Boundary integral solution of the two-dimensional heat equation

Autor:	J. Saranen, George C. Hsiao
Rok vydání:	1993
Předmět:	Dirichlet problem General Mathematics Mathematical analysis General Engineering Neumann boundary condition Heat equation Boundary value problem Integral equation Poincaré–Steklov operator Heat kernel Trace operator Mathematics
Zdroj:	Mathematical Methods in the Applied Sciences. 16:87-114
ISSN:	1099-1476 0170-4214
DOI:	10.1002/mma.1670160203
Popis:	Here we consider initial boundary value problems for the heat equation by using the heat potential representation for the solution. Depending on the choice of the representation we are led to a solution of the various boundary integral equations. We discuss the solvability of these equations in anisotropic Sobolev spaces. It turns out that the double-layer heat potential D and its spatial adjoint D′ have smoothing properties similar to the single-layer heat operator. This yields compactness of the operators D and D′. In addition, for any constant c ≠ 0, cI + D′ and cI + D′ are isomorphisms. Based on the coercivity of the single-layer heat operator and the above compactness we establish the coerciveness of the hypersingular heat operator. Moreover, we show an equivalence between the weak solution and the various boundary integral solutions. As a further application we describe a coupling procedure for an exterior initial boundary value problem for the non-homogeneous heat equation.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_________::168e91b69a9e14064989ecb5cf1be545 https://doi.org/10.1002/mma.1670160203 Zobrazit plný text záznamu Plný text