Global hypoellipticity and solvability for a class of evolution operators in time-periodic weighted Sobolev spaces
Abstract
We study the hypoellipticity and solvability properties of a class of time-periodic evolution operators, with coefficients globally defined on Rd and growing polynomially with respect to the space variable. To this aim, we introduce a class of time-periodic weighted Sobolev spaces, whose elements are characterised in terms of suitable Fourier expansions, associated with elliptic operators.
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