The continuous Anderson hamiltonian in d 3
Abstract
We construct the continuous Anderson hamiltonian on (-L,L)d driven by a white noise and endowed with either Dirichlet or periodic boundary conditions. Our construction holds in any dimension d 3 and relies on the theory of regularity structures: it yields a self-adjoint operator in L2((-L,L)d) with pure point spectrum. In d 2, a renormalisation of the operator by means of infinite constants is required to compensate for ill-defined products involving functionals of the white noise. We also obtain left tail estimates on the distributions of the eigenvalues: in particular, for d=3 these estimates show that the eigenvalues do not have exponential moments.
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