We consider two-dimensional QED with several fermion flavors on a finite
spatial circle. A modified version of the model with {\em flavor-dependent}
boundary conditions ψp(L)=e2πip/Nψp(0), p=1,…,N
is discussed (N is the number of flavors). In this case a non-contactable
contour in the space of the gauge fields is {\em not} determined by large gauge
transformations. The Euclidean path integral acquires the contribution from the
gauge field configurations with fractional topological charge. The
configuration with ν=1/N is responsible for the formation of the fermion
condensate ⟨ψˉpψp⟩0. The condensate dies out as a
power of L−1 when the length L of the spatial box is sent to infinity.
Implications of this result for non-abelian gauge field theories are discussed
in brief.Comment: 29 pages, 3 figures available upon request, Report TPI-MINN-94-24-T
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