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This paper systematically investigates Paley-Wiener-type theorems in the context of hypercomplex variables. To this end, we introduce and study the so-called generalized Bernstein spaces endowed by the fractional Dirac operator D_^ - a space-fractional operator of order and skewness, encompassing the Dirac operator D. We will show that such family of function spaces seamlessly characterizes the interplay between Clifford-valued Lᵖ-functions satisfying the support condition supp\ f B (0, R), and the solutions of the Cauchy problems endowed by the space-time operator ₗ䃐+D_^ that are of exponential type R^. Such construction allows us to generalize, in a meaningful way, the results obtained by Kou and Qian (2002) and Franklin, Hogan and Larkin (2017). Noteworthy, the exploitation of the well-known Kolmogorov-Stein inequalities to hypercomplex variables permits us to make the computation of the maximal radius R for which supp\ f is compactly supported in B (0, R) rather explicit.
Bernstein et al. (Wed,) studied this question.