On Homeomorphism Type of Symmetric Products of Compact Riemann Surfaces with Punctures

Abstract

Let M2g,k and M2g',k' be compact Riemann surfaces with punctures (g,g' 0 - genuses, k,k' 1 - number of punctures). For any Hausdorff space X the quotient space SymnX := Xn/Sn is the n-th symmetric product of X, \ n 2. It is well known, that Symn M2g,k is a smooth quasi-projective variety. Open manifolds Symn M2g,k and Symn M2g',k' are homotopy equivalent iff \ 2g+k=2g'+k'. Blagojevi\'c-Gruji\'c-Zivaljevi\'c Conjecture (2003). Fix any n 2, and two pairs (g,k) and (g',k') with the condition 2g+k=2g'+k'. If g g', then open manifolds Symn M2g,k and Symn M2g',k' are not continuously homeomorphic. The conjecture was proved in 2003 in the paper by P.Blagojevi\'c, V.Gruji\'c and R.Zivaljevi\'c for the case max(g,g') n2 (this implies the case n=2). As far as the author knows, up to this moment there were no results if max(g,g') < n2. The aim of this paper is to prove the conjecture in full generality.