Your search keyword '"Biharmonic equation"' showing total 334 results

1. Linearized inverse problem for biharmonic operators at high frequencies.

Author

Zhao, Xiaomeng and Yuan, Ganghua

Subjects

*BIHARMONIC equations, *INVERSE problems, *BOUNDARY value problems, *NONLINEAR equations

Abstract

In this paper, we study the phenomenon of increasing stability in the inverse boundary value problems for the biharmonic equation. The inverse problem is to determine the potential from DtN map. It is a kind of nonlinear inverse problem. By considering a linearized form, we obtain an increasing Lipschitz‐like stability when k$$ k $$ is large. Furthermore, we extend the discussion to the linearized inverse biharmonic potential problem with attenuation, where an exponential dependence of the attenuation constant is traced in the stability estimate. [ABSTRACT FROM AUTHOR]

Published

2024

2. High‐frequency stability estimates for the linearized inverse boundary value problem for the biharmonic operator with attenuation on some bounded domains.

Author

Choudhury, Anupam Pal and Kumar T., Ajith

Subjects

*BOUNDARY value problems, *BIHARMONIC equations, *INVERSE problems

Abstract

In this article, high‐frequency stability estimates are explored for the determination of the zeroth‐order perturbation of the biharmonic operator with constant attenuation from the linearized partial Dirichlet‐to‐Neumann map when part of the boundary is inaccessible and flat. The results obtained suggest improvement of the stability with an appropriate choice of frequency. [ABSTRACT FROM AUTHOR]

Published

2024

3. Positive Radial Symmetric Solutions of Nonlinear Biharmonic Equations in an Annulus.

Author

Li, Yongxiang and Yang, Shengbin

Subjects

*FIXED point theory, *NONLINEAR equations, *CONTINUOUS functions, *CONES, *BIHARMONIC equations

Abstract

This paper discusses the existence of positive radial symmetric solutions of the nonlinear biharmonic equation ▵ 2 u = f (u , ▵ u) on an annular domain Ω in R N with the Navier boundary conditions u | ∂ Ω = 0 and ▵ u | ∂ Ω = 0 , where f : R + × R − → R + is a continuous function. We present some some inequality conditions of f to obtain the existence results of positive radial symmetric solutions. These inequality conditions allow f (ξ , η) to have superlinear or sublinear growth on ξ , η as | (ξ , η) | → 0 and ∞. Our discussion is mainly based on the fixed-point index theory in cones. [ABSTRACT FROM AUTHOR]

Published

2024

4. Iterative solution to the biharmonic equation in mixed form discretized by the Hybrid High-Order method.

Author

Antonietti, P.F., Matalon, P., and Verani, M.

Subjects

*PARTIAL differential equations, *BIHARMONIC equations, *ALGORITHMS

Abstract

We consider the solution to the biharmonic equation in mixed form discretized by the Hybrid High-Order (HHO) methods. The two resulting second-order elliptic problems can be decoupled via the introduction of a new unknown, corresponding to the boundary value of the solution of the first Laplacian problem. This technique yields a global linear problem that can be solved iteratively via a Krylov-type method. More precisely, at each iteration of the scheme, two second-order elliptic problems have to be solved, and a normal derivative on the boundary has to be computed. In this work, we specialize this scheme for the HHO discretization. To this aim, an explicit technique to compute the discrete normal derivative of an HHO solution of a Laplacian problem is proposed. Moreover, we show that the resulting discrete scheme is well-posed. Finally, a new preconditioner is designed to speed up the convergence of the Krylov method. Numerical experiments assessing the performance of the proposed iterative algorithm on both two- and three-dimensional test cases are presented. [ABSTRACT FROM AUTHOR]

Published

2024

5. On approximation of functions from Hölder classes by biharmonic Poisson integrals defined in the upper half-plane.

Author

Shutovskyi, Arsen M.

Subjects

*BIHARMONIC equations, *UPPER class, *INTEGRALS

Abstract

The paper investigates the approximate properties of biharmonic Poisson integrals for the upper half-plane on the classes of Hölder functions in the uniform metric. The exact values for the upper bounds of the deviations of the functions of the Hölder class H1 from the biharmonic Poisson integrals defined in the upper half-plane were found. [ABSTRACT FROM AUTHOR]

Published

2024

6. Normalized solutions for a biharmonic Choquard equation with exponential critical growth in R4.

Author

Chen, Wenjing and Wang, Zexi

Subjects

*BIHARMONIC equations, *EXPONENTIAL functions, *CONTINUOUS functions

Abstract

In this paper, we study the following biharmonic Choquard-type problem Δ 2 u - β Δ u = λ u + (I μ ∗ F (u)) f (u) , in R 4 , ∫ R 4 | u | 2 d x = c 2 > 0 , u ∈ H 2 (R 4) , where β ≥ 0 , λ ∈ R , I μ = 1 | x | μ with μ ∈ (0 , 4) , F(u) is the primitive function of f(u), and f is a continuous function with exponential critical growth. By using the mountain-pass argument, we prove the existence of radial ground-state solutions for the above problem. [ABSTRACT FROM AUTHOR]

Published

2024

7. NONLINEAR FOURTH ORDER PROBLEMS WITH ASYMPTOTICALLY LINEAR NONLINEARITIES.

Author

Ben Ali, Abir Amor and Dammak, Makkia

Subjects

NONLINEAR equations, MOUNTAIN pass theorem, BIHARMONIC equations

Abstract

We investigate some nonlinear elliptic problems of the form (P) ∆2 v + σ(x)v = h(x, v) in Ω, v = ∆v = 0 on ∂Ω, where Ω is a regular bounded domain in RN, N > 2, σ(x) a positive function in L∞(Ω), and the nonlinearity h(x, t) is indefinite. We prove the existence of solutions to the problem (P) when the function h(x, t) is asymptotically linear at infinity by using variational method but without the Ambrosetti-Rabinowitz condition. Also, we consider the case when the nonlinearities are superlinear and subcritical. [ABSTRACT FROM AUTHOR]

Published

2024

8. Introducing higher-order Haar wavelet method for solving three-dimensional partial differential equations.

Author

Sinha, Arvind Kumar and Sahoo, Radhakrushna

Subjects

*PARTIAL differential equations, *HELMHOLTZ equation, *TENSOR products, *KRONECKER products, *COLLOCATION methods, *POISSON'S equation, *BIHARMONIC equations

