The following pages link to Yongle Jiang (Q290590):
Displaying 20 items.
- A remark on \(\mathbb{T}\)-valued cohomology groups of algebraic group actions (Q290591) (← links)
- Maximal subgroups and von Neumann subalgebras with the Haagerup property (Q2076055) (← links)
- On invariant von Neumann subalgebras rigidity property (Q2112766) (← links)
- Singular subgroups in \(\widetilde{A}_2\)-groups and their von Neumann algebras (Q2220165) (← links)
- Maximal von Neumann subalgebras arising from maximal subgroups (Q2239333) (← links)
- Continuous cocycle superrigidity for shifts and groups with one end (Q2402838) (← links)
- Continuous orbit equivalence rigidity for left-right wreath product actions (Q2700660) (← links)
- Continuous cocycle superrigidity for coinduced actions and relative ends (Q4555827) (← links)
- Divergence, undistortion and Hölder continuous cocycle superrigidity for full shifts (Q5000379) (← links)
- Maximal Haagerup subalgebras in L(Z2⋊SL2(Z)) (Q5044249) (← links)
- Cohomology groups invariant under continuous orbit equivalence (Q5862822) (← links)
- On continuous orbit equivalence rigidity for virtually cyclic group actions (Q6039658) (← links)
- Divergence, Undistortion and H\"older Continuous Cocycle Superrigidity for Full Shifts (Q6291932) (← links)
- Maximal Haagerup subalgebras in $L(\mathbb{Z}^2\rtimes SL_2(\mathbb{Z}))$ (Q6335936) (← links)
- Continuous orbit equivalence rigidity for left-right wreath product actions (Q6389218) (← links)
- On invariant von Neumann subalgebras rigidity property (Q6399794) (← links)
- An example of an infinite amenable group with the ISR property (Q6514974) (← links)
- An example of an infinite amenable group with the ISR property (Q6536636) (← links)
- Splitting of Tensor Products and Intermediate Factor Theorem: Continuous Version (Q6740670) (← links)
- A character approach to the ISR property (Q6749452) (← links)