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SMOOTHNESS OF CONVOLUTION PRODUCTS OF ORBITAL MEASURES ON RANK ONE COMPACT SYMMETRIC SPACES
Published online by Cambridge University Press: 12 February 2016
Abstract
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We prove that all convolution products of pairs of continuous orbital measures in rank one, compact symmetric spaces are absolutely continuous and determine which convolution products are in 
$L^{2}$ (meaning that their density function is in 
$L^{2}$). We characterise the pairs whose convolution product is either absolutely continuous or in 
$L^{2}$ in terms of the dimensions of the corresponding double cosets. In particular, we prove that if 
$G/K$ is not 
$\text{SU}(2)/\text{SO}(2)$, then the convolution of any two regular orbital measures is in 
$L^{2}$, while in 
$\text{SU}(2)/\text{SO}(2)$ there are no pairs of orbital measures whose convolution product is in 
$L^{2}$.
MSC classification
- Type
- Research Article
- Information
- Copyright
- © 2016 Australian Mathematical Publishing Association Inc.
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