Abstract

In this paper, we develop a collocation method for solving three-dimensional partial differential equations using Haar wavelet and Kronecker tensor product. The approach is based on a series of Haar wavelet basis functions to approximate sixth-order mixed derivatives. The proposed method is mathematically fast, less error and straightforward for the numerical solution of many types of three-dimensional Poisson, biharmonic and Helmholtz equations. Some numerical examples verify the accuracy and efficiency of the proposed method. Finally, we conclude that numerical results computed by our proposed method are more accurate than numerical results obtained in the existing methods in the literature. We find that the CPU time consumed by the suggested approach is lesser than the CPU time of existing methods. Thus, the process is fast, efficient and has a low numerical error. [ABSTRACT FROM AUTHOR]

Published

2024

9. Existence and Multiplicity of Solutions for a Biharmonic Kirchhoff Equation in R5.

Author

Ziqing Yuan and Sheng Liu

Subjects

BIHARMONIC equations, MATHEMATICS, PARTIAL differential equations, MULTIPLICITY (Mathematics), PERTURBATION theory

Abstract

We consider the biharmonic equation Δ²u-(a + b R R5 |Δu|²dx) Δu + V (x)u = f(u), where V (x) and f(u) are continuous functions. By using a perturbation approach and the symmetric mountain pass theorem, the existence and multiplicity of solutions for this equation are obtained, and the power-type case f(u) = |u|p-2u is extended to p (2, 10), where it was assumed p (4, 10) in many papers. [ABSTRACT FROM AUTHOR]

Published

2024

10. Shape reconstruction for an inverse biharmonic problem from partial Cauchy data.

Author

Bouslah, Zineb, Hadj, Abdelhak, and Saker, Hacene

Subjects

*INVERSE problems, *BIHARMONIC equations, *NONLINEAR integral equations, *GEOMETRIC shapes, *BOUNDARY value problems

Abstract

In this paper, we address the Robin inverse problem for the biharmonic equation in a 2D$$ 2D $$ simply connected domain, to reconstruct the geometric shape of a non‐accessible part of the boundary from a single measurement of Riquier–Neumann data on the accessible part of that boundary. Our approach extends the nonlinear boundary integral equation, to recover the shape of the boundary. We propose the Newton iterative technique based on the Fréchet derivatives to linearize the system and then establish an injectivity of the linearized system for certain Robin coefficients, as well as the iteration scheme to describe the inverse algorithm for recovering the shape with respect to the unknowns. The mathematical spirit of the proposed method will be presented, and to illustrate its feasibility, some numerical examples will be provided. [ABSTRACT FROM AUTHOR]

Published

2024

11. Existence of solutions for a biharmonic equation with gradient term.

Author

Hamydy, Ahmed, Massar, Mohamed, and Essaouini, Hilal

Subjects

BIHARMONIC equations, FIXED point theory, TRANSPORT equation

Abstract

In this paper, we mainly study the existence of radial solutions for a class of biharmonic equation with a convection term, involving two real parameters A and p. We mainly use a combination of the fixed point index theory and the Banach contraction theorem to prove that there are A0 > 0 and p0 > 0 such the equation admits at least one radial solution for all (A, p) e [-Ao, x [0, p0]. [ABSTRACT FROM AUTHOR]

Published

2023

12. Gradient auxiliary physics-informed neural network for nonlinear biharmonic equation.

Author

Liu, Yu and Ma, Wentao

Subjects

*NONLINEAR equations, *PARTIAL differential equations, *BIHARMONIC equations, *INVERSE problems, *DIFFERENTIAL equations, *MACHINE learning

Abstract

Physics-informed neural network (PINN) has gained wide attention for solving forward and inverse problems of partial differential equation (PDE) from both data-driven and model-driven perspectives. In a short time, various machine learning methods based on PINN have been developed for solving a broad range of PDE. To improve the training accuracy of PINN, the popular approach is to introduce penalty parameters to correct the imbalance among different parts of loss function during model training. However, this approach generally fails to eliminate the model error generated by the boundary condition. To eliminate this issue, we propose a gradient auxiliary physics-informed neural network (GA-PINN) for nonlinear biharmonic equation. The key idea of GA-PINN is to split original biharmonic equation subjected to clamped or simply supported boundary conditions into third order or second order differential equations by introducing gradient auxiliary functions. As a consequence, we can rewrite clamped or simply supported boundary conditions as Dirichlet boundary conditions, then conveniently construct the neural network composite functions to satisfy those Dirichlet boundary conditions. We introduce the dynamic weight method to automatically balance the contributions of different loss terms during training. The capabilities of the proposed GA-PINN by solving several nonlinear biharmonic problems are demonstrated. [ABSTRACT FROM AUTHOR]

Published

2023

13. The local boundary knots method for solution of Stokes and the biharmonic equation.

Author

Kovářík, Karel, Mužík, Juraj, Gago, Filip, and Sitányiová, Dana

Subjects

*STOKES equations, *STOKES flow, *BIHARMONIC equations, *COLLOCATION methods, *SPARSE matrices

Abstract

The paper focuses on the derivation of a local variant of the boundary knot method (BKM) for the cases of Stokes flow and the biharmonic equation. Compared to the global variant, the local one leads to a sparse result matrix of the system of equations and thus makes the solution of especially large-scale problems more efficient. It is also important to keep the conditionality of the interpolation matrix within reasonable bounds. For the localization, a combination of BKM and finite collocation method was used. The results of the local variant were compared on several examples and the dependence of the solution on the density of the point network and the dimensions of the stencil used was also tested in the paper. [ABSTRACT FROM AUTHOR]

Published

2023

14. NONCONFORMING VIRTUAL ELEMENTS FOR THE BIHARMONIC EQUATION WITH MORLEY DEGREES OF FREEDOM ON POLYGONAL MESHES.

Author

CARSTENSEN, CARSTEN, KHOT, REKHA, and PANI, AMIYA K.

