Conformally invariant random fields, quantum Liouville measures, and random Paneitz operators on Riemannian manifolds of even dimension

Abstract

For large classes of even-dimensional Riemannian manifolds (M,g), we construct and analyze conformally invariant random fields. These centered Gaussian fields h=hg, called co-polyharmonic Gaussian fields, are characterized by their covariance kernels k which exhibit a precise logarithmic divergence: |k(x,y)-1d(x,y)| C. They share a fundamental quasi-invariance property under conformal transformations. In terms of the co-polyharmonic Gaussian field h, we define the quantum Liouville measure, a random measure on M, heuristically given as dμgh(x):= eγ h(x)-γ22k(x,x)\,d volg(x) and rigorously obtained as almost sure weak limit of the right-hand side with h replaced by suitable regular approximations h, ∈ N. In terms on the quantum Liouville measure, we define the Liouville Brownian motion on M and the random GJMS operators. Finally, we present an approach to a conformal field theory in arbitrary even dimensions with an ansatz based on Branson's Q-curvature: we give a rigorous meaning to the Polyakov-Liouville measure d*g(h) =1Z*g (- ∫ \,Qg h + m eγ h d volg) (-an2 pg(h,h)) dh, and we derive the corresponding conformal anomaly. The set of admissible manifolds is conformally invariant. It includes all compact 2-dimensional Riemannian manifolds, all compact non-negatively curved Einstein manifolds of even dimension, and large classes of compact hyperbolic manifolds of even dimension. However, not every compact even-dimensional Riemannian manifold is admissible. Our results rely on new sharp estimates for heat kernels and higher order Green kernels on arbitrary compact manifolds.