. DISCUSSION OF "COAUTHORSHIP AND CITATION NETWORKS FOR STATISTICIANS"

Author

Wang, Song and Rohe, Karl

Published

2016

6. Adaptive finite element method for eigensolutions of regular second and fourth order Sturm-Liouville problems via the element energy projection technique

Author

Yuan, Si, Ye, Kangsheng, Wang, Yongliang, Kennedy, David, and Williams, Frederic W.

Published

2017

7. The Concept of Topological Derivative for Eigenvalue Optimization Problem for Plane Structures.

Author

Carvalho, Fernando Soares and Anflor, Carla Tatiana Mota

Subjects

TOPOLOGICAL derivatives, FREE vibration, MODEL airplanes, EIGENVALUES

Abstract

This paper presents the topological derivative of the first eigenvalue for the free vibration model of plane structures. We conduct a topological asymptotic analysis to account for perturbations in the domain caused by inserting a small inclusion. The paper includes a rigorous derivation of the topological derivative for the eigenvalue problem along with a proof of its existence. Additionally, we provide numerical examples that illustrate the application of the proposed methodology for maximizing the first eigenvalue in plane structures. The results demonstrate that multiple eigenvalues were not encountered. [ABSTRACT FROM AUTHOR]

Published

2024

8. Weyl asymptotics for functional difference operators with power to quadratic exponential potential.

Author

Qiu, Yaozhong

Subjects

DIFFERENCE operators, COHERENT states, EIGENVALUES, MATHEMATICS

Abstract

We continue the program first initiated by Laptev, Schimmer, and Takhtajan [Geom. Funct. Anal. 26 (2016), pp. 288–305] and develop a modification of the technique introduced in that paper to study the spectral asymptotics, namely the Riesz means and eigenvalue counting functions, of functional difference operators H_0 = \mathcal {F}^{-1} M_{\cosh (\xi)} \mathcal {F} with potentials of the form W(x) = \left \lvert {x} \right \rvert ^pe^{\left \lvert {x} \right \rvert ^\beta } for either \beta = 0 and p > 0 or \beta \in (0, 2] and p \geq 0. We provide a new method for studying general potentials which includes the potentials studied by Laptev, Schimmer, and Takhtajan [Geom. Funct. Anal. 26 (2016), pp. 288–305] and [J. Math. Phys. 60 (2019), p. 103505]. The proof involves dilating the variance of the gaussian defining the coherent state transform in a controlled manner preserving the expected asymptotics. [ABSTRACT FROM AUTHOR]

Published

2024

9. Discussion on Weighted Fractional Fourier Transform and Its Extended Definitions.

Author

Zhao, Tieyu and Chi, Yingying

Subjects

DISCRETE Fourier transforms, FOURIER transforms, INFORMATION processing, EIGENVALUES, DEFINITIONS

Abstract

The weighted fractional Fourier transform (WFRFT) has always been considered a development of the discrete fractional Fourier transform (FRFT). This paper points out that the WFRFT is a discrete FRFT of eigenvalue decomposition, which will change the consistent understanding of the WFRFT. Extended definitions based on the WFRFT have been proposed and widely used in information processing. This paper proposes a unified framework for extended definitions, and existing extended definitions can serve as special cases of this unified framework. In further analysis, we find that the existing extended definitions are deficient. With the help of a unified framework, we systematically analyze the reasons for the deficiencies. This has great guiding significance for the application of the WFRFT and its extended definitions. [ABSTRACT FROM AUTHOR]

Published

2024

10. Rational QZ steps with perfect shifts.

Author

Mastronardi, Nicola, Van Barel, Marc, Vandebril, Raf, and Van Dooren, Paul

Subjects

EIGENVALUES, ARITHMETIC, PENCILS, REGULAR graphs

Abstract

In this paper we analyze the stability of the problem of performing a rational QZ step with a shift that is an eigenvalue of a given regular pencil H - λ K in unreduced Hessenberg–Hessenberg form. In exact arithmetic, the backward rational QZ step moves the eigenvalue to the top of the pencil, while the rest of the pencil is maintained in Hessenberg–Hessenberg form, which then yields a deflation of the given shift. But in finite-precision the rational QZ step gets "blurred" and precludes the deflation of the given shift at the top of the pencil. In this paper we show that when we first compute the corresponding eigenvector to sufficient accuracy, then the rational QZ step can be constructed using this eigenvector, so that the exact deflation is also obtained in finite-precision. [ABSTRACT FROM AUTHOR]

Published

2024

11. A dimension reduction factor approach for multivariate time series with long-memory: a robust alternative method

Author

Reisen, Valdério Anselmo, Lévy-Leduc, Céline, Monte, Edson Zambon, and Bondon, Pascal

Published

2024

12. Lyapunov-type inequality for an anti-periodic fractional boundary value problem of the riesz-caputo derivative.

Author

TOPRAKSEVEN, Suayip, BENGI, Recep, and ZEREN, Yusuf

Subjects

BOUNDARY value problems, FRACTIONAL differential equations

Abstract

This paper concerns with a Lyapunov-type inequality for the Riesz-Caputo fractional boundary value problem with anti-periodic boundary conditions. As an application for the obtained inequality, a lower bound for the eigenvalues of anti-periodic fractional boundary problems of the Riesz-Caputo derivative has been obtained. [ABSTRACT FROM AUTHOR]

Published

2023

13. Comments on the paper "On the κ-Dirac oscillator revisited".

Author

Chargui, Yassine

Subjects

*ALGEBRA, *EIGENVALUES, *EQUATIONS

Abstract

In Ref. [1] , the κ -Dirac equation, based on the κ -deformed Poincaré-Hopf algebra, have been studied. In particular, solutions of the κ -Dirac oscillator (DO), in a three-dimensional space, were obtained by deriving the associated radial equations. We point out, however, a miscalculation in treating these equations, which had led to erroneous conclusions, particularly, about the energy eigenvalues and the breaking of their infinite degeneracy by the κ -deformation. By the way, we present a simple alternative method to solve the problem using an algebraic procedure. [ABSTRACT FROM AUTHOR]

Published

2020

14. A Non-Destructive Optical Method for the DP Measurement of Paper Insulation Based on the Free Fibers in Transformer Oil.

