论文信息 - Rationality of capped descendent vertex in $K$-theory

Rationality of capped descendent vertex in $K$-theory

In this paper we analyze the fundamental solution of the \textit{quantum difference equation} (qde) for the moduli space of instantons on two-dimensional projective space. The qde is a $K$-theoretic generalization of the quantum differential equation in quantum cohomology. As in the quantum cohomology case, the fundamental solution of qde provides the capping operator in $K$-theory (the rubber part of the capped vertex). We study the dependence of the capping operator on the equivariant parameters $a_i$ of the torus acting on the instanton moduli space by changing the framing. We prove that the capping operator factorizes at $a_i\to 0$. The rationality of the $K$-theoretic 1-leg capped descendent vertex follows from factorization of the capping operator as a simple corollary.

A. Smirnov

[1] Arun Ram. Quantization of Lie groups and Lie algebras , 2016 .

[2] A. Okounkov. Lectures on K-theoretic computations in enumerative geometry , 2015, 1512.07363.

[3] Andrei Neguct. Quantum Algebras and Cyclic Quiver Varieties , 2015, 1504.06525.

[4] Andrei Neguț,et al. Moduli of ags of sheaves and their K-theory , 2012, 1209.4242.

[5] R. Pandharipande,et al. Descendents on local curves: rationality , 2010, Compositio Mathematica.

[6] R. Pandharipande,et al. Descendent theory for stable pairs on toric 3-folds , 2010, 1011.4054.

[7] A. Okounkov,et al. The quantum differential equation of the Hilbert scheme of points in the plane , 2009, 0906.3587.

[8] A. Okounkov,et al. Gromov-Witten/Donaldson-Thomas correspondence for toric 3-folds , 2008, 0809.3976.

[9] A. Okounkov,et al. Quantum cohomology of the Hilbert scheme of points in the plane , 2004, math/0411210.

[10] Mark Haiman,et al. Notes on Macdonald Polynomials and the Geometry of Hilbert Schemes , 2002 .

[11] Leon A. Takhtajan,et al. Quantization of Lie Groups and Lie Algebras , 1987 .