Inhomogeneous condensation in effective models for QCD using the finite-mode approach

Abstract

We use a numerical method, the finite-mode approach, to study inhomogeneous condensation in effective models for QCD in a general framework. Former limitations of considering a specific ansatz for the spatial dependence of the condensate are overcome. Different error sources are analyzed and strategies to minimize or eliminate them are outlined. The analytically known results for 1+1 dimensional models (such as the Gross-Neveu model and extensions of it) are correctly reproduced using the finite-mode approach. Moreover, the NJL model in 3+1 dimensions is investigated and its phase diagram is determined with particular focus on the inhomogeneous phase at high density.