報(bào) 告 人：Brian Hall 教授  

報(bào)告題目：Heat flow, random matrices, and random polynomials

報(bào)告時(shí)間：2023年10月10日（周二）上午9點(diǎn)-10點(diǎn)

報(bào)告地點(diǎn)：Zoom會(huì)議號(hào): 81786229179 （無密碼）

主辦單位：數(shù)學(xué)研究院、數(shù)學(xué)與統(tǒng)計(jì)學(xué)院、科學(xué)技術(shù)研究院

報(bào)告人簡(jiǎn)介：

       Brian Hall是美國(guó)圣母大學(xué)數(shù)學(xué)系教授，主要研究興趣為數(shù)學(xué)物理，包括Segal-Bargmann transform的推廣以及與2維Yang-Mills理論有關(guān)的問題。近幾年來主要關(guān)注隨機(jī)矩陣?yán)碚撘约白杂筛怕收摗?/p>

報(bào)告摘要：

       It is an old result of Polya and Benz that applying the backward heat flow to a polynomial with all real zeros gives another polynomial with all real zeros. Much more recently, the limiting behavior of the real zeros as the degree goes to infinity has been worked out, with a surprising connection to random matrix theory. The situation is more complicated if we use the forward heat flow—in which case, the zeros will not remain real—or if we apply the heat flow to a polynomial with complex roots. Nevertheless, there is still a conjectural connection to random matrix theory. Consider, for example, the circular law in random matrix theory: If a random matrix Z has i.i.d. entries, its eigenvalues will be asymptotically uniform over a disk. The heat flow then conjecturally changes the circular law into the elliptical law: Applying the heat flow to the characteristic polynomial of Z should give a new polynomial whose zeros are asymptotically uniform over an ellipse. While the random matrix case remains a conjecture, we have rigorous results for random polynomials with independent coefficients. This is joint work with Ching Wei Ho, Jonas Jalowy, and Zakhar Kabluchko. The talk will be self-contained and have lots of pictures and animations.