Well-posedness and global in time behavior for Lp-mild solutions to the Navier-Stokes equation on the hyperbolic space

Abstract

We study mild solutions to the Navier-Stokes equation on the n-dimensional hyperbolic space Hn, n ≥ 2. We use dispersive and smoothing estimates proved by Pierfelice on a class of complete Riemannian manifolds to extend the Fujita-Kato theory of mild solutions from Rn to Hn. This includes well-posedness results for Ln initial data and Ln Lp initial data for 1 < p < n, global in time results for small initial data, and time decay results for the Ln and Lp norms of both u and ∇ u. Due to the additional exponential time decay offered on Hn, we are able to simplify the proofs of the Ln and Lp norm decay results as compared to the Euclidean setting. Additionally, we are able to show that mild solutions on Hn belong to a wider range of space-time LrLq spaces than is known for Euclidean space, and that the Ln norm of a global solution decays to zero as t goes to infinity on Hn, which was a question left open by Kato for Rn, n≥ 3. As a necessary part of our work, we extend to Hn known facts in Euclidean space concerning the strong continuity and contractivity of the semigroup generated by the Laplacian. Also, we establish necessary boundedness and commutation properties for a certain projection operator in the setting of Hn using spectral theory. This work, together with Pierfelice's, contributes to providing a full Fujita-Kato theory on Hn.