Semiclassical Approach to Finite-N Matrix Models
Abstract
We reformulate the zero-dimensional hermitean one-matrix model as a (nonlocal) collective field theory, for finite~N. The Jacobian arising by changing variables from matrix eigenvalues to their density distribution is treated exactly\/. The semiclassical loop expansion turns out not\/ to coincide with the (topological) 1 N~expansion, because the classical background has a non-trivial N-dependence. We derive a simple integral equation for the classical eigenvalue density, which displays strong non-perturbative behavior around N\!=\!∞. This leads to IR singularities in the large-N expansion, but UV divergencies appear as well, despite remarkable cancellations among the Feynman diagrams. We evaluate the free energy at the two-loop level and discuss its regularization. A simple example serves to illustrate the problems and admits explicit comparison with orthogonal polynomial results.
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