Spaces of polynomials with constrained divisors as Grassmanians for traversing flows

Abstract

We study traversing vector flows v on smooth compact manifolds X with boundary. For a given compact manifold X, equipped with a traversing vector field v which is convex with respect to ∂ X, we consider submersions/embeddings α: X X such that X = X and α(∂ X) avoids a priory chosen tangency patterns to the v-trajectories. In particular, for each v-trajectory γ, we restrict the cardinality of γ α(∂ X) by an even number d. We call ( X, v) a convex pseudo-envelop/envelop of the pair (X, v). Here the vector field v = α( v) is the α-transfer of v to X. For a fixed ( X, v), we introduce an equivalence relation among convex pseudo-envelops/ envelops α: (X, v) ( X, v), which we call a quasitopy. The notion of quasitopy is a crossover between bordisms of pseudo-envelops and their pseudo-isotopies. In the study of quasitopies QTd(Y, c), the spaces Pd c of real univariate polynomials of degree d with real divisors whose combinatorial types avoid the closed poset play the classical role of Grassmanians. We compute, in the homotopy-theoretical terms that involve ( X, v) and Pd c, the quasitopies of convex envelops which avoid the -tangency patterns. We introduce characteristic classes of pseudo-envelops and show that they are invariants of their quasitopy classes. Then we prove that the quasitopies QTd(Y, c) often stabilize, as d ∞.