Let $U=\mathrm{Spin}(2n)$, which is a simply connected compact simple Lie group, and let $\mathfrak{u}_0=\mathfrak{so}(2n)$, the Lie algebra of $U$. If $\mathfrak{g}_0$ is a noncompact dual of $\mathfrak{u}_0$ in the complexified Lie algebra $\mathfrak{g}=\mathfrak{so}(2n,\mathbb{C})$, namely $\mathfrak{g}_0=\mathfrak{u}_0^\theta+\sqrt{-1}\mathfrak{u}_0^{-\theta}$ for some involutive automorphism $\theta$ of $\mathfrak{u}_0$, where $\mathfrak{u}_0^{\pm\theta}=\{X\in\mathfrak{u}_0\mid\theta(X)=\pm X\}$. Then there exists a noncompact closed subgroup $G$ of $G_\mathbb{C}=\mathrm{Spin}(2n,\mathbb{C})$ with the Lie algebra $\mathfrak{g}_0$. For example, if $\mathfrak{g}_0=\mathfrak{so}(m,2n-m)$, then $G=\mathrm{Spin}(m,2n-m)$.
QUESTION
What is $G$ when $\mathfrak{g}_0=\mathfrak{so}^*(2n)$?
I am not sure whether the question fits the level of MathOverFlow. I would like to say sorry if the question is too fundamental to be posted here.
