Rigid cohomology over Laurent series field I: First definitions and basic properties

Abstract

This is the first in a series of papers in which we construct and study a new p-adic cohomology theory for varieties over Laurent series fields k(\!(t)\!) in characteristic p. This will be a version of rigid cohomology, taking values in the bounded Robba ring EK, and in this paper, we give the basic definitions and constructions. The cohomology theory we define can be viewed as a relative version of Berthelot's rigid cohomology, and is constructed by compactifying k(\!(t)\!)-varieties as schemes over k[\![ t]\!] rather than over k(\!(t)\!). We reprove the foundational results necessary in our new context to show that the theory is well defined and functorial, and we also introduce a category of `twisted' coefficients. In latter papers we will show some basic structural properties of this theory, as well as discussing some arithmetic applications including the weight monodromy conjecture and independence of results for equicharacteristic local fields.