On Integral Cohomology Ring of Symmetric Products

Abstract

We prove that the integral cohomology ring modulo torsion H*(Symn X;Z)/Tor for the symmetric product of a connected CW-complex X of finite homology type is a functor of H*(X;Z)/Tor (see Theorem 1). Moreover, we give an explicit description of this functor. We also consider the important particular case when X is a compact Riemann surface M2g of genus g. There is a famous theorem of Macdonald of 1962, which gives an explicit description of the integral cohomology ring H*(Symn M2g;Z). The analysis of the original proof by Macdonald shows that it contains three gaps. All these gaps were filled in by Seroul in 1972, and, therefore, he obtained a complete proof of Macdonald's theorem. Nevertheless, in the unstable case 2 n 2g-2 Macdonald's theorem has a subsection, that needs a slight correction even over Q (see Theorem 2).