On the self-similarity problem for Gaussian-Kronecker flows
Abstract
It is shown that a countable symmetric multiplicative subgroup G=-H H with H⊂R+ is the group of self-similarities of a Gaussian-Kronecker flow if and only if H is additively Q-independent. In particular, a real number s≠1 is a scale of self-similarity of a Gaussian-Kronecker flow if and only if s is transcendental. We also show that each countable symmetric subgroup of R can be realized as the group of self-similarities of a simple spectrum Gaussian flow having the Foias-Stratila property.
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