Let $Z\newcommand{\df}{:=}\df\newcommand{\C}{\mathbb C}\C$ and $T\df\C^\times$. Then, the coordinate ring of $Z$ is $\C[z]$ and that of $T$ is $\C[t,t^{-1}]$. Consider another copy of $T$ with coordinate ring $\C[u,u^{-1}]$. The map $\begin{align*}\C[z]\otimes_\C\C[t,t^{-1}]&\longrightarrow\C[u,u^{-1}]\\z^a\otimes t^b&\longmapsto u^{a+b}\end{align*}$ should be a surjective ring homomorphism, inducing a closed immersion $\kappa:T\hookrightarrow Z\times T$. However, the usual (open!) inclusion $\omega: T\hookrightarrow Z$ factors as $\omega=\DeclareMathOperator{\pr}{pr}\pr_Z\circ\kappa$ where $\pr_Z:Z\times T\twoheadrightarrow Z$ is the canonical projection. But this would imply that $\kappa(T)=\pr_Z^{-1}(\omega(T))$ is both closed and open and $Z\times T$ is connected.
What am I doing wrong?