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| Name: | ||||
| Miloslav Znojil | ||||
| Reviewer number: | ||||
| 9689 | ||||
| Email: | ||||
| znojil@ujf.cas.cz | ||||
| Item's zbl-Number: | ||||
| DE 019 028 614 | ||||
| Author(s): | ||||
| Burghelea, Dan; Saldanha, Nucolau C.; Tomei, Carlos: | ||||
| Shorttitle: | ||||
| Infinite dimensional topology and structure of the critical set of nonlinear SL operators | ||||
| Source: | ||||
| J. Differ. Equatioins 188, No. 2, 569-590 (2003) | ||||
| Classification: | ||||
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| Primary Classification: | ||||
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| Secondary Classification: | ||||
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| Keywords: | ||||
| Sturm-Liouville operator, nonlinear; infinite-dimensional manifolds; changes of variables; critical set as union of parallel hyperplanes; contractibility | ||||
| Review: | ||||
Non-homogeneous and nonlinear Sturm-Liouville problem with Dirichlet boundary conditions on half-line is considered. Its differential operator F is assumed generic (``tamed" by appropriate constraints), possessing a critical set C defined as a subset of the (Sobolev) domain of F where the ``differential" Fredholm operator DF has zero eigenvalue. Authors show that there exists a diffeomorphism in the domain of F which maps C into a union of isolated parallel hyperplanes (in this way, the thirty years single-hyperplane result by Ambrosetti and Prodi [1] on inversion of a narrower set of maps between Banach spaces is generalized in one-dimensional case). In the proof they show, first, that each connected component of C is contractible (has trivial homotopy group -- to show this, authors need oscillation theorems and stay within one dimension, therefore) and, second, that one may replace homotopy equivalences by diffeomorphisms. In this way, they do not need to assume the convexity or particular asymptotics for their non-linearity. | ||||
| Remarks to the editors: | ||||