The only toric 2-Fano manifold with m(X)=2 is the projective plane P^2.
Combinatorial index formulas for Lie algebras of seaweed type
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
years
2026 3verdicts
UNVERDICTED 3representative citing papers
Indecomposable seaweed subalgebras of complex simple Lie algebras have vanishing adjoint cohomology and are absolutely rigid; decomposable ones have cohomology determined solely by their center via the Coll-Gerstenhaber decomposition.
Cochordal zero-divisor graphs of chain rings admit refined Betti formulas yielding 2-linear resolutions for the studied quotient rings.
citing papers explorer
-
On the classification of toric $2$-Fano manifolds: generic $\mathbb{P}^2$-bundles
The only toric 2-Fano manifold with m(X)=2 is the projective plane P^2.
-
Rigidity and Cohomology of Seaweed Lie Algebras
Indecomposable seaweed subalgebras of complex simple Lie algebras have vanishing adjoint cohomology and are absolutely rigid; decomposable ones have cohomology determined solely by their center via the Coll-Gerstenhaber decomposition.
-
Betti numbers for cochordal zero-divisor graphs of commutative rings
Cochordal zero-divisor graphs of chain rings admit refined Betti formulas yielding 2-linear resolutions for the studied quotient rings.