Taking limits in Go-diagrams - Kartik Singh
Title: Taking limits in Go-diagrams
Title: Taking limits in Go-diagrams
Title: Rectangle covers and bounding the extension complexity of the correlation polytope
Title: Steiner Cut Dominants
Speaker: | Volker Kaibel |
Affiliation: | Otto von Guericke University Magdeburg |
Location: | MC 5501 or contact Eva Lee for Zoom link |
Abstract: For a subset of terminals T of the nodes of a graph G a cut in G is called a T-Steiner cut if it subdivides T into two non-empty sets. The Steiner cut dominant of G is the Minkowski sum of the convex hull of the incidence vectors of T-Steiner cuts in G and the nonnegative orthant.
Title : A Closure Lemma for tough graphs and Hamiltonian degree conditions
Speaker: | Cléophée Robin |
Institution: | Wilfrid Laurier University |
Location: | MC 5479 |
Abstract: A graph G is hamiltonian if it exists a cycle in G containing all vertices of G exactly once. A graph G is t-tough if, ,for all subsets of vertices S, the number of connected components in G − S is at most |S| / t.
Title: Quasisymmetric varieties, excedances, and bases for the Temperley--Lieb algebra
Speaker: | Lucas Gagnon |
Affiliation: | York University |
Location: | MC 6029 please contact Olya Mandelshtam for Zoom link |
Abstract: This talk is about finding a quasisymmetric variety (QSV): a subset of permutations which (i) is a basis for the Temperley--Lieb algebra TL_n(2), and (ii) has a vanishing ideal (as points in n-space) that behaves similarly to the ideal generated by quasisymmetric polynomials. While this problem is primarily motivated by classical (co-)invariant theory and generalizations thereof, the course of our investigation uncovered a number of remarkable combinatorial properties related to our QSV, and I will survey these as well.
Title: Subgraph Polytopes and Independence Polytopes of Count Matroids
Speaker: | David Aleman |
Affiliation: | University of Waterloo |
Location: | MC 6029 |
Abstract: Given a graph G=(V,E), the subgraph polytope of G is defined as the convex hull of the characteristic vector of the pairs (S,F) such that S is a non-empty subset of vertices and F is a set of edges contained in the induced subgraph G[S].
Title: On the complexity of quantum partition functions
Speaker: | David Gosset |
Affiliation: | University of Waterloo |
Location: | MC 5501 or contact Eva Lee for Zoom link |
Abstract: Quantum complexity theory has been intertwined with the study of quantum many-body systems ever since Kitaev's insight that computing their ground energies is an intractable quantum constraint satisfaction problem that is complete for a quantum generalization of NP.
Title: Inverse eigenvalue problem of a graph
Speaker: | Jephian C.-H. Lin |
Affiliation: | National Sun Yat-sen University |
Location: | Please contact Sabrina Lato for Zoom link |
Abstract: We often encounter matrices whose pattern (zero-nonzero, or sign) is known while the precise value of each entry is not clear. Thus, a natural question is what we can say about the spectral property of matrices of a given pattern. When the matrix is real and symmetric, one may use a simple graph to describe its off-diagonal nonzero support.
Title: Distance-Regular and Distance-Biregular Graphs
Speaker: | Sabrina Lato |
Affiliation: | University of Waterloo |
Location: | MC |
Abstract: For a given diameter d and valency k, what is the maximum number of vertices a k-regular graph of diameter d can have, and what graphs meet that bound? Although there is a straightforward counting argument to bound the number of vertices using the structural information, the problem of characterizing the graphs that meet the bound turns out to be a problem in algebraic graph theory, and helps gives rise to the notion of distance-regular graphs.
Title: Arrangements of Pseudolines, Tropical Grassmannians, and Generalized Scattering Amplitudes
Speaker: | Freddy Cachazo |
Affiliation: | Perimeter Institute |
Room: | MC 6029 |
Abstract: For each arrangement of (pseudo)lines on the projective plane, it is possible to construct a differential form that captures its combinatorial structure. The forms have simple poles whenever triangles shrink to a point in the arrangement, and share the same residue when two arrangements are connected via a "triangle flip".