Descents of unipotent representations of finite unitary groups

Abstract: Inspired by the Gan-Gross-Prasad conjecture and the descent problem for classical groups, in this paper we study the descents of unipotent cuspidal representations of orthogonal and symplectic groups over finite fields.Date: August 29, 2019. 2010 Mathematics Subject Classification. Primary 20C33; Secondary 22E50.Let G(V ) be the identity component of the automorphism group of V and G(W ) ⊂ G(V ) the subgroup which acts as identity on W ⊥ . Let π and π ′ be irreducible representations of G(V ) and G(W ) respect… Show more

“…However, we can not get the complete answer in the Gan-Gross-Prasad problem directly in this way. In previous works [LW1,LW3], we have studied the Gan-Gross-Prasad problem of unipotent representations of finite unitary groups and in [LW2,Wang] for finite orthogonal groups and finite symplectic groups. In this paper, we will give a formula to reduce the Gan-Gross-Prasad problem of arbitrary representations to the unipotent representations, which is known in our previous work.…”

“…[GGP1,Theorem 16.1]) (c.f. [LW1,LW2] for details). If π and σ are complex irreducible representations of orthogonal groups, then the above Hom space is called the Bessel model.…”

“…For finite orthogonal groups, in [Wang], we reduce the Gan-Gross-Prasad problem of arbitrary representations to the uniform case. Then we can calculate it by Reeder's formula ( [R,LW1]). Although in general, explicit calculation with Reeder¡¯s formula is still quite involved, we can reduce this problem to a product of certain multiplicities of certain unipotent representations for finite unitary group and finite general linear groups, which has been calculated in [LW1].…”

“…Then we can calculate it by Reeder's formula ( [R,LW1]). Although in general, explicit calculation with Reeder¡¯s formula is still quite involved, we can reduce this problem to a product of certain multiplicities of certain unipotent representations for finite unitary group and finite general linear groups, which has been calculated in [LW1]. To do that, we first give a decomposition of Reeder¡¯s formula:…”

“…In Section 4, we recall the Lusztig correspondence. In Section 5, we recall the Reeder's formula in [R,LW1]. In Section 6, we prove Theorem 1.1 for unitary groups.…”

Lusztig correspondence and the Gan-Gross-Prasad problem

“…However, we can not get the complete answer in the Gan-Gross-Prasad problem directly in this way. In previous works [LW1,LW3], we have studied the Gan-Gross-Prasad problem of unipotent representations of finite unitary groups and in [LW2,Wang] for finite orthogonal groups and finite symplectic groups. In this paper, we will give a formula to reduce the Gan-Gross-Prasad problem of arbitrary representations to the unipotent representations, which is known in our previous work.…”

“…[GGP1,Theorem 16.1]) (c.f. [LW1,LW2] for details). If π and σ are complex irreducible representations of orthogonal groups, then the above Hom space is called the Bessel model.…”

“…For finite orthogonal groups, in [Wang], we reduce the Gan-Gross-Prasad problem of arbitrary representations to the uniform case. Then we can calculate it by Reeder's formula ( [R,LW1]). Although in general, explicit calculation with Reeder¡¯s formula is still quite involved, we can reduce this problem to a product of certain multiplicities of certain unipotent representations for finite unitary group and finite general linear groups, which has been calculated in [LW1].…”

“…Then we can calculate it by Reeder's formula ( [R,LW1]). Although in general, explicit calculation with Reeder¡¯s formula is still quite involved, we can reduce this problem to a product of certain multiplicities of certain unipotent representations for finite unitary group and finite general linear groups, which has been calculated in [LW1]. To do that, we first give a decomposition of Reeder¡¯s formula:…”

“…In Section 4, we recall the Lusztig correspondence. In Section 5, we recall the Reeder's formula in [R,LW1]. In Section 6, we prove Theorem 1.1 for unitary groups.…”

Lusztig correspondence and the Gan-Gross-Prasad problem

On the Gan–Gross–Prasad problem for finite unitary groups

Wavefront sets and descent method for finite unitary groups