Add to ORKGIn this paper, using the formula for the integrals of the ψ-classes over the double ramification cycles found by S. Shadrin, L. Spitz, D. Zvonkine and the author, we derive a new explicit formula for the n-point function of the intersection numbers on the moduli space of curves
We give a description of the formal neighborhoods of the components of the boundary divisor in the D...
We construct a derived pushforward of the r-th root of the universal line bundle over the Picard sta...
Abstract. This survey grew out of notes accompanying a cy-cle of lectures at the workshop Modern Tre...
International audienceWe identify the formulas of Buryak and Okounkov for the $n$-point functions of...
AbstractWe give a new proof of Faberʼs intersection number conjecture concerning the top intersectio...
© The Author(s) 2020. We identify the formulas of Buryak and Okounkov for the n-point functions of t...
Curves of genus g which admit a map to P1 with specified ramification profile μ over 0∈P1 and ν over...
Let $X$ be a nonsingular complex projective algebraic variety, and let${\overline{\mathcal{M}}_{g,n,...
The double ramification cycle satisfies a basic multiplicative relation DRCa⋅DRCb=DRCa⋅DRCa+b over t...
A double ramification cycle, or DR-cycle, is a codimension $g$ cycle in the moduli space $\overline{...
We prove that a formula for the `pluricanonical' double ramification cycle proposed by Janda, Pandha...
We explain how logarithmic structures select natural principal components in an intersection of sche...
Abstract. We present certain new properties about the intersection numbers on moduli spaces of curve...
Abstract. We describe double Hurwitz numbers as intersection numbers on the moduli space of curves M...
Using several numerical invariants, we study a partition of the space of line arrangements in the co...
We give a description of the formal neighborhoods of the components of the boundary divisor in the D...
We construct a derived pushforward of the r-th root of the universal line bundle over the Picard sta...
Abstract. This survey grew out of notes accompanying a cy-cle of lectures at the workshop Modern Tre...
International audienceWe identify the formulas of Buryak and Okounkov for the $n$-point functions of...
AbstractWe give a new proof of Faberʼs intersection number conjecture concerning the top intersectio...
© The Author(s) 2020. We identify the formulas of Buryak and Okounkov for the n-point functions of t...
Curves of genus g which admit a map to P1 with specified ramification profile μ over 0∈P1 and ν over...
Let $X$ be a nonsingular complex projective algebraic variety, and let${\overline{\mathcal{M}}_{g,n,...
The double ramification cycle satisfies a basic multiplicative relation DRCa⋅DRCb=DRCa⋅DRCa+b over t...
A double ramification cycle, or DR-cycle, is a codimension $g$ cycle in the moduli space $\overline{...
We prove that a formula for the `pluricanonical' double ramification cycle proposed by Janda, Pandha...
We explain how logarithmic structures select natural principal components in an intersection of sche...
Abstract. We present certain new properties about the intersection numbers on moduli spaces of curve...
Abstract. We describe double Hurwitz numbers as intersection numbers on the moduli space of curves M...
Using several numerical invariants, we study a partition of the space of line arrangements in the co...
We give a description of the formal neighborhoods of the components of the boundary divisor in the D...
We construct a derived pushforward of the r-th root of the universal line bundle over the Picard sta...
Abstract. This survey grew out of notes accompanying a cy-cle of lectures at the workshop Modern Tre...