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Orientation and the Leray-Schauder theory for fully nonlinear elliptic boundary value problems - 483

Fitzpatrick, Patrick
Part of the Memoirs of the American Mathematical Society series
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The aim of this work is to develop an additive, integer-valued degree theory for the class of quasilinear Fredholm mappings.

This class is sufficiently large that, within its framework, one can study general fully nonlinear elliptic boundary value problems.

A degree for the whole class of quasilinear Fredholm mappings must necessarily accommodate sign-switching of the degree along admissible homotopies.

The authors introduce "parity", a homotopy invariant of paths of linear Fredholm operators having invertible endpoints.

The parity provides a complete description of the possible changes in sign of the degree and thereby permits use of the degree to prove multiplicity and bifurcation theorems for quasilinear Fredholm mappings.

Applications are given to the study of fully nonlinear elliptic boundary value problems.

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Product Details
American Mathematical Society
147040060X / 9781470400606
eBook (Adobe Pdf)
510 s
30/01/1993
English
127 pages
Copy: 20%; print: 20%
PBK Calculus & mathematical analysis, PBW Applied mathematics
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