On the formal arc space of a reductive monoid

Abstract

Let X be a scheme of finite type over a finite field k, and let L X denote its arc space; in particular, L X(k) = X(k[[t]]). Using the theory of Grinberg, Kazhdan, and Drinfeld on the finite-dimensionality of singularities of L X in the neighborhood of non-degenerate arcs, we show that a canonical "basic function" can be defined on the non-degenerate locus of L X(k), which corresponds to the trace of Frobenius on the stalks of the intersection complex of any finite-dimensional model. We then proceed to compute this function when X is an affine toric variety or an "L-monoid". Our computation confirms the expectation that the basic function is a generating function for a local unramified L-function; in particular, in the case of an L-monoid we prove a conjecture formulated by the second-named author.