What a real function knows about the manifold on which it is defined: a generalization of Morse theory.
by
DrMihai Damian(University of Strassbourg)
→
Europe/Berlin
H4 (Geomatikum)
H4
Geomatikum
Description
Abstract : Given a generic real function f on a closed manifold X and its gradient V with respect to some generic metric, the classical Morse theory yields a complex which computes the singular homology of X. In a recent joint work with JF. Barraud, V. Humilière and A. Oancea we defined a more general complex using the Morse data (f,V): we call it Morse complex with differential graded coefficients. In this talk I will explain how we defined it, the significance of its homology in some particular cases, and the applications which motivated our work.