• Partial orders on standard Young tableaux( Gizem Karaali, Pomona)

    On Zoom

    Young diagrams are all possible arrangements of n boxes into rows and columns, with the number of boxes in each subsequent row weakly decreasing. For a partition λ of n, a standard Young tableau S of shape λ is built from the Young diagram of shape λ by filling it with the numbers 1 to […]

  • Biquandle arrow weights (Sam Nelson, CMC)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    Many knot invariants are defined from features of knot projections such as arcs or crossings. Gauss diagrams provide an alternative combinatorial scheme for representing knots. In this talk we will […]

  • On zeros of multilinear polynomials (Max Forst, CGU)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    Consider rational polynomials in multiple variables that are linear with respect to some of the variables. In this talk we discuss the problem of finding a zero of such polynomials […]

  • Robust properties of graphs (Asaf Ferber, UC Irvine)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    In this talk we will consider some notions of `robustness' of graph/hypergraph properties. We will survey some existing results and will try to emphasize the following new result (joint with Adva Mond and Kaarel Haenni): The binomial random digraph $D_{n,p}$ typically contains the minimum between the minimum out- and in-degrees many edge-disjoint Hamilton cycles, given […]

  • The Smith normal form of a polynomial of a random integral matrix (Gilyoung Cheong, UC Irvine)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    Given a prime p, let P(t) be a non-constant monic polynomial in t over the ring of p-adic integers. Let X(n) be an n x n uniformly random (0,1)-matrix over the same ring. We compute the asymptotic distribution of the cokernel of P(X(n)) as n goes to infinity. When P(t) is square-free modulo p, this […]

  • Noise stability of ranked choice voting (Steven Heilman, USC)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    Given votes for candidates, what is the best way to determine the winner of the election, if some of the votes have been corrupted or miscounted?  As we saw in Florida in 2000, where a difference of 537 votes determined the president of the United States, the electoral college system does not seem to be […]

  • Discrete Calculus through generating functions (Wai Yan Pong, Cal State Dominguez Hills)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    Discrete Calculus studies discrete structures, such as sequences and graphs, using techniques similar to those used in Calculus for continuous functions. The basic idea of generating functions is to associate a function with a sequence so that the coefficients of the power series expansion of the function represent the terms of the sequence. They provide […]

  • Bias in cubic Gauss sums: Patterson’s conjecture (Alex Dunn, CalTech)

    Davidson Lecture Hall, CMC 340 E 9th St, Claremont, CA, United States

    We prove, in this joint work with Maksym Radziwill, a 1978 conjecture of S. Patterson (conditional on the Generalized Riemann Hypothesis) concerning the bias of cubic Gauss sums. This explains […]