Motivic and analytic nearby fibers at infinity and bifurcation sets

Abstract

In this paper we use motivic integration and non-archimedean analytic geometry to study the singularities at infinity of the fibers of a polynomial map f Ad C A1 C. We show that the motive Sf,a∞ of the motivic nearby cycles at infinity of f for a value a is a motivic generalization of the classical invariant λf(a), an integer that measures a lack of equisingularity at infinity in the fiber f-1(a). We then introduce a non-archimedean analytic nearby fiber at infinity Ff,a∞ whose motivic volume recovers the motive Sf,a∞. With each of Sf,a∞ and Ff,a∞ can be naturally associated a bifurcation set; we show that the first one always contains the second one, and that both contain the classical topological bifurcation set of f whenever f has isolated singularities at infinity.