Grassmannian and Flag sigma models on interval: phase structure and L-dependence

Abstract

We discuss the two-dimensional Grassmannian SU(N)/S(U(N-2)× U(2)) and the flag SU(N)/S(U(N-2)× U(1)× U(1)) sigma models on a finite interval and construct analytical solutions of gap equations in the large N limit. We show that the flag model admits a homogeneous solution for `mixed' Dirichlet-Neumann (DN) boundary conditions only for sufficiently large length L and undergoes a phase transition from the phase of partly broken gauge symmetry (U(1)) to the symmetric phase (U(1)× U(1)) for large L. On the other hand, the Grassmannian model has a detached phase with one massive and one massless non-zero condensates that completely break U(2) gauge symmetry. This phase lives on a region of L bounded from above and has to use the Robin boundary conditions. We also examine the L-dependence of the total energy and detect the linear growth inherent to confining string in all phases.