The homotopy type of spaces of resultants of bounded multiplicity

Abstract

For positive integers m,n, d≥ 1 with (m,n)= (1,1) and a field F with its algebraic closure F, let Polyd,mn( F) denote the space of all m-tuples (f1(z),·s ,fm(z))∈ F [z] of monic polynomials of the same degree d such that polynomials f1(z),·s ,fm(z) have no common root in F of multiplicity ≥ n. These spaces were defined by Farb and Wolfson in FW as generalizations of spaces first studied by Arnold, Vassiliev, Segal and others in different contexts. In FW they obtained algebraic geometrical and arithmetic results about the topology of these spaces. In this paper we investigate the homotopy type of these spaces for the case F =C. Our results generalize those of FW for F = C and also results of G. Segal Se, V. Vassiliev Va and F.Cohen-R.Cohen-B.Mann-R.Milgram CCMM for m≥ 2 and n≥ 2.