Borel (α,β)-multitransforms and Quantum Leray-Hirsch: integral representations of solutions of quantum differential equations for P1-bundles

Abstract

In this paper, we address the integration problem of the isomonodromic system of quantum differential equations (qDEs) associated with the quantum cohomology of P1-bundles on Fano varieties. It is shown that bases of solutions of the qDE of the total space of the P1-bundle can be reconstructed from the datum of bases of solutions of the corresponding qDE associated with the base space. This represents a quantum analog of the classical Leray-Hirsch theorem in the context of the isomonodromic approach to quantum cohomology. The reconstruction procedure of the solutions can be performed in terms of some integral transforms, introduced in arXiv:2005.08262, called Borel (α,β)-multitransf\!orms. We emphasize the emergence, in the explicit integral formulas, of an interesting sequence of special functions (closely related to iterated partial derivatives of the B\"ohmer-Tricomi incomplete Gamma function) as integral kernels. Remarkably, these integral kernels have a universal feature, being independent of the specifically chosen P1-bundle. When applied to projective bundles on products of projective spaces, our results give Mellin-Barnes integral representations of solutions of qDEs. As an example, we show how to integrate the qDE of blow-up of P2 at one point via Borel multitransforms of solutions of the qDE of P1.