Our aim is to prove rigorously that the Chern-Simons model of Hong, Kim, an
d Pac [13] and Jackiw and Weinberg [14] (the CS model) and the Abelian Higg
s model of Ginzburg and Landau (the AH model, see [15]) are unified by the
Maxwell-Chern-Simons theory introduced by Lee, Lee, and Min in [16] (MCS mo
del). In [16] the authors give a formal argument that shows how to recover
both the CS and AH models out of their theory by taking special limits for
the values of the physical parameters involved. To make this argument rigor
ous, we consider the existence and multiplicity of periodic vortex solution
s for the MCS model and analyze their asymptotic behavior as the physical p
arameters approach these Limiting values. We show that, indeed, the given v
ortices approach tin a strong sense) vortices for the CS and AH models, res
pectively. For this purpose, we are led to analyze a system of two elliptic
PDEs with exponential nonlinearities on a flat torus. (C) 2000 John Wiley
& Sons, Inc.