Characteristic Epsilon Cycles of -adic Sheaves on Varieties

Abstract

Let X be a smooth variety over a finite field Fq. Let be a rational prime number invertible in Fq. For an -adic sheaf F on X, we construct a cycle supported on the singular support of F whose coefficients are -adic numbers modulo roots of unity. It is a refinement of the characteristic cycle CC(F), in the sense that it satisfies a Milnor-type formula for local epsilon factors. After establishing fundamental results on the cycles, we prove a product formula of global epsilon factors modulo roots of unity. We also give a generalization of the results to varieties over general perfect fields.