Nonself-adjoint semicrossed products by abelian semigroups

Abstract: Let $\mathcal{S}$ be the semigroup $\mathcal{S}=\sum^{\oplus k}{i=1}\Sc{S}_i$, where for each $i\in I$, $\mathcal{S}_i$ is a countable subsemigroup of the additive semigroup $\B{R}+$ containing 0. We consider representations of $\mathcal{S}$ as contractions ${T_s}_{s\in\mathcal{S}}$ on a Hilbert space with the Nica-covariance property: $T_s^T_t=T_tT_s^$ whenever $t\wedge s=0$. We show that all such representations have a unique minimal isometric Nica-covariant dilation. This result is used to help analyse the nonself-adjoint semicrossed product algebras formed from Nica-covariant representations of the action of $\mathcal{S}$ on an operator algebra $\mathcal{A}$ by completely contractive endomorphisms. We conclude by calculating the $C^*$-envelope of the isometric nonself-adjoint semicrossed product algebra (in the sense of Kakariadis and Katsoulis).