The following pages link to Nilpotence varieties (Q2662014):
Displaying 31 items.
- Almost nilpotent varieties with non-integer exponents do exist (Q334296) (← links)
- A non-affine nilvariety (Q1891985) (← links)
- An almost nilpotent variety of exponent 2 (Q2017115) (← links)
- Superspace formulation of exotic supergravities in six dimensions (Q2028257) (← links)
- Algebras, traces, and boundary correlators in \(\mathcal{N} = 4\) SYM (Q2085231) (← links)
- A taxonomy of twists of supersymmetric Yang-Mills theory (Q2167567) (← links)
- Perspectives on the pure spinor superfield formalism (Q2169854) (← links)
- Mirror symmetry and line operators (Q2188598) (← links)
- Exponentiation of commuting nilpotent varieties (Q2254787) (← links)
- Multiplicative Hitchin systems and supersymmetric gauge theory (Q2327351) (← links)
- Topological twists of supersymmetric algebras of observables (Q2330521) (← links)
- Maximally twisted eleven-dimensional supergravity (Q2684491) (← links)
- (Q3697154) (← links)
- (Q3824678) (← links)
- (Q4032126) (← links)
- Largeur et nilpotence (Q4487359) (← links)
- (Q4857993) (← links)
- Some open questions in quiver gauge theory (Q5080951) (← links)
- Nilpotent varieties and metabelian varieties (Q5103912) (← links)
- Almost nilpotent varieties with non-integer exponents do exist (Q5239619) (← links)
- Vaisman nilmanifolds (Q5371062) (← links)
- Holomorphic field theories and Calabi–Yau algebras (Q5384507) (← links)
- Vertex operator algebras and topologically twisted Chern-Simons-matter theories (Q6050322) (← links)
- The derived pure spinor formalism as an equivalence of categories (Q6110577) (← links)
- Twisted eleven-dimensional supergravity (Q6171974) (← links)
- Twisted formalism for 3d \(\mathcal{N}=4\) theories (Q6189665) (← links)
- Canonical supermultiplets and their Koszul duals (Q6536647) (← links)
- Semi-chiral operators in 4d \(\mathcal{N} = 1\) gauge theories (Q6568250) (← links)
- A holomorphic approach to fivebranes (Q6609119) (← links)
- Boundary vertex algebras for 3d \(\mathcal{N} = 4\) rank-0 SCFTs (Q6609684) (← links)
- Six-dimensional supermultiplets from bundles on projective spaces (Q6662838) (← links)