Subjects

*A posteriori error analysis, *BIHARMONIC equations, *DEGREES of freedom

Abstract

The lowest-order nonconforming virtual element extends the Morley triangular element to polygons for the approximation of the weak solution u ∊ V := H2 0 (\Omega) to the biharmonic equation. The abstract framework allows (even a mixture of) two examples of the local discrete spaces Vh(P) and a smoother allows rough source terms F ∊ V* =H-20(Ω). The a priori and a posteriori error analysis in this paper circumvents any trace of second derivatives by some computable conforming companion operator J: Vh → V from the nonconforming virtual element space Vh. The operator J is a right-inverse of the interpolation operator and leads to optimal error estimates in piecewise Sobolev norms without any additional regularity assumptions on u ∊ V. As a smoother the companion operator modifies the discrete right-hand side and then allows a quasi-best approximation. An explicit residual-based a posteriori error estimator is reliable and efficient up to data oscillations. Numerical examples display the predicted empirical convergence rates for uniform and optimal convergence rates for adaptive mesh-refinement. [ABSTRACT FROM AUTHOR]

Published

2023

15. Existence and nonexistence of solutions to a critical biharmonic equation with logarithmic perturbation.

Author

Li, Qi, Han, Yuzhu, and Wang, Tianlong

Subjects

*BIHARMONIC equations, *PERTURBATION theory

Abstract

In this paper, the following critical biharmonic elliptic problem { Δ 2 u = λ u + μ u ln ⁡ u 2 + | u | 2 ⁎ ⁎ − 2 u , x ∈ Ω , u = ∂ u ∂ ν = 0 , x ∈ ∂ Ω is considered, where Ω ⊂ R N is a bounded smooth domain with N ≥ 5. Some interesting phenomena occur due to the uncertainty on the sign of the logarithmic term. It is shown, mainly by using Mountain Pass Lemma, that the problem admits at least one nontrivial weak solution under some appropriate assumptions of λ and μ. Moreover, a nonexistence result is also obtained. Comparing the results in this paper with the known ones, one sees that some new phenomena occur when the logarithmic perturbation is introduced. [ABSTRACT FROM AUTHOR]

Published

2023

16. The interior penalty virtual element method for the biharmonic problem.

Author

Zhao, Jikun, Mao, Shipeng, Zhang, Bei, and Wang, Fei

Subjects

*NUMBER systems, *PROBLEM solving, *DEGREES of freedom, *LINEAR systems, *BIHARMONIC equations, *POLYGONS

Abstract

In this paper, an interior penalty virtual element method (IPVEM) is developed for solving the biharmonic problem on polygonal meshes. By modifying the existing H^2-conforming virtual element, an H^1-nonconforming virtual element is obtained with the same degrees of freedom as the usual H^1-conforming virtual element, such that it locally has H^2-regularity on each polygon in meshes. To enforce the C^1 continuity of the solution, an interior penalty formulation is adopted. Hence, this new numerical scheme can be regarded as a combination of the virtual element space and discontinuous Galerkin scheme. Compared with the existing methods, this approach has some advantages in reducing the degree of freedom and capability of handling hanging nodes. The well-posedness and optimal convergence of the IPVEM are proven in a mesh-dependent norm. We also derive a sharp estimate of the condition number of the linear system associated with IPVEM. Some numerical results are presented to verify the optimal convergence of the IPVEM and the sharp estimate of the condition number of the discrete problem. Besides, in the numerical test, the IPVEM has a good performance in computational accuracy by contrast with the other VEMs solving the biharmonic problem. [ABSTRACT FROM AUTHOR]

Published

2023

17. An Invariance and Closed Form Analysis of the Nonlinear Biharmonic Beam Equation.

Author

Masood, Y., Kara, A. H., and Zaman, F. D.

Subjects

*TRANSFORMATION groups, *NOETHER'S theorem, *PARTIAL differential equations, *NONLINEAR analysis, *CONSERVATION laws (Physics), *BIHARMONIC equations, *CONSERVATION laws (Mathematics)

Abstract

In this paper, we study the one-parameter Lie groups of point transformations that leave invariant the biharmonic partial differential equation (PDE) uxxxx + 2uxxyy + uyyyy = f(u). To this end, we construct the Lie and Noether symmetry generators and present reductions of biharmonic PDE. When f is arbitrary function of u, we obtain the solution of biharmonic equation in terms of Green function. The equation is further analysed when f is exponential function and for general power law. Furthermore, we use Noether's theorem and the 'multiplier approach' to construct conservation laws of the PDE. [ABSTRACT FROM AUTHOR]

Published

2023

18. A C0 finite element method for the biharmonic problem with Navier boundary conditions in a polygonal domain.

Author

Li, Hengguang, Yin, Peimeng, and Zhang, Zhimin

Subjects

FINITE element method, CONVEX domains, BIHARMONIC equations, FUNCTION spaces

Abstract

In this paper we study the biharmonic equation with Navier boundary conditions in a polygonal domain. In particular, we propose a method that effectively decouples the fourth-order problem as a system of Poisson equations. Our method differs from the naive mixed method that leads to two Poisson problems but only applies to convex domains; our decomposition involves a third Poisson equation to confine the solution in the correct function space, and therefore can be used in both convex and nonconvex domains. A |$C^0$| finite element algorithm is in turn proposed to solve the resulting system. In addition, we derive optimal error estimates for the numerical solution on both quasi-uniform meshes and graded meshes. Numerical test results are presented to justify the theoretical findings. [ABSTRACT FROM AUTHOR]

Published

2023

19. A new mixed method for the biharmonic eigenvalue problem.

Author

Kosin, V., Beuchler, S., and Wick, T.

Subjects

*EIGENVALUES, *BIHARMONIC equations, *CONVEX domains

Abstract

In this paper, we investigate a new mixed method proposed by Rafetseder and Zulehner for Kirchhoff plates and apply it to fourth order eigenvalue problems. Using two auxiliary variables this new mixed method makes it possible to require only H 1 regularity for the displacement and the auxiliary variables, without the demand of a convex domain. We provide a direct comparison, specifically in view of convergence orders, to the C 0 -IPG method and Ciarlet-Raviart's mixed method of vibration problems with the boundary conditions of the clamped plate and the simply supported plate. The numerical experiments are done with the open-source finite element library deal.II and include the implementation of the coupling of finite elements with elements on the boundary to incorporate non-trivial boundary conditions. [ABSTRACT FROM AUTHOR]

Published

2023

20. An enriched Ciarlet-Raviart scheme for the biharmonic equation.

Author

Qiu, Weifeng

Subjects

BIHARMONIC equations, ERROR analysis in mathematics, LIPSCHITZ spaces, ELASTIC plates & shells, NUMERICAL analysis

Abstract

In this paper, we present an enriched Ciarlet-Raviart scheme for the biharmonic equation with variable coefficient on Lipschitz (maybe nonconvex)polyhedral domains. With the enriched finite element space for the Laplacian of the true solution, we manage to prove the discrete $ H^{2} $-stability of numerical solution. Error analysis is provided for solutions with low regularity. [ABSTRACT FROM AUTHOR]

Published

2023

21. Multiple solutions for a singular nonhomogenous biharmonic equation in Heisenberg group.

Author

Deng, Shengbing and Yu, Fang

Subjects

BIHARMONIC equations, MOUNTAIN pass theorem, VARIATIONAL principles, DIRICHLET problem, CONTINUOUS functions

