Fundamental groups of moduli spaces of real weighted stable curves
Abstract
The ordinary and Sn-equivariant fundamental groups of the moduli space M0,n+1(R) of real (n+1)-marked stable curves of genus 0 are known as cactus groups Jn and have applications both in geometry and the representation theory of Lie algebras. In this paper, we compute the ordinary and Sn-equivariant fundamental groups of the Hassett space of weighted real stable curves M0,A(R) with Sn-symmetric weight vector A = (1/a, …, 1/a, 1), which we call weighted cactus groups Jna. We show that Jna is obtained from the usual cactus presentation by introducing braid relations, which successively simplify the group from Jn to Sn Z/2Z as a increases. Our proof is by decomposing M0,A(R) as a polytopal complex, generalizing a similar known decomposition for M0,n+1(R). In the unweighted case, these cells are known to be cubes and are `dual' to the usual decomposition into associahedra (by the combinatorial type of the stable curve). For M0,A(R), our decomposition instead consists of products of permutahedra. The cells of the decomposition are indexed by weighted stable trees, but `dually' to the usual indexing.
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