Author

Peng, Lei, Fu, Qiang, Zhao, Yaohong, Qian, Yihua, Chen, Tiansheng, and Fan, Shengping

Subjects

*EIGENVALUES, *INSULATING oils, *EIGENANALYSIS, *SIMULATION methods & models

Abstract

In order to explore a non-destructive method for measuring the polymerization degree (DP) of paper insulation in transformer, a new method that based on the optical properties of free fiber particles in transformer oil was studied. The chromatic dispersion images of fibers with different aging degree were obtained by polarizing microscope, and the eigenvalues (r, b, and Mahalanobis distance) of the images were extracted by the RGB (red, blue, and green) tricolor analysis method. Then, the correlation between the three eigenvalues and DP of paper insulation were simulated respectively. The results showed that the color of images changed from blue-purple to orange-yellow gradually with the increase of aging degree. For the three eigenvalues, the relationship between Mahalanobis distance and DP had the best goodness of fit (R2 = 0.98), higher than that of r (0.94) and b (0.94). The mean square error of the relationship between Mahalanobis distance and DP (52.17) was also significantly lower than that of r and b (97.58, 98.05). Therefore, the DP of unknown paper insulation could be calculated by the simulated relationship of Mahalanobis distance and DP. [ABSTRACT FROM AUTHOR]

Published

2018

15. Dynamic Heterogeneous Information Network Embedding With Meta-Path Based Proximity.

Author

Wang, Xiao, Lu, Yuanfu, Shi, Chuan, Wang, Ruijia, Cui, Peng, and Mou, Shuai

Subjects

INFORMATION networks, MATRIX decomposition, EIGENVALUES

Abstract

Heterogeneous information network (HIN) embedding aims at learning the low-dimensional representation of nodes while preserving structure and semantics in a HIN. Existing methods mainly focus on static networks, while a real HIN usually evolves over time with the addition (deletion) of multiple types of nodes and edges. Because even a tiny change can influence the whole structure and semantics, the conventional HIN embedding methods need to be retrained to get the updated embeddings, which is time-consuming and unrealistic. In this paper, we investigate the problem of dynamic HIN embedding and propose a novel Dynamic HIN Embedding model (DyHNE) with meta-path based proximity. Specifically, we introduce the meta-path based first- and second-order proximities to preserve structure and semantics in HINs. As the HIN evolves over time, we naturally capture changes with the perturbation of meta-path augmented adjacency matrices. Thereafter, we learn the node embeddings by solving generalized eigenvalue problem effectively and employ eigenvalue perturbation to derive the updated embeddings efficiently without retraining. Experiments show that DyHNE outperforms the state-of-the-arts in terms of effectiveness and efficiency. [ABSTRACT FROM AUTHOR]

Published

2022

16. INVERSE PROBLEM FOR DIFFERENTIAL PENCILS WITH INCOMPLETELY SPECTRAL INFORMATION

Author

Guo, Yongxia and Wei, Guangsheng

Published

2015

17. Symmetry Measure of Truss Structures with Disturbed Higher-order Symmetries.

Author

Módis, Márton and Kovács, Flórián

Subjects

MOLECULAR physics, CHEMICAL engineering, CHEMICAL engineers, SYMMETRY, EIGENVALUES

Abstract

This paper covers aspects of quantifying the symmetry of two- and three-dimensional elastic bar-and-joint structures. The concept of symmetry as a quantitative property instead of a binary question of 'yes' or 'no' is widely accepted and thoroughly investigated, for example, in molecular physics but also in engineering sciences, mainly in chemical engineering. Similarly to most of the articles written on this topic, our method is also based on the comparison of specific metrics of the analyzed structure and a reference one, i.e., which possesses the desired (perfect) symmetry. The deviation of the analyzed (imperfect) structure from the reference structure is quantified by one scalar. The novelty in our approach is that we consider not just the relative position of the nodes but also the normal stiffness of the truss members, even for structures with higher-order, i.e., polyhedral symmetries. For both geometric and material properties to be accounted for, the eigenvalues of the stiffness matrix were chosen as metrics. The difficulty lies in finding the reference structure which will be carried out based on energy principles. [ABSTRACT FROM AUTHOR]

Published

2024

18. Estimates of Eigenvalues and Approximation Numbers for a Class of Degenerate Third-Order Partial Differential Operators.

Author

Muratbekov, Mussakan, Suleimbekova, Ainash, and Baizhumanov, Mukhtar

Subjects

PARTIAL differential operators, PARTIAL differential equations, EIGENVALUES, RECTANGLES, EQUATIONS

Abstract

In this paper, we study the spectral properties of a class of degenerate third-order partial differential operators with variable coefficients presented in a rectangle. Conditions are found to ensure the existence and compactness of the inverse operator. A theorem on estimates of approximation numbers is proven. Here, we note that finding estimates of approximation numbers, as well as extremal subspaces, for a set of solutions to the equation is a task that is certainly important from both a theoretical and a practical point of view. The paper also obtained an upper bound for the eigenvalues. Note that, in this paper, estimates of eigenvalues and approximation numbers for the degenerate third-order partial differential operators are obtained for the first time. [ABSTRACT FROM AUTHOR]

Published

2024

19. Novel Admissibility Criteria and Multiple Simulations for Descriptor Fractional Order Systems with Minimal LMI Variables.

Author

Wang, Xinhai and Zhang, Jin-Xi

Subjects

LINEAR matrix inequalities, STABILITY criterion, LINEAR systems, EIGENVALUES, COMPUTER simulation

Abstract

In this paper, we first present multiple numerical simulations of the anti-symmetric matrix in the stability criteria for fractional order systems (FOSs). Subsequently, this paper is devoted to the study of the admissibility criteria for descriptor fractional order systems (DFOSs) whose order belongs to (0, 2). The admissibility criteria are provided for DFOSs without eigenvalues on the boundary axes. In addition, a unified admissibility criterion for DFOSs involving the minimal linear matrix inequality (LMI) variable is provided. The results of this paper are all based on LMIs. Finally, numerical examples were provided to validate the accuracy and effectiveness of the conclusions. [ABSTRACT FROM AUTHOR]

Published

2024

20. Globally Optimal Relative Pose and Scale Estimation from Only Image Correspondences with Known Vertical Direction.

Author

Yu, Zhenbao, Ye, Shirong, Liu, Changwei, Jin, Ronghe, Xia, Pengfei, and Yan, Kang

