Quasilinear rough partial differential equations with transport noise

Abstract

We investigate the Cauchy problem for a quasilinear equation with transport rough input of the form d u-∂i(aij(u)∂j u)d t =d Xti(x)∂i ut, u0∈ L2 on the torus Td, where X is two-step enhancement of a family of coefficients (Xit(x))i=1,… d, akin to a geometric rough path with H\"older regularity α>1/3. Using energy estimates, we provide sufficient conditions that guarantee existence in any dimension, and uniqueness in the case when X is divergence-free. We then focus on the one-dimensional scenario, with slightly more regular coefficients. Improving the a priori estimates of the first results, we prove existence of a class of solutions whose spatial derivatives satisfy a Ladyzhenskaya-Prodi-Serrin type condition. Uniqueness is shown in the same class, by obtaining an L∞(L1) estimate on the difference of two solutions. The latter is obtained by establishing a link with a certain backward dual equation combined with a (rough) iteration lemma \`a la Moser.