Relations between Reeb graphs, systems of hypersurfaces and epimorphisms onto free groups

Abstract

We construct a correspondence between epimorphisms π1(M) Fr from the fundamental group of a compact manifold M onto the free group of rank r, and systems of r framed non-separating hypersurfaces in M, which induces a bijection onto framed cobordism classes of such systems. In consequence, for closed manifolds any such can be represented by the Reeb epimorphism of a Morse function f M R, i.e. by the epimorphism induced by the quotient map M R(f) onto the Reeb graph of f. Applying this construction we discuss the problem of classification up to (strong) equivalence of epimorphisms onto free groups, providing a new purely geometrical-topological proof of the solution of this problem for surface groups.