On one criterion of the uniqueness of generalized solutions for linear transport equations with discontinuous coefficients
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We study generalized solutions of multidimensional transport equation with bounded measurable solenoidal field of coefficients $a(x)$. It is shown that any generalized solution satisfies the renormalization property if and only if the operator $a\cdot\nabla u$, $u\in C_0^1(\mathbb{R}^n)$ in the Hilbert space $L^2(\mathbb{R}^n)$ is an essentially skew-adjoint operator, and this is equivalent to the uniqueness of generalized solutions. We also establish existence of a contractive semigroup, which provides generalized solutions, and give a criterion of its uniqueness.
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On chain rule and renormalization
A counterexample of a bounded divergence-free vector field demonstrates that the chain rule for divergence is not sufficient for renormalization of weak solutions to the continuity equation.
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