Mixed boundary value problems for the Helmholtz equation in arbitrary 2D-sectors

Mellin convolution equations acting in Bessel potential spaces are considered. The study is based upon two results. The first one concerns the interaction of Mellin convolutions and Bessel potential operators (BPOs). In contrast to the Fourier convolutions, BPOs and Mellin convolutions do not commute and we derive an explicit formula for the corresponding commutator in the case of Mellin convolutions with meromorphic symbols. These results are used in the lifting of the Mellin convolution operators acting on Bessel potential spaces up to operators on Lebesgue spaces. The operators arising belong to an algebra generated by Mellin and Fourier convolutions acting on L p -spaces. Fredholm conditions and index formulae for such operators have been obtained earlier by R. Duduchava and are employed here. Note that the results of the present work find numerous applications in boundary value problems for partial differential equations, in particular, for equations in domains with angular points.• In general, Mellin convolution operators are not bounded in neither Besov nor Bessel potential spaces. Therefore, in order to study equations (2) in the spaces of interest, one has to find a subclass of multipliers with the boundedness property.

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“…Recall that boundary integral operators for BVPs in planar domains with corners have admissible kernels (see (2) and [15,16,18,22]).…”

Section: Mellin Convolution Operators In the Bessel Potential Spaces-mentioning

confidence: 99%

“…By [22] the BVP (1) is reduced to the following equivalent system of boundary integral equations on R + ,…”

Section: Introductionmentioning

confidence: 99%

Mellin convolution operators in Bessel potential spaces

Didenko

Duduchava

2016

Journal of Mathematical Analysis and Applications

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“…After the initial contribution by Zaremba, early works concerning the Zaremba boundary value problem include results by Signorini [25] (1916: solution of the Zaremba problem in the upper half plane using complex variable methods); Giraud [17] (1934: existence of solution of Zaremba problems for general elliptic operators); Fichera [13, 14] (1949, 1952: regularity studies at Zaremba points, Zaremba-type problem for the elasticity equations in two spatial dimensions); Magenes [22] (1955: proof of existence and uniqueness, single layer potential representation); Lorenzi [21] (1975: Sobolev regularity around a corner which is also a Dirichlet-Neumann junction); and Wigley [29,30] (1964,1970: explicit asymptotic expansions around Dirichlet-Neumann junctions), amongst others. More recent contributions in this area include reference [28], which provides a valuable review in addition to a study of Zaremba singularities and theoretical results concerning Galerkin-based computational approaches; reference [7], which considers the Zaremba problem for the biharmonic equation; references [10,11], which study Zaremba boundary value problems for Helmholtz and Laplace-Beltrami equations; reference [8], which discusses the solvability of the Zaremba problem from the point of view of pseudo-differential calculus and Sobolev regularity theory; reference [18] which introduces a certain inverse preconditioning technique to reduce the number of linear algebra iterations for the iterative numerical solution of this problem and which gives rise to high-order convergence; and finally, reference [4], which successfully applies the method of difference potentials to the variable-coefficient Zaremba problem, with convergence order approximately equal to one.…”

Section: Introductionmentioning

confidence: 99%

Regularized integral formulation of mixed Dirichlet-Neumann problems

Akhmetgaliyev¹,

Bruno²

2017

J. Integral Equations Applications

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This paper presents a theoretical discussion as well as novel solution algorithms for problems of scattering on smooth two-dimensional domains under Zaremba boundary conditions-for which Dirichlet and Neumann conditions are specified on various portions of the domain boundary. The theoretical basis of the proposed numerical methods, which is provided for the first time in the present contribution, concerns detailed information about the singularity structure of solutions of the Helmholtz operator under boundary conditions of Zaremba type. The new numerical method is based on use of Green functions and integral equations, and it relies on the Fourier Continuation method for regularization of all smooth-domain Zaremba singularities as well as newly derived quadrature rules which give rise to high-order convergence even around Zaremba singular points. As demonstrated in this paper, the resulting algorithms enjoy high-order convergence, and they can be used to efficiently solve challenging Helmholtz boundary value problems and Laplace eigenvalue problems with high-order accuracy.

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“…The diffraction (transmission) problems for Helmholtz and Maxwell equations on smooth bounded obstacles are classical problems of Mathematical Physics (see for instance [5,[16][17][18]27,37], and references cited there). There is an extensive literature devoted to diffraction problems on specific unbounded obstacles (see for instance [6,8,9,11,[13][14][15]20,30,[32][33][34]36,39,58], and references given there).…”

Section: Introductionmentioning

confidence: 99%

Integral Equations of Diffraction Problems with Unbounded Smooth Obstacles

Rabinovich

2015

Integr. Equ. Oper. Theory

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The paper is devoted to the boundary integral equations method for the diffraction problems on obstacles D in R n with smooth unbounded boundaries for Helmholtz operators with variable coefficients. The diffraction problems are described by the Helmholtz operatorswhere ρ, a belong to the space of the infinitely differentiable functions on R n bounded with all derivatives. We introduce the single and double layer potentials associated with the operator H, and reduce by means of these potentials the Dirichlet, Neumann, and Robin problems to pseudodifferential equations on the infinite boundary ∂D. Applying the limit operators method we study the Fredholm properties and the invertibility of the boundary pseudodifferential operators in the Sobolev spaces H s (∂D), s ∈ R.Mathematics Subject Classification. Primary 35J25; Secondary 35Q60.

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Mixed boundary value problems for the Helmholtz equation in arbitrary 2D-sectors

Cited by 8 publications

References 23 publications

Mellin convolution operators in Bessel potential spaces

Mellin convolution operators in Bessel potential spaces

Regularized integral formulation of mixed Dirichlet-Neumann problems

Integral Equations of Diffraction Problems with Unbounded Smooth Obstacles

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