Neumann problem for generalized <i>n</i>-Poisson equation
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Date
2009
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Publisher
Academic Press inc Elsevier Science
Open Access Color
HYBRID
Green Open Access
No
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Abstract
Using a hierarchy of integral operators having higher-order Neumann functions and their derivatives as kernels, the Neumann problem for a 2nth order linear partial complex differential equation is discussed. The solvability of the problem is obtained. (C) 2009 Elsevier Inc. All rights reserved.
Description
Celebi, Ahmet Okay/0000-0001-5256-1035; Aksoy, Umit/0000-0002-6014-1898
Keywords
Neumann problem, Higher-order Poisson equation, Singular integral operators, Singular integral operators, Higher-order Poisson equation, Applied Mathematics, Neumann problem, Analysis, Integral operators, higher-order Poisson equation, linear complex partial differential equation, Linear higher-order PDEs, singular integral operators, General existence and uniqueness theorems (PDE)
Turkish CoHE Thesis Center URL
Fields of Science
0101 mathematics, 01 natural sciences
Citation
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Q1
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Q2
OpenCitations Citation Count
16
Source
Journal of Mathematical Analysis and Applications
Volume
357
Issue
2
Start Page
438
End Page
446
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CrossRef : 11
Scopus : 19
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