The only toric 2-Fano manifold with m(X)=2 is the projective plane P^2.
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5 Pith papers cite this work. Polarity classification is still indexing.
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Betti numbers of edge rings of split graphs are fully determined and depend only on the multiset of neighbor counts from the complete part to the stable part.
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.
SGR-R possesses a canonical set of free generators via shifted twists, endowing it with a Grothendieck structure and enough injectives and projectives, plus a semi-graded Baer's criterion analogue.
Cochordal zero-divisor graphs of chain rings admit refined Betti formulas yielding 2-linear resolutions for the studied quotient rings.
citing papers explorer
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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.
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Betti numbers of split graphs
Betti numbers of edge rings of split graphs are fully determined and depend only on the multiset of neighbor counts from the complete part to the stable part.
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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.
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On the category of semi-graded modules
SGR-R possesses a canonical set of free generators via shifted twists, endowing it with a Grothendieck structure and enough injectives and projectives, plus a semi-graded Baer's criterion analogue.
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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.