Abstract
We show that a family $F_p$; $p\in P$ of nonlinear elliptic boundary value problems of index $0$ parametrized by a compact manifold admits a reduction to a family of compact vector fields parametrized by $P$ if and only if its index bundle ${\rm Ind}\,F$ vanishes. Our second conclusion is that, in the presence of bounds for the solutions of the boundary value problem, the non vanishing of the image of the index bundle under generalized $J$-homomorphism produces restrictions on the possible values of the degree of $F_p$. The most striking manifestation of this arises when the first Stiefel-Whitney class of the index bundle is nontrivial. In this case, the degree of $F_p$ must vanish! From this we obtain a number of corollaries about bifurcation from infinity for solutions of nonlinear elliptic boundary value problems.
Citation
Jacobo Pejsachowicz. "Index bundle, Leray-Schauder reduction and bifurcation of solutions of nonlinear elliptic boundary value problems." Topol. Methods Nonlinear Anal. 18 (2) 243 - 267, 2001.
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