Manin's Conjecture for Equivariant compactifications of forms of Gan

Abstract

We prove the Batyrev-Manin conjecture for smooth equivariant compactifications of forms of Gan over a global function field F, assuming some conditions on the boundary divisor. To verify that the leading constant agrees with Peyre's predicition we also show that a commutative unipotent group admitting a smooth equivariant compactification satisfies the Hasse principle for algebraic groups and weak approximation. We study in detail the case of Pp-1, where p is the characteristic of F, viewed as a compactification of appropriate F-wound groups to illustrate new phenomena appearing in the function field setting.