Character sheaves on neutrally solvable groups

Abstract: Abstract. Let G be an algebraic group over an algebraically closed field k of characteristic p > 0. In this paper we develop the theory of character sheaves on groups G such that their neutral connected components G • are solvable algebraic groups. For such algebraic groups G (which we call neutrally solvable) we will define the set CS(G) of character sheaves on G as certain special (isomorphism classes of) objects in the category D G (G) of G-equivariant Qcomplexes (where we fix a prime = p) on G. We will des… Show more

“…In their approach, the authors define and study multiplicative local systems on possibly disconnected commutative algebraic groups over finite fields. Our approach follows that of [BD06,Des17] which study character sheaves on unipotent and solvable groups. In particular, we only consider multiplicative local systems on the connected commutative pro-algebraic group L `T .…”

Crossed S-matrices and character sheaves on unipotent groups

“…In their approach, the authors define and study multiplicative local systems on possibly disconnected commutative algebraic groups over finite fields. Our approach follows that of [BD06,Des17] which study character sheaves on unipotent and solvable groups. In particular, we only consider multiplicative local systems on the connected commutative pro-algebraic group L `T .…”

Crossed S-matrices and character sheaves on unipotent groups