Subjects

COST functions, MICRO air vehicles, DEGREES of freedom, DRIVERLESS cars, EIGENVALUES

Abstract

Installing multi-camera systems and inertial measurement units (IMUs) in self-driving cars, micro aerial vehicles, and robots is becoming increasingly common. An IMU provides the vertical direction, allowing coordinate frames to be aligned in a common direction. The degrees of freedom (DOFs) of the rotation matrix are reduced from 3 to 1. In this paper, we propose a globally optimal solver to calculate the relative poses and scale of generalized cameras with a known vertical direction. First, the cost function is established to minimize algebraic error in the least-squares sense. Then, the cost function is transformed into two polynomials with only two unknowns. Finally, the eigenvalue method is used to solve the relative rotation angle. The performance of the proposed method is verified on both simulated and KITTI datasets. Experiments show that our method is more accurate than the existing state-of-the-art solver in estimating the relative pose and scale. Compared to the best method among the comparison methods, the method proposed in this paper reduces the rotation matrix error, translation vector error, and scale error by 53%, 67%, and 90%, respectively. [ABSTRACT FROM AUTHOR]

Published

2024

21. Global dynamics of a Lotka-Volterra competition-diffusion system with advection and nonlinear boundary conditions.

Author

Tian, Chenyuan and Guo, Shangjiang

Subjects

NONLINEAR systems, EIGENVALUES

Abstract

In this paper, we deal with the global dynamics of a Lotka-Volterra competition-diffusion-advection system with nonlinear boundary conditions, including the existence, nonexistence and global stability of coexistence steady states. We start with the investigation of the principal eigenvalue of linearized system to get the local stability of steady states and then discuss the global dynamics in terms of competition coefficients. [ABSTRACT FROM AUTHOR]

Published

2024

22. A modified polynomial-based approach to obtaining the eigenvalues of a uniform Euler–Bernoulli beam carrying any number of attachments.

Author

Aguilar-Porro, Cristina, Ruz, Mario L., and Blanco-Rodríguez, Francisco J.

Subjects

GRAPHICAL user interfaces, EIGENVALUES, FREE vibration, LUMPED elements

Abstract

Free vibration characteristics in uniform beams with several lumped attachments are an important problem in engineering applications that have to deal with mounting different equipment (e.g. motors, oscillators or engines) on a structural beam. In order to solve the lack of a generalized automatic procedure, this investigation presents a simple solving approach based on analytical means applied to a secular frequency equation for obtaining the natural frequencies of an arbitrarily supported single-span, or multi-span Euler–Bernoulli beam carrying any combination of miscellaneous attachments. The approach is obtained by solving a characteristic polynomial equation using a classical method for computing the roots of a polynomial. Interestingly, if the number of elements is greater than one, a pole-zero cancellation is needed, but it does not require manual interventions such as initial values and iteration. The mathematical approach is validated with bibliographic references and evaluated for accuracy and computational effectiveness. A good agreement is observed with relative error values practically negligible mostly ranging between 10−3 and 10−9 in the first five natural frequencies, which confirms the validity of the presented approach in this paper. The MatLab code that has been developed with the solving approach is freely available as a supplementary material to this paper. Additionally, a MatLab graphical user interface has also been developed in this work which allows to obtain the eigenvalues of a simply supported Euler–Bernoulli beam carrying an undetermined number of lumped elements. The graphical user interface is also available for download, along with help facilities to be run in a Windows operating system and detailed instructions to reproduce the case studies presented here. The proposed scheme (and also the MatLab graphical user interface) is very easy to code, and can be slightly modified to accommodate beams with arbitrary supports. [ABSTRACT FROM AUTHOR]

Published

2024

23. OPTIMIZING QUANTUM ALGORITHMS FOR SOLVING THE POISSON EQUATION.

Author

Mukhanbet, Aksultan, Azatbekuly, Nurtugan, and Daribayev, Beimbet

Subjects

ALGORITHMS, EIGENVALUES, QUANTUM computing, POISSON algebras, HAMILTON'S equations

Abstract

Contemporary quantum computers open up novel possibilities for tackling intricate problems, encompassing quantum system modeling and solving partial differential equations (PDEs). This paper explores the optimization of quantum algorithms aimed at resolving PDEs, presenting a significant challenge within the realm of computational science. The work delves into the application of the Variational Quantum Eigensolver (VQE) for addressing equations such as Poisson’s equation. It employs a Hamiltonian constructed using a modified Feynman-Kitaev formalism for a VQE, which represents a quantum system and encapsulates information pertaining to the classical system. By optimizing the parameters of the quantum circuit that implements this Hamiltonian, it becomes feasible to achieve minimization, which corresponds to the solution of the original classical system. The modification optimizes quantum circuits by minimizing the cost function associated with the VQE. The efficacy of this approach is demonstrated through the illustrative example of solving the Poisson equation. The prospects for its application to the integration of more generalized PDEs are discussed in detail. This study provides an in-depth analysis of the potential advantages of quantum algorithms in the domain of numerical solutions for the Poisson equation and emphasizes the significance of continued research in this direction. By leveraging quantum computing capabilities, the development of more efficient methodologies for solving these equations is possible, which could significantly transform current computational practices. The findings of this work underscore not only the practical advantages but also the transformative potential of quantum computing in addressing complex PDEs. Moreover, the results obtained highlight the critical need for ongoing research to refine these techniques and extend their applicability to a broader class of PDEs, ultimately paving the way for advancements in various scientific and engineering domains. [ABSTRACT FROM AUTHOR]

Published

2024

24. Quantum soft waveguides with resonances induced by broken symmetry.

Author

Kondej, Sylwia

Subjects

SYMMETRY breaking, RESONANCE, EIGENVALUES, HAMILTONIAN systems

Abstract

We consider two-dimensional, non-relativistic quantum system with asymptotically straight soft waveguide. We show that the local deformation of the symmetric waveguide can lead to the emerging of the embedded eigenvalues living in the continuous spectrum. The main problem of this paper is devoted to the analysis of weak perturbation of the symmetric system. We show that the original embedded eigenvalues turn to the second sheet of the resolvent analytic continuation and constitute resonances. We describe the asymptotics of the real and imaginary components of the complex resonant pole depending on deformation. Finally, we generalize the problem to three dimensional system equipped with a soft layer. [ABSTRACT FROM AUTHOR]

