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Abstract
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Let
be a semisimple Lie group with discrete series. We use maps
defined by orbital integrals to recover group theoretic information about
, including information
contained in
-theory
classes not associated to the discrete series. An important tool is a
fixed point formula for equivariant indices obtained by the authors in
an earlier paper. Applications include a tool to distinguish classes in
, the
(known) injectivity of Dirac induction, versions of Selberg’s principle in
-theory
and for matrix coefficients of the discrete series, a Tannaka-type
duality, and a way to extract characters of representations from
-theory.
Finally, we obtain a continuity property near the identity element of
of families of maps
, parametrised by
semisimple elements of
,
defined by stable orbital integrals. This implies a continuity property for
-packets
of discrete series characters, which in turn can be used to deduce a (well-known)
expression for formal degrees of discrete series representations from Harish-Chandra’s
character formula.
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Keywords
$K\mkern-2mu$-theory of group $C^*$-algebras, orbital
integral, equivariant index, semisimple Lie group,
Connes–Kasparov conjecture
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Mathematical Subject Classification 2010
Primary: 19K56
Secondary: 22E46, 46L80, 58J20
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Milestones
Received: 19 March 2018
Revised: 20 November 2018
Accepted: 6 December 2018
Published: 16 June 2019
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