Analyticity and Injectivity of Convoluti
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Hiroshi Kunita
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Article
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1999
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Elsevier Science
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English
β 165 KB
We prove that all continuous convolution semigroups of probability distributions on an arbitrary Lie group are injective. Let [+ t , t>0] be a continuous convolution semigroup of probability distributions on a Lie group G. For each t>0, we set T t f (x)= G f (xy) + t (dy) for a bounded continuous fu