The vector-valued Stieltjes moment problem with general exponents
Abstract
We characterize the sequences of complex numbers (zn)n ∈ N and the locally complete (DF)-spaces E such that for each (en)n ∈ N ∈ EN there exists an E-valued function f on (0,∞) (satisfying a mild regularity condition) such that ∫0∞ tzn f(t) dt = en, ∀ n ∈ N, where the integral should be understood as a Pettis integral. Moreover, in this case, we show that there always exists a solution f that is smooth on (0,∞) and satisfies certain optimal growth bounds near 0 and ∞. The scalar-valued case (E = C) was treated by Dur\'an [Math. Nachr. 158 (1992), 175-194]. Our work is based upon his result.
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