Monday, June 2, 2025
11:00 AM-1:00 PM
Virtual
Abstract:
We derive an explicit combinatorial formula for the double ramification cycle of type (1,-1) on the moduli space of stable genus g curves with two marked points. The formula is given as a sum over certain strata on the moduli space of curves, indexed by so-called extremal trees. We present two different proofs of the formula: one using a local equivariant method and the other using blow up and piecewise polynomial techniques. From this main result we obtain similarly-formatted variant formulas, as well as tautological relations in higher codimension. We also study the compact type double ramification cycle of type (2,-2), establish its connection with hyperelliptic admissible cover loci, and give some examples. These works link Gromov-Witten type cycles with admissible cover cycles on the moduli space of curves.
We derive an explicit combinatorial formula for the double ramification cycle of type (1,-1) on the moduli space of stable genus g curves with two marked points. The formula is given as a sum over certain strata on the moduli space of curves, indexed by so-called extremal trees. We present two different proofs of the formula: one using a local equivariant method and the other using blow up and piecewise polynomial techniques. From this main result we obtain similarly-formatted variant formulas, as well as tautological relations in higher codimension. We also study the compact type double ramification cycle of type (2,-2), establish its connection with hyperelliptic admissible cover loci, and give some examples. These works link Gromov-Witten type cycles with admissible cover cycles on the moduli space of curves.
| Building: | East Hall |
|---|---|
| Event Link: | |
| Event Type: | Presentation |
| Tags: | Dissertation, Graduate, Graduate Students, Mathematics |
| Source: | Happening @ Michigan from Dissertation Defense - Department of Mathematics, Department of Mathematics |
