The endoscopic transfer factor is expressed as difference of characters for the even and odd parts of the spin modules, or Dirac index of the trivial representation. The lifting of tempered characters in terms of index of Dirac cohomology is calculated explicitly.
Classification of $A_{q}(λ)$ modules by their Dirac cohomology for type $D$ and $\mathfrak{sp}(2n,\mathbb{R})$
Dirac cohomology, branching laws and Wallach modules
Dirac cohomology of unipotent representations of Sp(2n,R) and U(p,q)
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