Louis Hainaut
Published 2020-09-24Version 1
In this short note we present a generating function computing the compactly supported Euler characteristic $\chi_c(F(X, n), K^{\boxtimes n})$ of the configuration spaces on a topologically stratified space $X$, with $K$ a constructible complex of sheaves on $X$, and we obtain as a special case a generating function for the Euler characteristic $\chi(F(X, n))$. We also recall how to use existing results to turn our computation of the Euler characteristic into a computation of the equivariant Euler characteristic.
Configuration spaces on a wedge of spheres and Hochschild-Pirashvili homology
Configuration spaces of $\R^n$ by way of exit-path $\infty$-categories
Symmetric products, duality and homological dimension of configuration spaces
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