Canonical solutions to non-translation invariant singular SPDEs

Abstract

We exhibit a canonical, finite dimensional solution family to certain singular SPDEs of the form equation (∂t- Σi,j=1d ai,j(x,t) ∂i ∂j - Σi=1d bi(x,t) ∂i - c(x,t)) u = F(u, ∂ u, ) \ , equation where ai,j, bi, c: Td× R R and A=\ai,j\i,j=1d is uniformly elliptic. More specifically, we solve the non-translation invariant g-PAM, φ42, φ43 and KPZ-equation and show that the diverging renormalisation-functions are local functions of A. We also establish a continuity result for the solution map with respect to the differential operator for these equations.

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