Extensions and biextensions of locally constant group schemes, tori and abelian schemes

Abstract

Let S be a scheme. We compute explicitly the group of homomorphisms, the S-sheaf of homomorphisms, the group of extensions, and the S-sheaf of extensions involving locally constant S-group schemes, abelian S-schemes, and S-tori. Using the obtained results, we study the categories of biextensions involving these geometrical objets. In particular, we prove that if Gi (for i=1,2,3) is an extension of an abelian S-scheme Ai by an S-torus Ti, the category of biextensions of (G1,G2) by G3 is equivalent to the category of biextensions of the underlying abelian S-schemes (A1,A2) by the underlying S-torus T3.