Abstract
We consider sufficient conditions of local removability of coincidences of maps $f,g\colon N\rightarrow M$, where $M,N$ are manifolds with dimensions $\dim N\geq\dim M$. The coincidence index is the only obstruction to the removability for maps with fibers either acyclic or homeomorphic to spheres of certain dimensions. We also address the normalization property of the index and coincidence-producing maps.
Citation
Peter Saveliev. "Removing coincidences of maps between manifolds of different dimensions." Topol. Methods Nonlinear Anal. 22 (1) 105 - 113, 2003.
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