On Lisbon integrals
Abstract
We introduce new complex analytic integral transforms, the Lisbon Integrals, which naturally arise in the study of the affine space of unitary polynomials where and , identified to the th symmetric function of the roots of . We completely determine the -modules (or systems of partial differential equations) the Lisbon Integrals satisfy and prove that they are their unique global solutions. If we specify a holomorphic function in the -variable, our construction induces an integral transform which associates a regular holonomic module quotient of the sub-holonomic module we computed. We illustrate this correspondence in the case of a -parameter family of exponentials with a complex parameter.
Cite
@article{arxiv.1906.09801,
title = {On Lisbon integrals},
author = {Daniel Barlet and Teresa Monteiro Fernandes},
journal= {arXiv preprint arXiv:1906.09801},
year = {2020}
}
Comments
Improved general presentation, results unchanged, added references, corrected typos