On Liouville-type theorems and the uniqueness of the positive Cauchy problem for a class of hypoelliptic operators
Abstract
This note contains a representation formula for positive solutions of linear degenerate second-order equations of the form ∂t u (x,t) = Σj=1m Xj2 u(x,t) + X0 u(x,t) (x,t) ∈ RN ×\, ]- ∞ ,T[, proved by a functional analytic approach based on Choquet theory. As a consequence, we obtain Liouville-type theorems and uniqueness results for the positive Cauchy problem.
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