On the supersingular reduction of K3 surfaces with complex multiplication

開催日時
2017/12/22 金 10:30 - 12:00
場所
3号館152号室
講演者
伊藤和広
講演者所属
京都大学
概要

As an analogue of the theory of complex multiplication (CM) for abelian varieties, Rizov proved the main theorem of CM for K3 surfaces. In this talk, we will study the good reduction modulo p of K3 surfaces with CM. We will determine when the good reduction is supersingular. Moreover, for almost all p, we will calculate its Artin invariant. The proof relies on the main theorem of CM for K3 surfaces and the integral p-adic Hodge theory recently established by Bhatt, Morrow, and Scholze. Our results generalize Shimada's results on complex projective K3 surfaces with Picard number 20.