A current based approach for the uniqueness of the continuity equation

Abstract

We consider the problem of proving uniqueness of the solution of the continuity equation with a vector field u ∈ [L1 (0,T; W1,p(Td)) L∞ ((0,T) × Td)]d with div(u) - ∈ L1 (0,T; L∞ (Td)) and an initial datum 0 ∈ Lq (Td), where Td is the d-dimensional torus and 1 ≤ p,q ≤ +∞ such that 1/p + 1/q =1 without using the theory of renormalized solutions. We propose a more geometric approach which will however still rely on a strong L1 estimate on the commutator (which is the key technical tool when using renormalized solutions, too), but other than that will be based on the theory of currents.