Approximate controllability and Irreducibility of the transition semigroup associated with Convective Brinkman-Forchheimer extended Darcy Equations

Abstract

In this article, the following controlled convective Brinkman-Forchheimer extended Darcy (CBFeD) system is considered in a d-dimensional torus Td: align* ∂y∂ t-μ y+(y·∇)y+αy+β yr-1y+γ y q-1y+∇ p=g+u,\ ∇·y=0, align* where d∈\2,3\, μ,α,β>0, γ∈R, r,q∈[1,∞) with r>q≥ 1 and u is the control. For the super critical (r>3) and critical (r=3 with 2βμ>1) cases, we first show the approximate controllability of the above system in the usual energy space (divergence-free L2(Td) space). As an application of the approximate controllability result, we establish the irreducibility of the transition semigroup associated with stochastic CBFeD system perturbed by non-degenerate Gaussian noise in the usual energy space by exploiting the regularity of solutions, smooth approximation of the multi-valued map sgn(·) a density argument and monotonicity properties of the linear and nonlinear operators.