Abstract

In this paper, we study a singular nonhomogenous biharmonic problem with Dirichlet boundary condition in Heisenberg group$ \begin{equation*} \left \{\begin{array}{ll} \Delta^2_{{\mathbb{H}^1}}u = \frac{f(\xi, u)}{\rho(\xi)^\beta}+\epsilon h(\xi)\ &\mbox{in} \ \Omega, \\ u = \frac{\partial u}{\partial \nu} = 0, \ \ &\mbox{on}\ \partial\Omega, \end{array} \right. \end{equation*} $where $ \Omega\subset {\mathbb{H}^1} $ is a bounded smooth domain, $ \Delta^2_{{\mathbb{H}^1}}u = \Delta_{\mathbb{H}^1}(\Delta_{\mathbb{H}^1}u) $ denotes the biharmonic operator in Heisenberg group $ \mathbb{H}^1 = \mathbb{C} \times \mathbb{R} $, $ 0\leq \beta < 4 $ with $ 4 $ is the homogeneous dimension of $ {\mathbb{H}^1} $ and $ f:\Omega \times \mathbb{R}\rightarrow \mathbb{R} $ is a continuous function which satisfies subcritical and critical exponential growth condition, $ h(\xi)\in (D_0^{2, 2}(\Omega))^* $, $ h(\xi)\geq0 $ and $ h(\xi) \not\equiv0 $, $ \rho(\xi) = (|z|^4+t^2)^{\frac{1}{4}} $, $ \xi = (z, t)\in \mathbb{H}^1 $ with $ z = (x, y)\in\mathbb{R}^{2} $, $ \epsilon $ is a small positive parameter. We obtain the existence and multiplicity of solutions by the Ekeland variational principle, mountain pass theorem and singular Adams inequality in Heisenberg group. [ABSTRACT FROM AUTHOR]

Published

2023

22. A serendipity fully discrete div-div complex on polygonal meshes.

Author

Botti, Michele, Di Pietro, Daniele A., and Salah, Marwa

Subjects

*SERENDIPITY, *DEGREES of freedom, *BIHARMONIC equations, *ELASTICITY

Abstract

In this work we address the reduction of face degrees of freedom (DOFs) for discrete elasticity complexes. Specifically, using serendipity techniques, we develop a reduced version of a recently introduced two-dimensional complex arising from traces of the three-dimensional elasticity complex. The keystone of the reduction process is a new estimate of symmetric tensor-valued polynomial fields in terms of boundary values, completed with suitable projections of internal values for higher degrees. We prove an extensive set of new results for the original complex and show that the reduced complex has the same homological and analytical properties as the original one. This paper also contains an appendix with proofs of general Poincaré--Korn-type inequalities for hybrid fields. [ABSTRACT FROM AUTHOR]

Published

2023

23. A fully discrete plates complex on polygonal meshes with application to the Kirchhoff--Love problem.

Author

Pietro, Daniele A. Di and Droniou, Jérôme

Subjects

*BIHARMONIC equations

Abstract

In this work we develop a novel fully discrete version of the plates complex, an exact Hilbert complex relevant for the mixed formulation of fourth-order problems. The derivation of the discrete complex follows the discrete de Rham paradigm, leading to an arbitrary-order construction that applies to meshes composed of general polygonal elements. The discrete plates complex is then used to derive a novel numerical scheme for Kirchhoff–Love plates, for which a full stability and convergence analysis are performed. Extensive numerical tests complete the exposition. [ABSTRACT FROM AUTHOR]

Published

2023

24. A local pointwise inequality for a biharmonic equation with negative exponents.

Author

Chen, Fan, Chen, Jianqing, and Ruan, Qihua

Subjects

*BIHARMONIC equations, *EXPONENTS, *OPEN-ended questions

Abstract

In this paper, we are inspired by Ngô, Nguyen and Phan's (2018 Nonlinearity 31 5484–99) study of the pointwise inequality for positive C 4-solutions of biharmonic equations with negative exponent by using the growth condition of solutions. They propose an open question of whether the growth condition is necessary to obtain the pointwise inequality. We give a positive answer to this open question. We establish the following local pointwise inequality − Δ u u + α | ∇ u | 2 u 2 + β u − q + 1 2 ⩽ C R 2 for positive C 4-solutions of the biharmonic equations with negative exponent − Δ 2 u = u − q i n B R where B R denotes the ball centered at x 0 with radius R, n ⩾ 3, q > 1, and some constants α ⩾ 0, β ⩾ 0, C > 0. [ABSTRACT FROM AUTHOR]

Published

2023

25. Representations of solutions of Lamé system with real coefficients via monogenic functions in the biharmonic algebra.

Author

Gryshchuk, Serhii

Subjects

*MONOGENIC functions, *BIHARMONIC functions, *FUNCTION algebras, *BIHARMONIC equations, *CLIFFORD algebras, *PARTIAL differential equations, *ASSOCIATIVE algebras

Abstract

New representations of solutions of Lamé system with real coefficients via monogenic functions in the biharmonic algebra are found [ABSTRACT FROM AUTHOR]

Published

2023

26. NONLOCAL BIHARMONIC EVOLUTION EQUATIONS WITH DIRICHLET AND NAVIER BOUNDARY CONDITIONS.

Author

KEHAN SHI and YING WEN

Subjects

EVOLUTION equations, BIHARMONIC equations, DIRICHLET problem, IMAGE reconstruction

Abstract

This paper studies a nonlocal biharmonic evolution equation with Dirichlet boundary condition that arises in image restoration. We prove the existence and uniqueness of solutions to the nonlocal problem by the variational method and show that the solutions of the nonlocal problem converge to the solution of the classical biharmonic equation with Dirichlet boundary condition if the nonlocal kernel is rescaled appropriately. The asymptotic behavior is discussed. Besides, we study the Navier problem by transforming it into a Dirichlet problem with a fixed point. The existence, uniqueness, convergence under the rescaling of the kernel, and asymptotic behavior of solutions to the Navier problem are discussed. [ABSTRACT FROM AUTHOR]

Published

2023

27. A new mixed finite-element method for H2 elliptic problems.

Author

Farrell, Patrick E., Hamdan, Abdalaziz, and MacLachlan, Scott P.

