Boundary blow-up insemilinear elliptic problems with singular weights at the boundary

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Boundary blow-up insemilinear elliptic problems with singular weights at the boundary

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dc.contributor.author Cheng, Yuanji
dc.contributor.editor Misra, Jagadis Chandra
dc.date.accessioned 2011-01-13T10:05:25Z
dc.date.available 2011-01-13T10:05:25Z
dc.date.issued 2001
dc.identifier.citation p 68 - 81 en
dc.identifier.isbn 8173194068
dc.identifier.uri http://hdl.handle.net/2043/11471
dc.description.abstract In this paper, we study under what conditions on m(x) and f(u) the problem Δu=m(x)f(u) has a solution in a bounded domain D, which tends to infinity, as x tends to the boundary. We show that if m(x) is singular at the boundary of D, except that the Keller-Osserman condition must hold, the growth of f at the infinity has to be slow for a solution to exist. Some existence results have been established. en
dc.language.iso eng en
dc.publisher Narosa publishing house, New Delhi en
dc.subject Large solutions en
dc.subject Boundary value problems en
dc.subject Boundary estimates en
dc.subject.classification Sciences en
dc.title Boundary blow-up insemilinear elliptic problems with singular weights at the boundary en
dc.type BookChapter en
dc.identifier.paperprint 0 en
dc.contributor.department Malmö University. School of Technology en
dc.subject.srsc Research Subject Categories::MATHEMATICS en
dc.relation.ispartofpublication Applicable Mathematics : its perspectives and challenges en
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