Symmetries of tropical moduli spaces of curves

Abstract

We compute the automorphism group Aut(g, n) for all g, n ≥ 0 such that 3g - 3 + n > 0, where g, n ⊂ Mg, ntrop is the moduli space of stable n-marked tropical curves of genus g and volume one. In particular, we show that Aut(g) is trivial for g ≥ 2, while Aut(g, n) Sn when n ≥ 1 and (g, n) ≠ (0, 4), (1, 2). The space g, n is a symmetric -complex in the sense of Chan, Galatius, and Payne, and is identified with the dual intersection complex of the boundary divisor in the Deligne-Mumford-Knudsen moduli space Mg, n of stable curves. After the work of Massarenti, who has shown that Aut(Mg) is trivial for g ≥ 2 while Aut(Mg, n) Sn when n ≥ 1 and 2g - 2 + n ≥ 3, our result implies that the tropical moduli space g, n faithfully reflects the symmetries of the algebraic moduli space for general g and n.