Published

2024

25. A New Extended Target Detection Method Based on the Maximum Eigenvalue of the Hermitian Matrix.

Author

Xu, Yong, Zhu, Yongfeng, and Song, Zhiyong

Subjects

MATRICES (Mathematics), EIGENVALUES, RADAR cross sections, CLUTTER (Radar), RADAR targets, LIKELIHOOD ratio tests

Abstract

In the field of radar target detection, the conventional approach is to employ the range profile energy accumulation method for detecting extended targets. However, this method becomes ineffective when dealing with non-stationary and non-uniform radar clutter scenarios, as well as long-distance targets with weak radar cross sections (RCSs). In such cases, the signal-to-noise ratio (SNR) of the target echo is severely degraded, rendering the energy accumulation detection algorithm unreliable. To address this issue, this paper presents a new extended target detection method based on the maximum eigenvalue of the Hermitian matrix. This method utilizes a detection model that incorporates observed data and employs the likelihood ratio test (LRT) theory to derive the maximum eigenvalue detector at low SNR. Specifically, the detector constructs a matrix using a sliding window block with the available data and then computes the maximum eigenvalue of the covariance matrix. Subsequently, the maximum eigenvalue matrix is transformed into a one-dimensional eigenvalue image, enabling extended target detection through analogy with the energy accumulation detection method. Furthermore, this paper analyzes the proposed extended target detection method from both theoretical and experimental perspectives, validating it through field-measured data. The results obtained from the measured data demonstrate that the method effectively enhances the SNR in low SNR conditions, thereby improving target detection performance. Additionally, the method exhibits robustness across different scattering center targets. [ABSTRACT FROM AUTHOR]

Published

2024

26. A Blaschke–Lebesgue theorem for the Cheeger constant.

Author

Henrot, Antoine and Lucardesi, Ilaria

Subjects

POLYGONS, TRIANGLES, EIGENVALUES, LOGICAL prediction

Abstract

In this paper, we prove a new extremal property of the Reuleaux triangle: it maximizes the Cheeger constant among all bodies of (same) constant width. The proof relies on a fine analysis of the optimality conditions satisfied by an optimal Reuleaux polygon together with an explicit upper bound for the inradius of the optimal domain. As a possible perspective, we conjecture that this maximal property of the Reuleaux triangle holds for the first eigenvalue of the p -Laplacian for any p ∈ (1 , + ∞) (this paper covers the case p = 1 whereas the case p = + ∞ was already known). [ABSTRACT FROM AUTHOR]

Published

2024

27. Comparing Energy in ζ-Labeling Similarity Measure with Alternative Similarity Metrics on Rough Graphs.

Author

Nithya, R. and Anitha, K.

Subjects

GRAPH algorithms, EIGENVALUES, COMPARATIVE studies

Abstract

This paper explores the effectiveness of different similarity measures for characterizing vertices and edges in rough graphs, which were introduced to handle imprecise and uncertain information. The authors examine traditional similarity measures like the Jaccard index, Dice coefficient, and overlap measure in this context. Additionally, a new ζ-labeling similarity measure for rough graphs is proposed. The main goal is to perform a comparative analysis evaluating the performance of these diverse similarity measures when applied to rough graphs. Furthermore, the paper computes the energy of rough graphs, defined as the sum of absolute eigenvalues, to demonstrate the superior potency of the proposed ζ-labeling measure compared to the other similarity measures considered. Overall, this work aims to advance techniques for assessing similarity in rough graphs, which have applications in dealing with vague and imprecise data. [ABSTRACT FROM AUTHOR]

Published

2024

28. A Novel Weighted Block Sparse DOA Estimation Based on Signal Subspace under Unknown Mutual Coupling.

Author

Liu, Yulong, Yin, Yingzeng, Lu, Hongmin, and Tong, Kuan

Subjects

COVARIANCE matrices, PROBLEM solving, EIGENVALUES

Abstract

In this paper, a novel weighted block sparse method based on the signal subspace is proposed to realize the Direction-of-Arrival (DOA) estimation under unknown mutual coupling in the uniform linear array. Firstly, the signal subspace is obtained by decomposing the eigenvalues of the sampling covariance matrix. Then, a block sparse model is established based on the deformation of the product of the mutual coupling matrix and the steering vector. Secondly, a suitable set of weighted coefficients is calculated to enhance sparsity. Finally, the optimization problem is transformed into a second-order cone (SOC) problem and solved. Compared with other algorithms, the simulation results of this paper have better performance on DOA accuracy estimation. [ABSTRACT FROM AUTHOR]

Published

2024

29. On the eigenvalue-separation properties of real tridiagonal matrices.

Author

YAN WU and KOHAUPT, LUDWIG

Subjects

EIGENVALUES, EIGENANALYSIS, MATRICES (Mathematics), POLYNOMIALS, ALGEBRA

Abstract

In this paper, we give a simple sufficient condition for the eigenvalue-separation properties of real tridiagonal matrices T. This result is much more than the statement that the pertinent eigenvalues are distinct. Its derivation is based on recurrence formulae satisfied by the polynomials made up by the minors of the characteristic polynomial det(xE - T) that are proven to form a Sturm sequence. This is a new result, and it proves the simple spectrum property of a symmetric tridiagonal matrix studied in a Grünbaum paper. Two numerical examples underpin the theoretical findings. The style of the paper is expository in order to address a large readership. [ABSTRACT FROM AUTHOR]

Published

2023

30. On the Spectrum of the Non-Selfadjoint Differential Operator with an Integral Boundary Condition and NegativeWeight Function.

