We develop a Fourier analysis for a generalization of the class of periodic functions, often referred to as (θ, T) -periodic functions, and prove several properties and inequalities related to the Fourier transform, including a type of Poincaré inequality, which extend the periodic case. As an application, we employ this analysis to show that a continuous linear operator acting on smooth (θ, T) -periodic functions is globally hypoelliptic/solvable if and only if the corresponding operator which acts on periodic functions is globally hypoelliptic/solvable, and characterize the global hypoellipticity/solvability of a class of first order differential operators acting on the set of smooth (θ, T) -periodic functions.
Kowacs et al. (Wed,) studied this question.
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