Aspects of Quasi-Phasestructure of the Schwinger Model on a Cylinder with Broken Chiral Symmetry
Abstract
We consider the Nf-flavour Schwinger Model on a thermal cylinder of circumference β=1/T and of finite spatial length L. On the boundaries x1=0 and x1=L the fields are subject to an element of a one-dimensional class of bag-inspired boundary conditions which depend on a real parameter θ and break the axial flavour symmetry. For the cases Nf=1 and Nf=2 all integrals can be performed analytically. While general theorems do not allow for a nonzero critical temperature, the model is found to exhibit a quasi-phase-structure: For finite L the condensate - seen as a function of (T) - stays almost constant up to a certain temperature (which depends on L), where it shows a sharp crossover to a value which is exponentially close to zero. In the limit L ∞ the known behaviour for the one-flavour Schwinger model is reproduced. In case of two flavours direct pictorial evidence is given that the theory undergoes a phase-transition at Tc=0. The latter is confirmed - as predicted by Smilga and Verbaarschot - to be of second order but for the critical exponent δ the numerical value is found to be 2 which is at variance with their bosonization-rule based prediction δ=3.
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