Subjects

*FINITE element method, *DIFFERENTIAL equations, *MULTIGRID methods (Numerical analysis), *LINEAR systems, *BIHARMONIC equations, *LAGRANGE multiplier

Abstract

Fourth-order differential equations play an important role in many applications in science and engineering. In this paper, we present a three-field mixed finite-element formulation for fourth-order problems, with a focus on the effective treatment of the different boundary conditions that arise naturally in a variational formulation. Our formulation is based on introducing the gradient of the solution as an explicit variable, constrained using a Lagrange multiplier. The essential boundary conditions are enforced weakly, using Nitsche's method where required. As a result, the problem is rewritten as a saddle-point system, requiring analysis of the resulting finite-element discretization and the construction of optimal linear solvers. Here, we discuss the analysis of the well-posedness and accuracy of the finite-element formulation. Moreover, we develop monolithic multigrid solvers for the resulting linear systems. Two and three-dimensional numerical results are presented to demonstrate the accuracy of the discretization and efficiency of the multigrid solvers proposed. [ABSTRACT FROM AUTHOR]

Published

2022

28. Solving a Class of High-Order Elliptic PDEs Using Deep Neural Networks Based on Its Coupled Scheme.

Author

Li, Xi'an, Wu, Jinran, Zhang, Lei, and Tai, Xin

Subjects

*ARTIFICIAL neural networks, *DEEP learning, *BIHARMONIC equations, *PARTIAL differential equations, *RITZ method, *APPROXIMATION error

Abstract

Deep learning—in particular, deep neural networks (DNNs)—as a mesh-free and self-adapting method has demonstrated its great potential in the field of scientific computation. In this work, inspired by the Deep Ritz method proposed by Weinan E et al. to solve a class of variational problems that generally stem from partial differential equations, we present a coupled deep neural network (CDNN) to solve the fourth-order biharmonic equation by splitting it into two well-posed Poisson's problems, and then design a hybrid loss function for this method that can make efficiently the optimization of DNN easier and reduce the computer resources. In addition, a new activation function based on Fourier theory is introduced for our CDNN method. This activation function can reduce significantly the approximation error of the DNN. Finally, some numerical experiments are carried out to demonstrate the feasibility and efficiency of the CDNN method for the biharmonic equation in various cases. [ABSTRACT FROM AUTHOR]

Published

2022

29. An optimal two-step quadratic spline collocation method for the Dirichlet biharmonic problem.

Author

Bialecki, Bernard, Fairweather, Graeme, and Karageorghis, Andreas

Subjects

*COLLOCATION methods, *DIRICHLET problem, *CONJUGATE gradient methods, *FAST Fourier transforms, *PARTIAL differential equations, *BIHARMONIC equations, *SPLINES

Abstract

A two-step quadratic spline collocation method is formulated for the solution of the Dirichlet biharmonic problem on the unit square rewritten as a coupled system of two second-order partial differential equations. This method involves fast Fourier transforms and, in comparison to its one-step counterpart, it has the advantage of requiring the solution a symmetric positive definite Schur complement system rather than a nonsymmetric one. As a consequence, the corresponding step of the new method is performed using a preconditioned conjugate gradient method. The total cost of the method on a N × N partition of the unit square is O (N 2 log N) . To demonstrate the optimal accuracy of the method, the results of numerical experiments are provided. [ABSTRACT FROM AUTHOR]

Published

2022

30. Solving Biharmonic Equations with Tri-Cubic C 1 Splines on Unstructured Hex Meshes.

Author

Youngquist, Jeremy and Peters, Jörg

Subjects

*SPLINES, *ELLIPTIC differential equations, *ISOGEOMETRIC analysis, *POISSON'S equation, *BIHARMONIC equations

Abstract

Unstructured hex meshes are partitions of three spaces into boxes that can include irregular edges, where n ≠ 4 boxes meet along an edge, and irregular points, where the box arrangement is not consistent with a tensor-product grid. A new class of tri-cubic C 1 splines is evaluated as a tool for solving elliptic higher-order partial differential equations over unstructured hex meshes. Convergence rates for four levels of refinement are computed for an implementation of the isogeometric Galerkin approach applied to Poisson's equation and the biharmonic equation. The ratios of error are contrasted and superior to an implementation of Catmull-Clark solids. For the trivariate Poisson problem on irregularly partitioned domains, the reduction by 2 4 in the L 2 norm is consistent with the optimal convergence on a regular grid, whereas the convergence rate for Catmull-Clark solids is measured as O (h 3 ). The tri-cubic splines in the isogeometric framework correctly solve the trivariate biharmonic equation, but the convergence rate in the irregular case is lower than O( h 4 ). An optimal reduction of 2 4 is observed when the functions on the C 1 geometry are relaxed to be C 0 . [ABSTRACT FROM AUTHOR]

Published

2022

31. A C0-conforming DG finite element method for biharmonic equations on triangle/tetrahedron.

Author

Ye, Xiu and Zhang, Shangyou

Subjects

*FINITE element method, *YANG-Baxter equation, *TETRAHEDRA, *BIHARMONIC equations, *TRIANGLES, *VECTOR valued functions

Abstract

A C0-conforming discontinuous Galerkin (CDG) finite element method is introduced for solving the biharmonic equation. The first strong gradient of C0 finite element functions is a vector of discontinuous piecewise polynomials. The second gradient is the weak gradient of discontinuous piecewise polynomials. This method, by its name, uses nonconforming (non C1) approximations and keeps simple formulation of conforming finite element methods without any stabilizers. Optimal order error estimates in both a discrete H2-norm and the L2-norm are established for the corresponding finite element solutions. Numerical results are presented to confirm the theory of convergence. [ABSTRACT FROM AUTHOR]

Published

2022

32. A Mathematical Analysis Method for Bending Problem of Clamped Shallow Spherical Shell on Elastic Foundation.

Author

Li, Shanqing, Yang, Chunsheng, Xia, Fengfei, and Yuan, Hong

Subjects

BIHARMONIC equations, ELASTIC plates & shells, MATHEMATICAL analysis, ELASTIC foundations, DIFFERENTIAL equations, INTEGRAL transforms

Abstract

A mathematical analysis method is employed to solve the bending problem of slip clamped shallow spherical shell on elastic foundation. Using the slip clamped boundary conditions, the differential equations of the problem are simplified to a biharmonic equation. Using the R -function, the fundamental solution and the boundary equation of the biharmonic equation, a function is established. This function satisfies the homogeneous boundary condition of the biharmonic equation. The biharmonic equation of the slip clamped shallow spherical shell bending problem on elastic foundation is transformed to Fredholm integral equation of the second kind by using Green's formula. The vector expression of the integral equation kernel is derived. Choosing a suitable form of the normalized boundary equation, the singularity of the integral equation kernel is overcome. To obtain the numerical results, the discretization of the integral equation of the bending problem is conducted. The treatment of singular term in the discretization equation is to use the integration by parts. Numerical results of rectangular, trapezoidal, pentagonal, L-shaped and concave shape shallow spherical shells show high accuracy of the proposed method. The numerical results show fine agreement with the ANSYS finite element method (FEM) solution, which shows the proposed method is an effective mathematical analysis method. [ABSTRACT FROM AUTHOR]

