Osamu Saeki
Published 2009-03-10Version 1
We give a new and simple proof for the computation of the oriented and the unoriented fold cobordism groups of Morse functions on surfaces. We also compute similar cobordism groups of Morse functions based on simple stable maps of 3-manifolds into the plane. Furthermore, we show that certain cohomology classes associated with the universal complexes of singular fibers give complete invariants for all these cobordism groups. We also discuss invariants derived from hypercohomologies of the universal homology complexes of singular fibers. Finally, as an application of the theory of universal complexes of singular fibers, we show that for generic smooth map germs g: (R^3, 0) --> (R^2, 0) with R^2 being oriented, the algebraic number of cusps appearing in a stable perturbation of g is a local topological invariant of g.
Comments: This is the version published by Algebraic & Geometric Topology on 7 April 2006
Journal: Algebr. Geom. Topol. 6 (2006) 539-572
Singular fibers of stable maps and signatures of 4-manifolds
Criteria for Morin singularities for maps into lower dimensions, and applications
On a classification of Morse functions on $3$-dimensional manifolds represented as connected sums of manifolds of Heegaard genus one
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