Degenerations and multiplicity-free formulas for products of and ω classes on M0,n

Abstract

We consider products of classes and products of ω classes on M0,n+3. For each product, we construct a flat family of subschemes of M0,n+3 whose general fiber is a complete intersection representing the product, and whose special fiber is a generically reduced union of boundary strata. Our construction is built up inductively as a sequence of one-parameter degenerations, using an explicit parametrized collection of hyperplane sections. Combinatorially, our construction expresses each product as a positive, multiplicity-free sum of classes of boundary strata. These are given by a combinatorial algorithm on trees we call 'slide labeling'. As a corollary, we obtain a combinatorial formula for the classes in terms of boundary strata. For degree-n products of ω classes, the special fiber is a finite reduced union of (boundary) points, and its cardinality is one of the multidegrees of the corresponding embedding n: M0,n+3 P1× ·s × Pn. In the case of the product ω1·s ωn, these points exhibit a connection to permutation pattern avoidance. Finally, we show that in certain cases, a prior interpretation of the multidegrees via tournaments can also be obtained by degenerations.