Author

Çoşkun, Nimet and Görgülü, Merve

Subjects

DIFFERENTIAL operators, GENERALIZATION, HYPERBOLIC functions, EIGENVALUES, ANALYTIC functions

Abstract

In this paper, we shall study the spectral properties of the non-selfadjoint operator in the space ... generated by the Sturm-Liouville differential equation ... with the integral type boundary condition ... and the non-standard weight function ρ (x) = -1 where ... . There are an enormous number of papers considering the positive values of ρ (x) for both continuous and discontinuous cases. The structure of the weight function affects the analytical properties and representations of the solutions of the equation. Differently from the classical literature, we used the hyperbolic type representations of the fundamental solutions of the equation to obtain the spectrum of the operator. Moreover, the conditions for the finiteness of the eigenvalues and spectral singularities were presented. Hence, besides generalizing the recent results, Naimark's and Pavlov's conditions were adopted for the negative weight function case. [ABSTRACT FROM AUTHOR]

Published

2023

31. On the Bifurcation of Thresholds of the Essential Spectrum with a Spectral Singularity.

Author

Borisov, D. I. and Zezyulin, D. A.

Subjects

SCHRODINGER operator, BIFURCATION diagrams, MULTIFRACTALS, EIGENVALUES

Abstract

We consider the Schrödinger operator on the plane with bounded potential , where is a real potential, and are compactly supported complex potentials, and is a small parameter, assuming that the lower part of the spectrum of the one-dimensional Schrödinger operator consists of a pair of isolated eigenvalues and the essential spectrum of the operator has a virtual level at its lower edge and a spectral singularity inside. Additionally, we assume that there is a certain superposition of eigenvalues of the operator with the virtual level and spectral singularity of the operator ; this leads to the emergence of a special threshold in the essential spectrum of the perturbed operator, with the perturbation leading to a bifurcation of this threshold into eigenvalues and resonances with multiplicity doubling. The bifurcation scenario described in this paper is qualitatively different from the previously known ones. [ABSTRACT FROM AUTHOR]

Published

2023

32. On the spectra of wreath products of circulant graphs

Author

Li, Xiaohong, Zhang, Yongqin, Wang, Jianfeng, Li, Guang, and Huang, Da

Published

2024

33. On the formula of sensitivity analysis of frequencies for composite structures in the paper.

Author

Liu, Qimao

Subjects

*SENSITIVITY analysis, *COMPOSITE structures, *FREQUENCIES of oscillating systems, *EIGENFREQUENCIES, *EIGENVALUES, *EIGENVECTORS

Abstract

This communication is to correct the sensitivity analysis formula of frequencies for composite structures in the paper [1]. It is further pointed out that even though the sensitivity analysis formula of frequencies has been corrected, the first derivatives of frequencies with respect to design variables cannot be achieved by direct differentiating the equations of eigenvalues and eigenvectors because the first derivatives of vibration modes with respect to design variables are still unknown. The readers are referred to the analytical solution of the sensitivity analysis of frequencies and modes for composite structures in the literature [2], which is derived using linear space theory. [ABSTRACT FROM AUTHOR]

Published

2015

34. The eigenvalue problem for ice-shelf vibrations: comparison of a full 3-D model with the thin plate approximation.

Author

Konovalov, Y. V.

Subjects

EIGENVALUES, WAVE equation, HYDROSTATIC pressure

Abstract

Ice-shelf forced vibration modelling is performed using a full 3-D finite-difference elastic model, which also takes into account sub-ice seawater flow. The ocean flow in the cavity is described by the wave equation; therefore, ice-shelf flexures result from hydrostatic pressure perturbations in sub-ice seawater layer. Numerical experiments have been carried out for idealized rectangular and trapezoidal ice-shelf geometries. The ice-plate vibrations are modelled for harmonic ingoing pressure perturbations and for high-frequency spectra of the ocean swells. The spectra show distinct resonance peaks, which demonstrate the ability to model a resonant-like motion in the suitable conditions of forcing. The spectra and ice-shelf deformations obtained by the developed full 3-D model are compared with the spectra and the deformations modelled by the thin-plate Holdsworth and Glynn model (1978). The main resonance peaks and ice-shelf deformations in the corresponding modes, derived by the full 3-D model, are in agreement with the peaks and deformations obtained by the Holdsworth and Glynn model. The relative deviation between the eigenvalues (periodicities) in the two compared models is about 10 %. In addition, the full model allows observation of 3-D effects, for instance, the vertical distribution of the stress components in the plate. In particular, the full model reveals an increase in shear stress, which is neglected in the thin-plate approximation, from the terminus towards the grounding zone with a maximum at the grounding line in the case of the considered high-frequency forcing. Thus, the high-frequency forcing can reinforce the tidal impact on the ice-shelf grounding zone causing an ice fracture therein. [ABSTRACT FROM AUTHOR]

Published

2015

35. Polygons as maximizers of Dirichlet energy or first eigenvalue of Dirichlet-Laplacian among convex planar domains.

Author

Lamboley, Jimmy, Novruzi, Arian, and Pierre, Michel

Subjects

CONVEX domains, EIGENVALUES, STRUCTURAL optimization, POLYGONS, FUNCTIONALS, CALCULUS

Abstract

We prove that solutions to several shape optimization problems in the plane, with a convexity constraint on the admissible domains, are polygons. The main terms of the shape functionals we consider are either the Dirichlet energy E f ⁢ (Ω) of the Laplacian in the domain Ω or the first eigenvalue λ 1 ⁢ (Ω) of the Dirichlet-Laplacian. Usually, one considers minimization of such functionals (often with measure constraint), as for example for the famous Saint-Venant and Faber-Krahn inequalities. By adding the convexity constraint (and possibly other natural constraints), we instead consider the rather unusual and difficult question of maximizing these functionals. This paper follows a series of papers by the authors, where the leading idea is that a certain concavity property of the shape functional that is minimized leads optimal shapes to locally saturate their convexity constraint, which geometrically means that they are polygonal. In these previous papers, the leading term in the shape functional was usually the opposite of the perimeter, for which the aforementioned concavity property was rather easy to obtain through computations of its second order shape derivative. By carrying classical shape calculus, a similar concavity property can be observed for the opposite of E f ⁢ (Ω) or λ 1 ⁢ (Ω) when shapes are smooth and convex. The main novelty in the present paper is the proof of a weak convexity property of E f ⁢ (Ω) and λ 1 ⁢ (Ω) among planar convex shapes, namely rather nonsmooth shapes. This involves new computations and estimates of the second order shape derivatives of E f ⁢ (Ω) and λ 1 ⁢ (Ω) interesting for themselves. [ABSTRACT FROM AUTHOR]

Published

2024

36. Spectral stability analysis of the Dirichlet-to-Neumann map for fractional diffusion equations with a reaction coefficient.

