In this article, we study microscopic properties of a two-dimensional eigenvalue ensemble near a conical singularity arising from insertion of a point charge in the bulk of the support of eigenvalues. In particular, we characterize all rotationally symmetric scaling limits (Mittag-Leffler fields) and obtain universality of them when the underlying potential is algebraic. Applications include a result on the asymptotic distribution of $log|p_n(zeta)|$ where $p_n$ is the characteristic polynomial of an $n$:th order random normal matrix.
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