The Liouville theorem for a class of Fourier multipliers and its connection to coupling

Abstract

The classical Liouville property says that all bounded harmonic functions in Rn, i.e.\ all bounded functions satisfying f = 0, are constant. In this paper we obtain necessary and sufficient conditions on the symbol of a Fourier multiplier operator m(D), such that the solutions f to m(D)f=0 are Lebesgue a.e.\ constant (if f is bounded) or coincide Lebesgue a.e.\ with a polynomial (if f grows like a polynomial). The class of Fourier multipliers includes the (in general non-local) generators of L\'evy processes. For generators of L\'evy processes we obtain necessary and sufficient conditions for a strong Liouville theorem where f is positive and grows at most exponentially fast. As an application of our results above we prove a coupling result for space-time L\'evy processes.

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