Winding number statistics for chiral random matrices: Universal correlations and statistical moments in the unitary case
Journal article, 2025
The winding number is the topological invariant that classifies chiral symmetric Hamiltonians with one-dimensional parametric dependence. In this work we complete our study of the winding number statistics in a random matrix model belonging to the chiral unitary class AIII. We show that in the limit of large matrix dimensions the winding number distribution becomes Gaussian. Our results include expressions for the statistical moments of the winding number and for the k-point correlation function of the winding number density.
Author
Nico Hahn
Chalmers, Physics, Condensed Matter and Materials Theory
University of Duisburg-Essen
Mario Kieburg
University of Melbourne
Omri Gat
The Hebrew University Of Jerusalem
Thomas Guhr
University of Duisburg-Essen
Journal of Mathematical Physics
0022-2488 (ISSN) 1089-7658 (eISSN)
Vol. 66 10 101902Subject Categories (SSIF 2025)
Probability Theory and Statistics
Condensed Matter Physics
DOI
10.1063/5.0246969