Idempotent States and the Inner Linearity Property
Teodor Banica, Uwe Franz, Adam Skalski (2012)
Bulletin of the Polish Academy of Sciences. Mathematics
Similarity:
We find an analytic formulation of the notion of Hopf image, in terms of the associated idempotent state. More precisely, if π:A → Mₙ(ℂ) is a finite-dimensional representation of a Hopf C*-algebra, we prove that the idempotent state associated to its Hopf image A' must be the convolution Cesàro limit of the linear functional φ = tr ∘ π. We then discuss some consequences of this result, notably to inner linearity questions.