Strongly coupled compact lattice QED with staggered fermions
Abstract
We explore the compact U(1) lattice gauge theory with staggered fermions and gauge field action -ΣP [β (P) + γ (2P)], both for dynamical fermions and in the quenched approximation. (P denotes the plaquette angle.) In simulations with dynamical fermions at various γ -0.2 on 64 lattices we find the energy gap at the phase transition of a size comparable to the pure gauge theory for γ 0 on the same lattice, diminishing with decreasing γ. This suggests a second order transition in the thermodynamic limit of the theory with fermions for γ below some finite negative value. Studying the theory on large lattices at γ = -0.2 in the quenched approximation by means of the equation of state we find non-Gaussian values of the critical exponents associated with the chiral condensate, β 0.32 and δ 1.8, and determine the scaling function. Furthermore, we evaluate the meson spectrum and study the PCAC relation.
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