In 2024, Shock constructed several KSBA compactifications of the moduli space of cubic surfaces. More precisely, he considered pairs consisting of a cubic surface and a boundary divisor given by the sum of the 27 lines, all weighted by the same number in the interval (1/9,1]. For weights close to 1/9, one obtains the Naruki compactification, resulting from Gallardo—Kerr—Schaffler. For weights close to 1, the compactification was done by Hacking—Keel—Tevelv. For weights in-between, Schock provided a finite wall-and-chamber decomposition of the weight domain (1/9, 1], and described the weighted stable pairs parameterized by the moduli spaces in each chamber. In this preparatory talk, I will introduce the preliminary material regarding KSBA compactifications and this work done by Schock.
Moduli of Weighted Stable Marked Cubic Surfaces
Thu, Feb. 27 2:30pm (MATH 3…
Functional Analysis
James Woodcock (CU Boulder) The Dirac-dual Dirac method
Thu, Feb. 27 3:35pm (MATH 3…
Probability
Mike Cranston (UCI)
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The Riemann zeta function evaluated at a parameter s>1 induces a nice probability distribution on the positive integers. Sampling positive integers using this distribution has many nice properties and leads to the same results as sampling using the uniform distribution on 1,2,...,N and letting N tend to infinity. There are many zeta functions in other contexts such as the Dedekind zeta function and sampling ideals using this zeta function exhibits similar nice properties. In this talk we will discuss joint work on this subject with Peltzer, Mountford and Hsu.
Sampling numbers and algebraic objects using zeta functions
Moduli of Weighted Stable Marked Cubic Surfaces