In this work we put forward an effective Gaussian free field description of
critical wavefunctions at the transition between plateaus of the integer
quantum Hall effect. To this end, we expound our earlier proposal that powers
of critical wave intensities prepared via point contacts behave as pure scaling
fields obeying an Abelian operator product expansion. Our arguments employ the
framework of conformal field theory and, in particular, lead to a
multifractality spectrum which is parabolic. We also derive a number of old and
new identities that hold exactly at the lattice level and hinge on the
correspondence between the Chalker-Coddington network model and a
supersymmetric vertex model.Comment: 48 pages, 4 figure
We classify the gapped phases of Z N parafermions in one dimension and construct a representative of each phase. Even in the absence of additional symmetries besides parafermionic parity, parafermions may be realized in a variety of phases, one for each divisor n of N . The phases can be characterized by spontaneous symmetry breaking, topology, or a mixture of the two. Purely topological phases arise if n is a unitary divisor, i.e. if n and N/n are co-prime. Our analysis is based on the explicit realization of all symmetry broken gapped phases in the dual Z N -invariant quantum spin chains.
We discuss conformal field theories (CFTs) in rectangular geometries, and develop a formalism that involves a conformal boundary state for the 1 + 1d open system. We focus on the case of homogeneous boundary conditions (no insertion of a boundary condition changing operator), for which we derive an explicit expression of the associated boundary state, valid for any arbitrary CFT. We check the validity of our solution, comparing it with known results for partition functions, numerical simulations of lattice discretizations, and coherent state expressions for free theories.
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