Derivation and analytical investigation of three direct boundary integral equations for the fundamental biharmonic problem

Autor:	Søren Christiansen
Rok vydání:	1998
Předmět:	Logarithm Plane (geometry) Applied Mathematics Uniqueness of solution Mathematical analysis Boundary (topology) Boundary integral equation Fundamental biharmonic problem Integral equation Computational Mathematics Simultaneous equations Biharmonic equation Uniqueness Boundary value problem Logarithmic capacity Mathematics
Zdroj:	Journal of Computational and Applied Mathematics. 91:231-247
ISSN:	0377-0427
Popis:	We derive and investigate three families of direct boundary integral equations for the solution of the plane, fundamental biharmonic boundary value problem. These three families are fairly general so that they, as special cases, encompass various known and applied equations as demonstrated by giving many references to the literature. We investigate the families by analytical means for a circular boundary curve where the radius is a parameter. We find for all three combinations of equations (i) that the solution of the equations is non-unique for one or more critical radius/radii, and (ii) that this lack of uniqueness can always be removed by combining the integral equations with a suitable combination of one or more supplementary condition(s). We conjecture how the results obtained can, or cannot, be generalized to other boundary curves through the concept logarithmic capacity. A few published general results about uniqueness are compared with our findings.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_dedup___::2fcb626a3859f56e7d239b5966d59511 https://doi.org/10.1016/s0377-0427(98)00041-7 Zobrazit plný text záznamu Full Text from ScienceDirect