Thanks to a connection between two completely different topics, the classical eigenvalue problem in a finite dimensional real vector space and the Brouwer degree for maps between oriented differentiable real manifolds, we were able to solve, at least in the finite dimensional context, a conjecture regarding global continuation in nonlinear spectral theory that we formulated in some recent papers. The infinite dimensional case seems nontrivial, and is still unsolved.
The Brouwer degree associated to classical eigenvalue problems and applications to nonlinear spectral theory / PIERLUIGI BENEVIERI, ALESSANDRO CALAMAI, MASSIMO FURI, MARIA PATRIZIA PERA. - In: TOPOLOGICAL METHODS IN NONLINEAR ANALYSIS. - ISSN 1230-3429. - STAMPA. - 59:(2022), pp. 499-523. [10.12775/TMNA.2021.006]
The Brouwer degree associated to classical eigenvalue problems and applications to nonlinear spectral theory.
MARIA PATRIZIA PERA
2022
Abstract
Thanks to a connection between two completely different topics, the classical eigenvalue problem in a finite dimensional real vector space and the Brouwer degree for maps between oriented differentiable real manifolds, we were able to solve, at least in the finite dimensional context, a conjecture regarding global continuation in nonlinear spectral theory that we formulated in some recent papers. The infinite dimensional case seems nontrivial, and is still unsolved.
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