Abstract
Let 0 < λ1 < λ2 < … be an increasing sequence of positive reals tending to infinity, and let ν1, ν2 be two (finite) signed measures on ℝ+ such thatfor all k. It was originally proved by Müntz (12) that, ifthen ν1 = ν2, and, conversely, if this condition fails, then there exist distinct ν1 and ν2 satisfying (1).
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More From: Mathematical Proceedings of the Cambridge Philosophical Society
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