Published

2022

33. A weak divergence CDG method for the biharmonic equation on triangular and tetrahedral meshes.

Author

Ye, Xiu and Zhang, Shangyou

Subjects

*BIHARMONIC equations, *FINITE element method, *CONTINUOUS functions

Abstract

A conforming discontinuous Galerkin (CDG) C 0 - P k finite element method is introduced for solving the biharmonic equation on triangular and tetrahedral meshes. A C 0 - P k finite element function is a continuous and piecewise polynomial of degree k on a triangular or tetrahedral mesh. The CDG method is based on taking weak divergence on the gradient of C 0 - P k finite elements. Optimal order error estimates in both a discrete H 2 norm and the L 2 norm are established. Numerical results are presented to verify the theory. [ABSTRACT FROM AUTHOR]

Published

2022

34. CONDITIONAL STABILITY ESTIMATE FOR AN ILL-POSED ELLIPTIC EQUATION BY USING NONLOCAL CONDITIONS.

Author

Benrabah, Abderafik

Subjects

ELLIPTIC equations, BIHARMONIC equations, RECTANGLES, A priori

Abstract

We consider an ill-posed linear homogeneous fourth-order elliptic equation. We show that the problem is ill-posed in the sense of Hadamard, i.e., the solution does not depend continuously on the given data. We propose a regularization method via nonlocal conditions and under some a priori bound assumptions different estimates for the regularized solution are obtained. Numerical examples for a rectangle domain show the effectiveness of the new method in providing highly accurate numerical solutions as the noise level tends to zero. [ABSTRACT FROM AUTHOR]

Published

2022

35. Green's functions of some boundary value problems for the biharmonic equation.

Author

Karachik, Valery

Subjects

*BIHARMONIC equations, *BOUNDARY value problems, *GREEN'S functions, *DIRICHLET problem, *NEUMANN problem, *INTEGRAL representations

Abstract

In this paper the Green's functions for three boundary value problems for the biharmonic equation are investigated. First, an integral representation of solutions to the inhomogeneous biharmonic equation is given. Then the Green's function of the Dirichlet problem is found and an integral representation of the solution to the Dirichlet problem in terms of the Green's function is given. After that, the Green's function of the Navier problem and the integral representation of the solution to the Navier problem are presented. To study the Neumann-2 problem, the Green's function of the Neumann problem for the Poisson equation is discussed and on its basis the Green's function of the Neumann-2 problem is constructed. To illustrate the results obtained, solutions of the three considered homogeneous problems for the polynomial right-hand side of the equation are found. [ABSTRACT FROM AUTHOR]

Published

2022

36. LIGHTNING STOKES SOLVER.

Author

BRUBECK, PABLO D. and TREFETHEN, LLOYD N.

Subjects

*STOKES flow, *BIHARMONIC equations, *ANALYTIC functions, *EDDIES

Abstract

Gopal and Trefethen recently introduced "lightning solvers" for the 2D Laplace and Helmholtz equations, based on rational functions with poles exponentially clustered near singular corners. Making use of the Goursat representation in terms of analytic functions, we apply these methods to the biharmonic equation, specifically to 2D Stokes flow. Solutions to model problems are computed to 10-digit accuracy in less than a second of laptop time. As an illustration of the high accuracy, we resolve two or more counterrotating Moffatt eddies near a singular corner. [ABSTRACT FROM AUTHOR]

Published

2022

37. Four Boundary Value Problems for a Nonlocal Biharmonic Equation in the Unit Ball.

Author

Karachik, Valery, Turmetov, Batirkhan, and Yuan, Hongfen

Subjects

*BOUNDARY value problems, *BIHARMONIC equations, *UNIT ball (Mathematics), *EXISTENCE theorems, *GREEN'S functions, *INTEGRAL representations

Abstract

Solvability issues of four boundary value problems for a nonlocal biharmonic equation in the unit ball are investigated. Dirichlet, Neumann, Navier and Riquier–Neumann boundary value problems are studied. For the problems under consideration, existence and uniqueness theorems are proved. Necessary and sufficient conditions for the solvability of all problems are obtained and an integral representations of solutions are given in terms of the corresponding Green's functions. [ABSTRACT FROM AUTHOR]

Published

2022

38. Hausdorff Analytic Functions in a Three-Dimensional Associative Noncommutative Algebra.

Author

Shpakivskyi, Vitalii and Kuzmenko, Tetiana

Subjects

*ANALYTIC functions, *ASSOCIATIVE algebras, *INTEGRAL representations, *NONCOMMUTATIVE algebras, *INTEGRAL functions, *BIHARMONIC equations

Abstract

A class of H-analytic (differentiable by Hausdorff) functions in a three-dimensional noncommutative algebra e A ~ 2 over the field ℂ is considered. All H-analytic functions are described in the explicit form. The obtained description is applied to the integral representation of these functions, and the mentioned functions are also applied when solving some PDEs. [ABSTRACT FROM AUTHOR]

Published

2022

39. h-, p-, and hp-Versions of the Least-Squares Collocation Method for Solving Boundary Value Problems for Biharmonic Equation in Irregular Domains and Their Applications.

Author

Belyaev, V. A., Bryndin, L. S., Golushko, S. K., Semisalov, B. V., and Shapeev, V. P.

Subjects

*BIHARMONIC equations, *BOUNDARY value problems, *COLLOCATION methods, *NUMERICAL solutions to boundary value problems, *FINITE differences, *CHEBYSHEV polynomials

Abstract

New h-, p-, and hp-versions of the least-squares collocation method are proposed and implemented. They yield approximate solutions of boundary value problems for an inhomogeneous biharmonic equation in irregular and multiply-connected domains. Formulas for the extension operation in the transition from coarse to finer grids on a multigrid complex are given in the case of applying various spaces of polynomials. It is experimentally shown that numerical solutions of boundary value problems produced by the developed versions of the method have a higher order of convergence to analytical solutions with no singularities. The results are compared with those of other authors produced by applying finite difference, finite element, and other methods based on Chebyshev polynomials. Examples of problems with singularities are considered. The developed versions of the method are used to simulate the bending of an elastic isotropic plate of irregular shape subjected to transverse loading. [ABSTRACT FROM AUTHOR]

Published

2022

40. Chaotic mixing in a free‐helix extruder using a new solution to the biharmonic equation.

Author

Campbell, Gregory A., Taylor, Ross, Wetzel, Mark D., Chempath, Shaji, Bomma, Sirisha, St. John, Samuel, Hunt, Diana, and Powers, David L.