Author

Mdimagh, Ridha and Jday, Fadhel

Subjects

HEAT equation, REACTION-diffusion equations, EIGENFUNCTIONS, EIGENVALUES

Abstract

This paper focused on the stability analysis of the Dirichlet-to-Neumann (DN) map for the fractional diffusion equation with a reaction coefficient q . The main result provided a Hölder-type stability estimate for the map, which was formulated in terms of the Dirichlet eigenvalues and normal derivatives of eigenfunctions of the operator A q := − Δ + q . This paper focused on the stability analysis of the Dirichlet-to-Neumann (DN) map for the fractional diffusion equation with a reaction coefficient . The main result provided a Hölder-type stability estimate for the map, which was formulated in terms of the Dirichlet eigenvalues and normal derivatives of eigenfunctions of the operator . [ABSTRACT FROM AUTHOR]

Published

2024

37. Reversibility of linear cellular automata with intermediate boundary condition.

Author

Chang, Chih-Hung, Yang, Ya-Chu, and Şah, Ferhat

Subjects

CELLULAR automata, TOEPLITZ matrices, EIGENVALUES, DECOMPOSITION method, MATRICES (Mathematics)

Abstract

This paper focuses on the reversibility of multidimensional linear cellular automata with an intermediate boundary condition. We begin by addressing the matrix representation of these automata, and the question of reversibility boils down to the invertibility of this matrix representation. We introduce a decomposition method that factorizes the matrix representation into a Kronecker sum of significantly smaller matrices. The invertibility of the matrix hinges on determining whether zero can be expressed as the sum of eigenvalues of these smaller matrices, which happen to be tridiagonal Toeplitz matrices. Notably, each of these smaller matrices represents a one-dimensional cellular automaton. Leveraging the rich body of research on the eigenvalue problem of Toeplitz matrices, our result provides an efficient algorithm for addressing the reversibility problem. As an application, we show that there is no reversible nontrivial linear cellular automaton over Z 2 . This paper focuses on the reversibility of multidimensional linear cellular automata with an intermediate boundary condition. We begin by addressing the matrix representation of these automata, and the question of reversibility boils down to the invertibility of this matrix representation. We introduce a decomposition method that factorizes the matrix representation into a Kronecker sum of significantly smaller matrices. The invertibility of the matrix hinges on determining whether zero can be expressed as the sum of eigenvalues of these smaller matrices, which happen to be tridiagonal Toeplitz matrices. Notably, each of these smaller matrices represents a one-dimensional cellular automaton. Leveraging the rich body of research on the eigenvalue problem of Toeplitz matrices, our result provides an efficient algorithm for addressing the reversibility problem. As an application, we show that there is no reversible nontrivial linear cellular automaton over . [ABSTRACT FROM AUTHOR]

Published

2024

38. A TWO-LEVEL BLOCK PRECONDITIONED JACOBI--DAVIDSON METHOD FOR MULTIPLE AND CLUSTERED EIGENVALUES OF ELLIPTIC OPERATORS.

Author

QIGANG LIANG, WEI WANG, and XUEJUN XU

Subjects

ELLIPTIC operators, EIGENVALUES, EIGENFUNCTIONS, SCHWARZ function

Abstract

In this paper, we propose a two-level block preconditioned Jacobi--Davidson (BPJD) method for efficiently solving discrete eigenvalue problems resulting from finite element approximations of 2mth (m= 1, 2) order symmetric elliptic eigenvalue problems. Our method works effectively to compute the first several eigenpairs, including both multiple and clustered eigenvalues with corresponding eigenfunctions, particularly. The method is highly parallelizable by constructing a new and efficient preconditioner using an overlapping domain decomposition (DD). It only requires computing a couple of small scale parallel subproblems and a quite small scale eigenvalue problem per iteration. Our theoretical analysis reveals that the convergence rate of the method is bounded by c(H)(1 C\delta 2m 1 H2m 1)2, where H is the diameter of subdomains and\delta is the overlapping size among subdomains. The constant C is independent of the mesh size h and the internal gaps among the target eigenvalues, demonstrating that our method is optimal and cluster robust. Meanwhile, the H-dependent constant c(H) decreases monotonically to 1, as H\rightarrow 0, which means that more subdomains lead to the better convergence rate. Numerical results supporting our theory are given. [ABSTRACT FROM AUTHOR]

Published

2024

39. BOUNDS FOR THE α-ADJACENCY ENERGY OF A GRAPH.

Author

SHABAN, REZWAN UL, IMRAN, MUHAMMAD, and GANIE, HILAL A.

Subjects

GRAPH theory, EIGENVALUES, CONVEX functions, RAYLEIGH quotient, GRAPH connectivity

Abstract

For the adjacency matrix A(G) and diagonal matrix of the vertex degrees D(G) of a simple graph G, the A(G) matrix is the convex combinations of D(G) and A(G), and is defined as A(G) = D(G)+(1)A(G), for 0 n be the eigenvalues of A(G) (which we call -adjacency eigenvalues of the graph G). The generalized adjacency energy also called -adjacency energy of the graph G is defined as EA (G) = is the average vertex degree, m is the size and n is the order of G. The -adjacency energy of a graph G merges the theory of energy (adjacency energy) and the signless Laplacian energy, as EA0 (G) = E (G) and 2E A 12 (G) = QE(G), where E (G) is the energy and QE(G) is the signless Laplacian energy of G. In this paper, we obtain some new upper and lower bounds for the generalized adjacency energy of a graph, in terms of different graph parameters like the vertex covering number, the Zagreb index, the number of edges, the number of vertices, etc. We characterize the extremal graphs attained these bounds. [ABSTRACT FROM AUTHOR]

Published

2024

40. Golden Laplacian Graphs.

Author

Akhter, Sadia, Frasca, Mattia, and Estrada, Ernesto

Subjects

GOLDEN ratio, LAPLACIAN matrices, TELECOMMUNICATION systems, EIGENVALUES, GRAPH theory

