Simplifying generic smooth maps to the 2-sphere and to the plane
Abstract
We study how to construct explicit deformations of generic smooth maps from closed n--dimensional manifolds M with n ≥ 2 to the 2--sphere S2 and show that every smooth map M S2 is homotopic to a C∞ stable map with at most one cusp point and with only folds of the middle absolute index. Furthermore, if n is even, such a C∞ stable map can be so constructed that the restriction to the singular point set is a topological embedding. As a corollary, we show that for n ≥ 2 even, there always exists a C∞ stable map M R2 with at most one cusp point such that the restriction to the singular point set is a topological embedding. As another corollary, we give a new proof to the existence of an open book structure on odd dimensional manifolds which extends a given one on the boundary, originally due to Quinn. Finally, using the open book structure thus constructed, we show that k--connected n--dimensional manifolds always admit a fold map into R2 without folds of absolute indices i with 1 ≤ i ≤ k, for n ≥ 7 odd and 1 ≤ k ≤ (n-5)/2.
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