Analytic extensions of representations of $*$-subsemigroups without polar decomposition

Abstract: Let $(G,\tau)$ be a finite-dimensional Lie group with an involutive automorphism $\tau$ of $G$ and let $\mathfrak g = \mathfrak h \oplus \mathfrak q $ be its corresponding Lie algebra decomposition. We show that every non-degenerate strongly continuous representation on a complex Hilbert space $\mathcal H$ of an open $$-subsemigroup $S \subset G$, where $s^ = \tau(s)^{-1}$, has an analytic extension to a strongly continuous unitary representation of the 1-connected Lie group $G_1^c$ with Lie algebra $[\mathfrak q,\mathfrak q] \oplus i\mathfrak q$. We further examine the minimal conditions under which an analytic extension to the 1-connected Lie group $G^c$ with Lie algebra $\mathfrak h \oplus i\mathfrak q$ exists. This result generalizes the L\"uscher-Mack Theorem and the extensions of the L\"uscher-Mack Theorem for $$-subsemigroups satisfying $S = S(G^\tau)_0$ by Merigon, Neeb, and \'Olafsson. Finally, we prove that non-degenerate strongly continuous representations of certain $$-subsemigroups $S$ can even be extended to representations of a generalized version of an Olshanski semigroup.