Ruijie
Yang
University of Kansas
p-adic zeta function and Hodge theory
Abstract.
In 1988, Igusa proposed a mysterious conjecture, in the spirit of Weil's conjecture, which predicts certain arithmetic quantities of a given polynomial (poles of the p-adic zeta function) are in fact topological/geometric, i.e. they must induce roots of the Bernstein-Sato polynomial and monodromy eigenvalues on the cohomology of Milnor fibers. This conjecture is widely open, but for hyperplane arrangements, Budur-Mustațǎ-Teitler proposed the n/d-conjecture in 2009 and showed that it will imply Igusa's conjecture in this case. In this talk, I will report a recent work of mine with Dougal Davis, where we prove the n/d-conjecture, finishing the previous work of Saito, Walther, Budur, Yuzvinsky, Veys, Bath, Shi-Zuo and many others. The proof uses Hodge theory in an essential way, especially Schmid's nilpotent orbit theorem and its consequences.