Hilbert schemes of points on surfaces and multiple q-zeta values
Abstract
For a line bundle L on a smooth projective surface X and nonnegative integers k1, …, kN, Okounkov Oko introduced the reduced generating series chk1L ·s chkNL ' for the intersection numbers among the Chern characters of the tautological bundles over the Hilbert schemes of points on X and the total Chern classes of the tangent bundles of these Hilbert schemes, and conjectured that they are multiple q-zeta values of weight at most Σi=1N (ki + 2). The second-named author further conjectured in Qin2 that these reduced generating series are quasi-modular forms if the canonical divisor of X is numerically trivial. In this paper, we verify these two conjectures for ch2L '. The main approaches are to apply the procedure laid out in QY and to establish various identities for multiple q-zeta values and quasi-modular forms.
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