Touching Random Surfaces and Liouville Gravity

Abstract

Large N matrix models modified by terms of the form g(n)2 generate random surfaces which touch at isolated points. Matrix model results indicate that, as g is increased to a special value gt, the string susceptibility exponent suddenly jumps from its conventional value γ to γγ-1. We study this effect in \ gravity and attribute it to a change of the interaction term from O eα+ φ for g<gt to O eα- φ for g=gt (α+ and α- are the two roots of the conformal invariance condition for the \ dressing of a matter operator O). Thus, the new critical behavior is explained by the unconventional branch of \ dressing in the action.

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