Generalized nearby cycles via relative and logarithmic D-modules

Abstract

For a regular map F from a complex smooth affine variety X to Ar C, we construct generalized nearby-cycle modules of a regular holonomic D-module M along log strata with the log structure induced by the graph of F, whose relative supports are infinite unions of translated linear subvarieties of Cr determined by the zero loci of Bernstein-Sato ideals along monoid ideals. For a fixed log stratum, the nearby-cycle module corresponds to the Sabbah specialization complex of DR( M) under the relative regular Riemann-Hilbert correspondence of Fiorot-Fernandes-Sabbah, which generalizes the classical comparison theorem of Kashiwara-Malgrange for Deligne's nearby cycles. As an application, when M= OX, we give a topological interpretation of the zero loci of Bernstein-Sato ideals of F along monoid ideals under the exponential map, which answers a question of Budur-Shi-Zuo.