Subjects

BIHARMONIC equations, CHANNEL flow, SCREWS

Abstract

A recently published approach for modeling the cross flow in an extruder channel using a new solution to the biharmonic equation is utilized in a study of chaotic mixing in a free‐helix single‐screw extruder. This novel extruder was designed and constructed with the screw flight, also referred to as the helix, detached from the screw core. The flight‐helix had straight sides that more closely emulated rectangular channel theory than the nominal sloped sides of a conventional single screw channel. Each of the screw elements could be rotated independently to obtain chaotic motion in the screw channel. Using the new extruder, experimental evidence for the increased mixing of a dye, for both a Dirac and droplet input, with a chaotic flow field relative to the traditional residence time distribution is presented. These experimental results are compared using the new biharmonic equation‐based model. Comparing the experimental chaotic mixing with theoretical calculations was facilitated by a recently published technique for accurately placing the dye in the extruder channel. Because of the ability to periodically rotate only the flight/helix, the chaotic mixing results are minimally confounded by the existence of Moffatt eddies. [ABSTRACT FROM AUTHOR]

Published

2022

41. High order Morley elements for biharmonic equations on polytopal partitions.

Author

Li, Dan, Wang, Chunmei, Wang, Junping, and Zhang, Shangyou

Subjects

*BIHARMONIC equations, *FINITE element method, *SCHUR complement, *GALERKIN methods, *DEGREES of freedom

Abstract

This paper introduces an extension of the Morley element for approximating solutions to biharmonic equations. Traditionally limited to piecewise quadratic polynomials on triangular elements, the extension leverages weak Galerkin finite element methods to accommodate higher degrees of polynomials and the flexibility of general polytopal elements. By utilizing the Schur complement of the weak Galerkin method, the extension allows for fewest local degrees of freedom while maintaining sufficient accuracy and stability for the numerical solutions. The numerical scheme incorporates locally constructed weak tangential derivatives and weak second order partial derivatives, resulting in an accurate approximation of the biharmonic equation. Optimal order error estimates in both a discrete H 2 norm and the usual L 2 norm are established to assess the accuracy of the numerical approximation. Additionally, numerical results are presented to validate the developed theory and demonstrate the effectiveness of the proposed extension. [ABSTRACT FROM AUTHOR]

Published

2024

42. Isogeometric collocation for solving the biharmonic equation over planar multi-patch domains.

Author

Kapl, Mario, Kosmač, Aljaž, and Vitrih, Vito

Subjects

*BIHARMONIC equations, *ISOGEOMETRIC analysis, *PARTIAL differential equations, *COLLOCATION methods

Abstract

We present an isogeometric collocation method for solving the biharmonic equation over planar bilinearly parameterized multi-patch domains. The developed approach is based on the use of the globally C 4 -smooth isogeometric spline space (Kapl and Vitrih, 2021) to approximate the solution of the considered partial differential equation, and proposes as collocation points two different choices, namely on the one hand the Greville points and on the other hand the so-called superconvergent points. Several examples demonstrate the potential of our collocation method for solving the biharmonic equation over planar multi-patch domains, and numerically study the convergence behavior of the two types of collocation points with respect to the L 2 -norm as well as to equivalents of the H s -seminorms for 1 ≤ s ≤ 4. In the studied case of spline degree p = 9 , the numerical results indicate in case of the Greville points a convergence of order O (h p − 3) independent of the considered (semi)norm, and show in case of the superconvergent points an improved convergence of order O (h p − 2) for all (semi)norms except for the equivalent of the H 4 -seminorm, where the order O (h p − 3) is anyway optimal. [ABSTRACT FROM AUTHOR]

Published

2024

43. Four-order superconvergent CDG finite elements for the biharmonic equation on triangular meshes.

Author

Ye, Xiu and Zhang, Shangyou

Subjects

*FINITE element method, *BIHARMONIC equations, *DISCONTINUOUS functions, *BILINEAR forms, *GALERKIN methods

Abstract

In a conforming discontinuous Galerkin (CDG) finite element method, discontinuous P k polynomials are employed. To connect discontinuous functions, the inter-element traces, { u h } and { ∇ u h } , are usually defined as some averages in discontinuous Galerkin finite element methods. But in this CDG finite element method, they are defined as projections of a lifted P k + 4 polynomial from four P k polynomials on neighboring triangles. With properly chosen weak Hessian spaces, when tested by discontinuous polynomials, the variation form can have no inter-element integral, neither any stabilizer. That is, the bilinear form is the same as that of conforming finite elements for solving the biharmonic equation. Such a conforming discontinuous Galerkin finite element method converges four orders above the optimal order, i.e., the P k solution has an O (h k + 5) convergence in L 2 -norm, and an O (h k + 3) convergence in H 2 -norm. A local post-process is defined, which lifts the P k solution to a P k + 4 quasi-optimal solution. Numerical tests are provided, confirming the theory. [ABSTRACT FROM AUTHOR]

Published

2024

44. A novel approach of random packing generation of complex-shaped 3D particles with controllable sizes and shapes.

Author

Wang, Xiang, Yin, Zhen-Yu, Su, Dong, Wu, Xiaoxin, and Zhao, Jidong

Subjects

*RANDOM numbers, *BIHARMONIC equations, *MANUFACTURING processes, *CURVE fitting, *GRANULAR materials, *CONVEX surfaces

Abstract

This paper presents a novel computational-geometry-based approach to generating random packing of complex-shaped 3D particles with quantitatively controlled sizes and shapes for discrete modeling of granular materials. The proposed method consists of the following five essential steps: (1) partitioning of the packing domain into a prescribed number of random polyhedrons with desired sizes and form-scale shapes using the constrained Voronoi tessellation; (2) extraction of key points from the edges and facets of each polyhedron; (3) construction of a freeform curve network in each polyhedron based on Bézier curve fitting; (4) generation of solid particles with smooth, convex surfaces using the biharmonic-based surface interpolation of the constructed network; and (5) creation of concavity by superimposing spherical harmonic-based random noise. To ensure that the obtained shape descriptors (e.g., the elongation, flatness, roundness and convexity ratio) match the hypothesized values, an inverse Monte Carlo algorithm is employed to iteratively fine-tune the control parameters during particle generation. The ability of the proposed approach to generate granular particles with the desired geometric properties and packing is demonstrated through several examples. This study paves a viable pathway for realistic modeling of granular media pertaining to various engineering and industrial processes. [ABSTRACT FROM AUTHOR]