Abstract

Many properties of the structure and dynamics of complex networks derive from the characteristics of the spectrum of the associated Laplacian matrix, specifically from the set of its eigenvalues. In this paper, we show that there exist graphs for which the ratio between the length of the spectrum (that is, the difference between the largest and smallest eigenvalues of the Laplacian matrix) and its spread (the difference between the second smallest eigenvalue and the smallest one) is equal to the golden ratio. We call such graphs Golden Laplacian Graphs (GLG). In this paper, we first find all such graphs with a number of nodes n ≤ 10 . We then prove several graph-theoretic and algebraic properties that characterize these graphs. These graphs prove to be extremely robust, as they have large vertex and edge connectivity along with a large isoperimetric constant. Finally, we study the synchronization properties of GLGs, showing that they are among the top synchronizable graphs of the same size. Therefore, GLGs represent very good candidates for engineering and communication networks. [ABSTRACT FROM AUTHOR]

Published

2024

41. Sturmian comparison theorem for hyperbolic equations on a rectangular prism.

Author

Özbekler, Abdullah, İşler, Kübra Uslu, and Alzabut, Jehad

Subjects

NONLINEAR equations, PRISMS, EQUATIONS, LINEAR equations, EIGENVALUES, HYPERBOLIC differential equations

Abstract

In this paper, new Sturmian comparison results were obtained for linear and nonlinear hyperbolic equations on a rectangular prism. The results obtained for linear equations extended those given by Kreith [Sturmian theorems on hyperbolic equations, Proc. Amer. Math. Soc., 22 (1969), 277-281] in which the Sturmian comparison theorem for linear equations was obtained on a rectangular region in the plane. For the purpose of verification, an application was described using an eigenvalue problem. [ABSTRACT FROM AUTHOR]

Published

2024

42. The a posteriori error estimates of the Ciarlet-Raviart mixed finite element method for the biharmonic eigenvalue problem.

Author

Jinhua Feng, Shixi Wang, Hai Bi, and Yidu Yang

Subjects

FINITE element method, EIGENVALUES, MATHEMATICAL physics, NUMERICAL calculations, BIHARMONIC equations, EIGENFUNCTIONS

Abstract

The biharmonic equation/eigenvalue problem is one of the fundamental model problems in mathematics and physics and has wide applications. In this paper, for the biharmonic eigenvalue problem, based on the work of Gudi [Numer. Methods Partial Differ. Equ., 27 (2011), 315-328], we study the a posteriori error estimates of the approximate eigenpairs obtained by the Ciarlet-Raviart mixed finite element method. We prove the reliability and efficiency of the error estimator of the approximate eigenfunction and analyze the reliability of the error estimator of the approximate eigenvalues. We also implement the adaptive calculation and exhibit the numerical experiments which show that our method is efficient and can get an approximate solution with high accuracy. [ABSTRACT FROM AUTHOR]

Published

2024

43. Laplacian and Wiener index of extension of zero divisor graph.

Author

Bora, Pallabi and Rajkhowa, Kukil Kalpa

Subjects

*DIVISOR theory, *LAPLACIAN matrices, *EIGENVALUES

Abstract

The main purpose of this paper is to study the Laplacian eigenvalues of the extension of the zero divisor graph, Γ e (Z n) , for some particular values of n. We characterize the values of n that give the equality of the spectral radius and the second-smallest eigenvalue of Γ e (Z n). Finding Wiener index of Γ e (Z n) in terms of its Laplacian eigenvalues is another objective of this paper. [ABSTRACT FROM AUTHOR]

Published

2024

44. Longitudinal vibration analysis of FG nanorod restrained with axial springs using doublet mechanics.

Author

Civalek, Ömer, Uzun, Büşra, and Yaylı, Mustafa Özgür

Subjects

NANORODS, FREE vibration, CERAMIC materials, FOURIER series, EIGENVALUES, FUNCTIONALLY gradient materials

Abstract

In the current paper, the free longitudinal vibration response of axially restrained functionally graded nanorods is presented for the first time based on the doublet mechanics theory. Size dependent nanorod is considered to be made of functionally graded material consist of ceramic and metal constituents. It is assumed that the material properties of the functionally graded nanorod are assumed to vary in the radial direction. The aim of this study is that to investigate the influences of various parameters such as functionally graded index, small size parameter, length of the nanorod, mode number and spring stiffness on vibration behaviors of functionally graded nanorod restrained with axial springs at both ends. For this purpose, Fourier sine series are used to define the axial deflection of the functionally graded nanorod. Then, an eigenvalue approach is established for longitudinal vibrational frequencies thanks to Stokes' transformation to deformable axial springs. Thus, the presented eigenvalue solution method is attributed to both rigid and deformable boundary conditions for the axial vibration of the functionally graded nanorod. With the help of the results obtained with the presented eigenvalue problem, it is observed that the parameters examined cause significant changes in the frequencies of the functionally graded nanorod. [ABSTRACT FROM AUTHOR]

Published

2024

45. A phase-field version of the Faber-Krahn theorem.

Author

Hüttl, Paul, Knopf, Patrik, and Laux, Tim

Subjects

STRUCTURAL optimization, EIGENVALUES

Abstract

We investigate a phase-field version of the Faber-Krahn theorem based on a phase-field optimization problem introduced by Garcke et al. in their 2023 paper formulated for the principal eigenvalue of the Dirichlet-Laplacian. The shape that is to be optimized is represented by a phase-field function mapping into the interval [0,1]. We show that any minimizer of our problem is a radially symmetric-decreasing phase-field attaining values close to 0 and 1 except for a thin transition layer whose thickness is of order ε>0. Our proof relies on radially symmetric-decreasing rearrangements and corresponding functional inequalities. Moreover, we provide a Γ-convergence result which allows us to recover a variant of the Faber-Krahn theorem for sets of finite perimeter in the sharp interface limit. [ABSTRACT FROM AUTHOR]

Published

2024

46. Robust and Minimum Norm Optimization Method for Singular Vibration Systems with Time-Delay.

Author

Yu, Peizhao, Xin, Haoming, Zhao, Fuheng, and Lu, Yingbo

Subjects

OPTIMIZATION algorithms, EIGENVALUES, ALGORITHMS

Abstract

There exist infinite eigenvalues in singular vibration systems, which give rise to unstable responses and poor performances. The stability of singular vibration systems can be changed by eigenstructure assignment method. In this paper, partial eigenstructure assignment problems (PESAPs) and robust and minimum norm partial eigenstructure assignment problems for singular vibration systems with time-delay are studied. A necessary and sufficient condition is derived to solve PESAPs for singular vibration systems with time-delay. The parametric solution for PESAPs is given by the Moore-Penrose pseudoinverse method, and the algorithm for solving PESAPs is proposed. An optimization algorithm is developed to solve robust and minimum norm PESAPs. The algorithm can obtain the three types of optimal solutions, which is applicable to singular and nonsingular vibration systems with time-delay. The effectiveness of the proposed algorithms is verified by the results of two numerical examples. [ABSTRACT FROM AUTHOR]

