Contractive idempotents on locally compact quantum groups
arXiv:1209.6508
Abstract
A general form of contractive idempotent functionals on coamenable locally compact quantum groups is obtained, generalising the result of Greenleaf on contractive measures on locally compact groups. The image of a convolution operator associated to a contractive idempotent is shown to be a ternary ring of operators. As a consequence a one-to-one correspondence between contractive idempotents and a certain class of ternary rings of operators is established.
16 pages, v2 contains very minor changes and updates the references. The paper will appear in the Indiana University Journal of Mathematics