The following pages link to A new class of Gelfand pairs (Q1336201):
Displaying 17 items.
- Gelfand pairs \((\text{Sp}_{4n}(F),\text{Sp}_{2n}(E))\) (Q710482) (← links)
- Generalized Harish-Chandra descent, Gelfand pairs, and an Archimedean analog of Jacquet-Rallis's theorem. With an appendix by the authors and Eitan Sayag. (Q731746) (← links)
- Invariant distributions on a non-isotropic pseudo-Riemannian symmetric space of rank one (Q855604) (← links)
- \((\text O(V\oplus F),\text O(V))\) is a Gelfand pair for any quadratic space \(V\) over a local field \(F\) (Q1006366) (← links)
- \((\mathrm{GL}(n+1,\mathbb R),\mathrm{GL}(n,\mathbb R))\) is a generalized Gelfand pair (Q1033812) (← links)
- A remark on Gelfand pairs of finite groups of Lie type (Q1270360) (← links)
- Cuspidal representations associated to \((\text{GL}(n),O(n))\) over finite fields and \(p\)-adic fields (Q1283665) (← links)
- Supercuspidal Gelfand pairs (Q1394922) (← links)
- On a class of generalized Gelfand pairs (Q1819315) (← links)
- A partial analog of the integrability theorem for distributions on \(p\)-adic spaces and applications (Q1955868) (← links)
- Matrix valued classical pairs related to compact Gelfand pairs of rank one (Q2339233) (← links)
- Some regular symmetric pairs (Q3574793) (← links)
- (Q4984906) (← links)
- A new type of GUP with commuting coordinates (Q5220156) (← links)
- Strong Gelfand pairs of SL(2,p) (Q6104123) (← links)
- Bounds on multiplicities of symmetric pairs of finite groups (Q6603916) (← links)
- A construction of solutions of an integrable deformation of a commutative Lie algebra of skew Hermitian \(\mathbb{Z} \times \mathbb{Z} \)-matrices (Q6663159) (← links)
