Difference between revisions of "Compactified Morse trajectory spaces"
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− | '''TODO:''' smooth evaluation maps <math>{\rm ev}^\pm</math>, length <math>\ell</math> | + | '''TODO:''' smooth evaluation maps <math>{\rm ev}^\pm</math>, length <math>\ell: \overline \mathcal{M}(L,L) \to [0,\infty]</math> given by <math>\ell(\gamma)= a</math> and <math>\ell(\underline{\gamma})=\infty</math> for all generalized (''broken'') Morse trajectories <math>\underline{\gamma}</math> |
Revision as of 10:52, 24 May 2017
Consider a smooth manifold equipped with a Morse function and a metric so that the gradient vector field satisfies the Morse-Smale conditions. Then the Morse trajectory spaces
can - under an additional technical assumption specified in [1] - be compactified to smooth manifolds with boundary and corners . These compactifications are constructed such that the codimension-1 strata of the boundary are given by single breaking at a critical point (except in the first case we have to add one copy of to represent trajectories of length 0),
TODO: smooth evaluation maps , length given by and for all generalized (broken) Morse trajectories