On the equilibrium measure for the Lukyanov integral

Abstract

In 2000, Lukyanov conjectured that a certain ratio of N-fold integrals should provide access, in the large-N regime, to the ground state expectation value of the exponential of the Sinh-Gordon quantum field in 1+1 dimensions and finite volume R. This work aims at rigorously constructing the fundamental objects necessary to address the large-N analysis of such integrals. More precisely, we construct and establish the main properties of the the equilibrium measure minimising a certain N-dependent energy functional that naturally arises in the study of the leading large-N behaviour of the Lukyanov integral. Our construction allows us to heuristically advocate the leading term in the large-N asymptotic behaviour of the mentioned ratio of Lukyanov integrals, hence supporting Lukyanov's prediction -- obtained by other means -- on the exponent σ of the power-law Nσ term of its asymptotic expansion as N→ + ∞.

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