On L1-L2 dichotomy for flat symmetric spaces
Abstract
For rank 1 flat symmetric spaces, continuous orbital measures admit absolutely continuous convolution squares, except for Cartan type AI. Hence L1-L2 dichotomy for these spaces holds true in parallel to the compact and non-compact rank 1 symmetric spaces. We also study L1-L2 dichotomy for flat symmetric spaces of ranks p=2,3 of type AIII, i.e.\ associated with SU(p,q)/S(U(p)× U(q)) where q≥ p. For continuous orbital measures given by regular points L1-L2 dichotomy holds. We study such measures given by certain singular points when p=2, and show that L1-L2 dichotomy fails. This is the first time such results are observed for any type of symmetric spaces of rank 2.
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