Polyharmonic Fields and Liouville Quantum Gravity Measures on Tori of Arbitrary Dimension: from Discrete to Continuous

Abstract

For an arbitrary dimension n, we study: (a) the Polyharmonic Gaussian Field hL on the discrete torus TnL = 1L Zn / Zn, that is the random field whose law on RTnL given by equation* cn\, e-bn\|(-L)n/4h\|2 dh, equation* where dh is the Lebesgue measure and L is the discrete Laplacian; (b) the associated discrete Liouville Quantum Gravity measure associated with it, that is the random measure on TnL equation*μL(dz) = ( γ hL(z) - γ22 E hL(z) ) dz,equation* where γ is a regularity parameter. As L∞, we prove convergence of the fields hL to the Polyharmonic Gaussian Field h on the continuous torus Tn = Rn / Zn, as well as convergence of the random measures μL to the LQG measure μ on Tn, for all |γ| < 2n.