Spaces of polynomials as Grassmanians for immersions and embeddings

Abstract

Let Y be a smooth compact n-manifold. We study smooth embeddings and immersions β: M R × Y of compact n-manifolds M such that β(M) avoids some a priory chosen closed poset of tangent patterns to the fibers of the obvious projection π: R × Y Y. Then, for a fixed Y, we introduce an equivalence relation between such β's; it is a crossover between pseudo-isotopies and bordisms. We call this relation quasitopy. In the study of quasitopies, the spaces Pd c of real univariate polynomials of degree d with real divisors, whose combinatorial patterns avoid a given closed poset , play the classical role of Grassmanians. We compute the quasitopy classes QTdemb(Y, c) of -constrained embeddings β in terms of homotopy/homology theory of spaces Y and Pd c. We prove also that the quasitopies of emeddings stabilize, as d ∞.