Speaker:
Mahya Mehrabdollahei
Date:
Fri, 20/06/2025 - 11:50 - 12:20
I present new evidence for Chinburg’s conjectures in Mahler measure theory. These conjectures predict that for each odd quadratic Dirichlet character $\chi_{-f}$ of conductor $f$, there exists a bivariate polynomial (or a rational function, in the weak form) whose Mahler measure is a rational multiple of $L'(\chi_{-f}, -1)$. Before our work, the conjecture was verified for only 18 conductors.I will highlight results from two collaborations. In joint work with M.J. Bertin, we study a family of polynomials $P_d(x, y)$ with remarkable properties.