Wall-Crossing of TBA Equations and WKB Periods for the Higher Order ODE
发布时间:2022年04月21日
浏览次数:4172
发布者: Wenqiong Li
主讲人: 束红非(北京雁栖湖应用数学研究院)
活动时间: 从 2022-04-26 14:00 到 15:00
场地: 北京国际数学研究中心,全斋全29教室
In this talk, we study the WKB periods for the higher order ordinary differential equation (ODE) with polynomial potential, which is obtained by the Nekrasov-Shatashvili limit of ($A_2,A_N$) Argyres-Douglas theory in the Omega background. In the minimal chamber of the moduli space, we derive the Y-system and the thermodynamic Bethe ansatz (TBA) equations by using the ODE/IM correspondence. The exact WKB periods are identified with the Y-functions. Varying the moduli parameters of the potential, the wall-crossing of the TBA equations occurs. We study the process of the wall-crossing from the minimal chamber to the maximal chamber for $(A_2,A_2)$ and $(A_2,A_3)$. When the potential is a monomial type, we show the TBA equations obtained from the ($A_2, A_2$) and ($A_2, A_3$)-type ODE lead to the $D_4$ and $E_6$-type TBA equations respectively. This talk is based on the joint work with Katsushi Ito and Takayasu Kondo arXiv:2111.11047 [hep-th].