On the concept of orientability for Fredholm maps between real Banach manifolds
From MaRDI portal
Publication:5936107
DOI10.12775/TMNA.2000.042zbMath1007.47026MaRDI QIDQ5936107
Massimo Furi, Pierluigi Benevieri
Publication date: 27 March 2003
Published in: Topological Methods in Nonlinear Analysis (Search for Journal in Brave)
Degree theory for nonlinear operators (47H11) (Semi-) Fredholm operators; index theories (47A53) Fredholm structures on infinite-dimensional manifolds (58B15) Homotopy and topological questions for infinite-dimensional manifolds (58B05)
Related Items (23)
Method of monotone solutions for reaction-diffusion equations ⋮ Topological persistence of the unit eigenvectors of a perturbed Fredholm operator of index zero ⋮ Subharmonic solutions for a class of predator-prey models with degenerate weights in periodic environments ⋮ Oriented degree of Fredholm maps: finite-dimensional reduction method ⋮ An infinite dimensional version of the intermediate value theorem ⋮ Infinite-dimensional degree theory and stochastic analysis ⋮ Algebraic multiplicity and topological degree for Fredholm operators ⋮ About the sign of oriented Fredholm operators between Banach spaces ⋮ Global bifurcation results for nonlinear dynamic equations on time scales ⋮ Superlinear convolution equations in \(\mathbb R^{N}\) ⋮ A degree theory for locally compact perturbations of Fredholm maps in Banach spaces ⋮ A degree theory for a class of perturbed Fredholm maps. II ⋮ Approximation and convergence rate of nonlinear eigenvalues: Lipschitz perturbations of a bounded self-adjoint operator ⋮ Atypical bifurcation without compactness ⋮ A global bifurcation index for set-valued perturbations of Fredholm operators ⋮ Degree of locally condensing perturbations of Fredholm maps with positive index and applications ⋮ On the product formula for the oriented degree for Fredholm maps of index zero between Banach manifolds ⋮ The Nirenberg problem of prescribed Gauss curvature on \(S^2\) ⋮ Global Continuation for Quasilinear Elliptic Systems on ℝN and the Equations of Elastostatics ⋮ Axiomatization of the degree of Fitzpatrick, Pejsachowicz and Rabier ⋮ Eigenvalue problems for Fredholm operators with set-valued perturbations ⋮ On orientability and degree of Fredholm maps ⋮ A degree associated to linear eigenvalue problems in Hilbert spaces and applications to nonlinear spectral theory
This page was built for publication: On the concept of orientability for Fredholm maps between real Banach manifolds