Published

2022

45. Ground state solution to the biharmonic equation.

Author

Feng, Zhaosheng and Su, Yu

Subjects

*BIHARMONIC equations, *CONTINUUM mechanics, *ELASTIC plates & shells, *VISCOUS flow, *FLUID flow

Abstract

The biharmonic equation arises in areas of continuum mechanics, including mechanics of elastic plates and the slow flow of viscous fluids. In this paper, we make an effort to establish the generalized versions of Lions-type theorem under various conditions and then apply them to study the existence of ground state solutions for the biharmonic equation. [ABSTRACT FROM AUTHOR]

Published

2022

46. RBF–DQ algorithms for elliptic problems in axisymmetric domains.

Author

Chen, C. S., Jankowska, Malgorzata A., and Karageorghis, Andreas

Subjects

*FAST Fourier transforms, *NUMERICAL solutions to boundary value problems, *BIHARMONIC equations, *MATRIX decomposition

Abstract

A radialbasis function (RBF)–differentialquadrature (DQ) method is applied for the numerical solution of elliptic boundary value problems (BVPs) in three-dimensional axisymmetric domains. By appropriately selecting the collocation points, for any choice of RBF, the proposed discretization leads to linear systems in which the coefficient matrices possess block circulant structures. Matrix decomposition algorithms (MDAs) and fast Fourier transforms (FFTs) are employed for the efficient solution of these systems. Three types of BVPs are considered, namely ones governed by the Poisson equation, the inhomogeneous biharmonic equation, and the inhomogeneous Cauchy–Navier equations of elasticity. The high accuracy of the proposed technique as well as its ability to solve large-scale problems is demonstrated on several numerical examples. [ABSTRACT FROM AUTHOR]

Published

2022

47. 一类热弹性板的空间衰减估计.

Author

石金诚

Subjects

*DIFFERENTIAL inequalities, *DERIVATIVES (Mathematics), *ELASTIC plates & shells, *BIHARMONIC equations

Abstract

The spatial properties of solutions for a class of thermoelastic plates with biharmonic operators were studied in a semi-infinite strip in R2. Firstly, an energy expression was constructed. Then, by means of the differential inequality technique, a differential inequality whose energy expression can be controlled with its 1st derivative was derived. Finally, the spatial decay estimates of the solution were obtained. The result can be regarded as an application of the Saint-Venant principle to hyperbolic parabolic coupled biharmonic equations. [ABSTRACT FROM AUTHOR]

Published

2022

48. A deep artificial neural network architecture for mesh free solutions of nonlinear boundary value problems.

Author

Aggarwal, Riya, Ugail, Hassan, and Jha, Ravi Kumar

Subjects

NONLINEAR boundary value problems, BIHARMONIC equations, ARTIFICIAL neural networks, BOUNDARY value problems, DIFFERENTIAL operators, PARTIAL differential operators

Abstract

Seeking efficient solutions to nonlinear boundary value problems is a crucial challenge in the mathematical modelling of many physical phenomena. A well-known example of this is solving the Biharmonic equation relating to numerous problems in fluid and solid mechanics. One must note that, in general, it is challenging to solve such boundary value problems due to the higher-order partial derivatives in the differential operators. An artificial neural network is thought to be an intelligent system that learns by example. Therefore, a well-posed mathematical problem can be solved using such a system. This paper describes a mesh free method based on a suitably crafted deep neural network architecture to solve a class of well-posed nonlinear boundary value problems. We show how a suitable deep neural network architecture can be constructed and trained to satisfy the associated differential operators and the boundary conditions of the nonlinear problem. To show the accuracy of our method, we have tested the solutions arising from our method against known solutions of selected boundary value problems, e.g., comparison of the solution of Biharmonic equation arising from our convolutional neural network subject to the chosen boundary conditions with the corresponding analytical/numerical solutions. Furthermore, we demonstrate the accuracy, efficiency, and applicability of our method by solving the well known thin plate problem and the Navier-Stokes equation. [ABSTRACT FROM AUTHOR]

Published

2022

49. Schwartz-type boundary-value problems for canonical domains in a biharmonic plane.

Author

Gryshchuk, Serhii V. and Plaksa, Sergiy A.

Subjects

*BOUNDARY value problems, *BIHARMONIC equations, *MONOGENIC functions, *COMMUTATIVE algebra, *CARTESIAN plane, *ALGEBRA

Abstract

A commutative algebra B over the complex field with a basis {e1, e2} satisfying the conditions e 1 2 + e 2 2 2 = 0 , e 1 2 + e 2 2 ≠ 0 is considered. This algebra is associated with the 2-D biharmonic equation. We consider Schwartz-type boundary-value problems on finding a monogenic function of the type Φ (xe1+ye2) = U1(x; y) e1 + U2(x; y) ie1 + U3(x; y) e2 + U4(x; y) ie2, (x; y) ∈ D, when the values of two components—either U1, U3 or U1, U4—are given on the boundary of a domain D lying in the Cartesian plane xOy. For solving those boundary-value problems for a half-plane and for a disk, we develop methods that are based on solution expressions via Schwartz-type integrals and obtain solutions in the explicit form. [ABSTRACT FROM AUTHOR]

Published

2021

50. UNIFORM AUXILIARY SPACE PRECONDITIONING FOR HDG METHODS FOR ELLIPTIC OPERATORS WITH A PARAMETER DEPENDENT LOW ORDER TERM.

Author

GUOSHENG FU

Subjects

*ELLIPTIC operators, *REACTION-diffusion equations, *UNIFORM spaces, *BIHARMONIC equations

Abstract

The auxiliary space preconditioning (ASP) technique is applied to the hybridizable discontinuous Galerkin (HDG) schemes for three different elliptic problems with a parameter dependent low order term, namely, a symmetric interior penalty HDG scheme for the scalar reaction-diffusion equation, a divergence-conforming HDG scheme for a vectorial reaction-diffusion equation, and a C0-continuous interior penalty HDG scheme for the generalized biharmonic equation with a low order term. Uniform preconditioners are obtained for each case and the general ASP theory by J. Xu [Computing, 56 (1996), pp. 215--235] is used to prove the optimality with respect to the mesh size and uniformity with respect to the low order parameter. [ABSTRACT FROM AUTHOR]

Published

2021