Web Calculus and Tilting Modules in Type C2

Abstract

Using Kuperberg's B2/C2 webs, and following Elias and Libedinsky, we describe a "light leaves" algorithm to construct a basis of morphisms between arbitrary tensor products of fundamental representations for so5 sp4 (and the associated quantum group). Our argument has very little dependence on the base field. As a result, we prove that when [2]q 0, the Karoubi envelope of the C2 web category is equivalent to the category of tilting modules for the divided powers quantum group UqZ(sp4).