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counting zeros of $\uppercase{c}^1$ fredholm maps of index 1

Published online by Cambridge University Press:  23 September 2005

j. lópez-gómez
Affiliation:
departamento de matemática aplicada, universidad complutense de madrid, 28040-madrid, [email protected][email protected]
c. mora-corral
Affiliation:
departamento de matemática aplicada, universidad complutense de madrid, 28040-madrid, [email protected][email protected]
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Abstract

the degree defined by p. benevieri and m. furi (see ‘a simple notion of orientability for fredholm maps of index zero between banach manifolds and degree theory’, ann. sci. math. québec 22 (1998) 131–148) is used here to obtain some sharp lower bounds for the number of solutions of the $\lambda$-sections of the compact components of the set of non-trivial solutions of $\mf{f}(\lambda,x)=0$, where $\mf{f}$ is a $\cal{c}^1$ fredholm map of index 1 such that $\mf{f}(\lambda,0)=0$ for all $\lambda\in\mathbb{r}$. these bounds are given in terms of the parity of the linearized fredholm family $d_2\mf{f}(\cdot,0)$. the parity is a local invariant measuring the change of the orientation of $d_2\mf{f}(\lambda,0)$ as $\lambda$ crosses an interval. the set of eigenvalues of $d_2\mf{f}(\cdot,0)$ is not assumed to be discrete. therefore, even in the classical situation when $\mf{f}$ is a compact perturbation of the identity, the results presented here are completely new.

Type
papers
Copyright
the london mathematical society 2005

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Footnotes

supported by the ministry of education and science of spain under ref. grant ren2003-00707, the spanish secretary of education and universities, and the european social fund.