Dirichlet-Type Problems for the Two-Dimensional Helmholtz Operator in Complex Quaternionic Analysis
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Abstract
This study aims to study a class of Dirichlet-type problems associated with the two-dimensional Helmholtz equation with complex potential. Orthogonal decompositions of the complex quaternionic-valued Sobolev space as well as the corresponding orthoprojections onto the subspaces of theses decompositions are obtained. Analytic representation formulas for the underlying solutions in terms of hypercomplex integral operators are established.
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Keywords
Quaternionic analysis, Helmholtz operator, Dirichlet-type problems, Electromagnetic Scattering, quaternionic analysis, Helmholtz operator, Functions of hypercomplex variables and generalized variables, Dirichlet-type problems, Boundary value and inverse problems for harmonic functions in higher dimensions
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0101 mathematics, 01 natural sciences
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OpenCitations Citation Count
4
Volume
13
Issue
6
Start Page
4901
End Page
4916
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CrossRef : 1
Scopus : 4
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4
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4
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4
checked on May 22, 2026
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