Published

2024

47. Analysis of the monotonicity method for an anisotropic scatterer with a conductive boundary.

Author

Harris, Isaac, Hughes, Victor, and Lee, Heejin

Subjects

INVERSE scattering transform, INVERSE problems, ANISOTROPY, OPERATOR functions, WAVE functions, INVERSION (Geophysics), EIGENVALUES, GEOGRAPHIC boundaries

Abstract

In this paper, we consider the inverse scattering problem associated with an anisotropic medium with a conductive boundary. We will assume that the corresponding far–field pattern is known/measured and we consider two inverse problems. First, we show that the far–field data uniquely determines the boundary coefficient. Next, since it is known that anisotropic coefficients are not uniquely determined by this data we will develop a qualitative method to recover the scatterer. To this end, we study the so–called monotonicity method applied to this inverse shape problem. This method has recently been applied to some inverse scattering problems but this is the first time it has been applied to an anisotropic scatterer. This method allows one to recover the scatterer by considering the eigenvalues of an operator associated with the far–field operator. We present some simple numerical reconstructions to illustrate our theory in two dimensions. For our reconstructions, we need to compute the adjoint of the Herglotz wave function as an operator mapping into H 1 of a small ball. [ABSTRACT FROM AUTHOR]

Published

2024

48. Point-wise behavior of the explosive positive solutions to a degenerate elliptic BVP with an indefinite weight function.

Author

López-Gómez, J., Ramos, V.K., Santos, C.A., and Suárez, A.

Subjects

*BOUNDARY value problems, *EIGENFUNCTIONS, *DEGENERATE differential equations, *EIGENVALUES

Abstract

In this paper we ascertain the singular point-wise behavior of the positive solutions of a semilinear elliptic boundary value problem (1) at the critical value of the parameter, λ , where it begins its metasolution regime. As the weight function m (x) changes sign in Ω, our result is a substantial extension of a previous, very recent, result of Li et al. [8] , where it was imposed the (very strong) condition that m ≥ 0 on a neighborhood of b − 1 ({ 0 }). In this paper, we are simply assuming that m (x 0) > 0 for some x 0 ∈ b − 1 ({ 0 }). • Theorem 1.1 proves that the behavior of the solutions proved by Li et al. [8] also occurs with much weaker hypotheses. • Theorem 3.1 is a substantial extension of Theorem 2.1 of López-Gómez and Sabina de Lis [12]. • Lemma 2.1 provides a useful estimate of eigenfunctions associated to an eigenvalue problem with sign changing weight. [ABSTRACT FROM AUTHOR]

Published

2024

49. Eigenvalues of Relatively Prime Graphs Connected with Finite Quasigroups.

Author

Nadeem, Muhammad, Ali, Nwazish, Muhammad Bilal, Hafiz, Alam, Md. Ashraful, Elashiry, M. I., Alnefaie, Kholood, and Farshadifar, Faranak

Subjects

MATHEMATICS education, QUASIGROUPS, EIGENVALUES, SUBGRAPHS, ASSOCIATIVE algebras

Abstract

A relatively new and rapidly expanding area of mathematics research is the study of graphs' spectral properties. Spectral graph theory plays a very important role in understanding certifiable applications such as cryptography, combinatorial design, and coding theory. Nonassociative algebras, loop groups, and quasigroups are the generalizations of associative algebra. Many studies have focused on the spectral properties of simple graphs connected to associative algebras like finite groups and rings, but the same research direction remains unexplored for loop groups and quasigroups. Eigenvalue analysis, subgraph counting, matrix representation, and the combinatorial approach are key techniques and methods in our work. The main purpose of this paper is to characterize finite quasigroups with the help of relatively prime graphs. Moreover, we investigate the structural and spectral properties of these graphs associated with finite quasigroups in the forms of star graphs, eigenvalues, connectivity, girth, clique, and chromatic number. [ABSTRACT FROM AUTHOR]

Published

2024

50. Lowest-degree robust finite element schemes for inhomogeneous bi-Laplace problems.

Author

Dai, Bin, Zeng, Huilan, Zhang, Chen-Song, and Zhang, Shuo

Subjects

*SINGULAR perturbations, *CONVEX domains, *DIFFERENTIAL operators, *EIGENVALUES, *INTERPOLATION, *LAPLACE transformation

Abstract

In this paper, we study the numerical method for the bi-Laplace problems with inhomogeneous coefficients; particularly, we propose finite element schemes on rectangular grids respectively for an inhomogeneous fourth-order elliptic singular perturbation problem and for the Helmholtz transmission eigenvalue problem. The new methods use the reduced rectangle Morley (RRM for short) element space with piecewise quadratic polynomials, which are of the lowest degree possible. For the finite element space, a discrete analogue of an equality by Grisvard is proved for the stability issue and a locally-averaged interpolation operator is constructed for the approximation issue. Optimal convergence rates of the schemes are proved, and numerical experiments are given to verify the theoretical analysis. • A discrete analogue of an equality (1.3) by Grisvard [1] on H 2 functions is proved for the reduced rectangular Morley (RRM for short in the sequel) element functions. This discrete equality makes the RRM space usable for bi-Laplacian problems with inhomogeneous coefficients. • Based on piecewise quadratic polynomials, the RRM scheme is the lowest-degree finite element scheme for the inhomogeneous bi-Laplace problems. Compared to other kinds of methods, it does not need tuning parameter or using indirect differential operators. • As revealed by [3] , the RRM element space does not admit a locally-defined projective interpolator. In this paper, however, a locally-defined stable interpolator (not projective) is carefully constructed for the RRM element space, and an optimal approximation is proved rigorously on both convex and nonconvex domains. [ABSTRACT FROM AUTHOR]

Published

2024