A General Solution to (Free) Deterministic Equivalents

We give an algorithm to compute the asymptotics of the eigenvalue distribution of quite general matricial central limit theorems. The central limits are the so called free deterministic equivalents, which in turn are operators whose Cauchy transforms are the solutions to the equations which define very general deterministic equivalents (a la Girko). Our algorithm is based on the one of Belinschi, Mai and Speicher, and the possibility to extend it to more general, operator-valued situations (in particular, to Benaych-Georges rectangular spaces)