The trunk is a single connected component of the restricted flip graph of S^3 triangulations for every n >= 5, contains all triangulations for n=10 and 11, and connects known unflippable spheres after one subdivision.
Spanning trees in random regular graphs
3 Pith papers cite this work. Polarity classification is still indexing.
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For GKM3 actions, restriction maps in equivariant graph cohomology are surjective on abstract graph extensions, giving generator-relation descriptions of cohomology rings for Hamiltonian GKM4 actions.
The free energy of a D-dimensional matrix model on a curved background is the Einstein-Hilbert action with cosmological constant, where the constants are expectation values of graph invariants from ribbon graphs.
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The Trunk of the Restricted Flip Graph of Triangulated S^3
The trunk is a single connected component of the restricted flip graph of S^3 triangulations for every n >= 5, contains all triangulations for n=10 and 11, and connects known unflippable spheres after one subdivision.
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Equivariant cohomology epimorphisms and face ring quotients for Hamiltonian and complexity one GKM$_4$ manifolds
For GKM3 actions, restriction maps in equivariant graph cohomology are surjective on abstract graph extensions, giving generator-relation descriptions of cohomology rings for Hamiltonian GKM4 actions.
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From Matrix Models to Gaussian Molecules and the Einstein-Hilbert Action
The free energy of a D-dimensional matrix model on a curved background is the Einstein-Hilbert action with cosmological constant, where the constants are expectation values of graph invariants from ribbon graphs.