Catalan numbers, parking functions, permutahedra and noncommutative Hilbert schemes
Abstract
We find an explicit Sn-equivariant bijection between the integral points in a certain zonotope in Rn, combinatorially equivalent to the permutahedron, and the set of m-parking functions of length n. This bijection restricts to a bijection between the regular Sn-orbits and (m,n)-Dyck paths, the number of which is given by the Fuss-Catalan number An(m,1). Our motivation came from studying tilting bundles on noncommutative Hilbert schemes. As a side result we use these tilting bundles to construct a semi-orthogonal decomposition of the derived category of noncommutative Hilbert schemes.
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