Extendibility of Brauer states

We investigate the extendibility problem for Brauer states, focusing on the symmetric two-sided extendibility and the de Finetti extendibility. By employing the representation theory of the unitary and orthogonal groups, we provide a general recipe for finding the $(n,m)$-extendible and $n$-de Finetti-extendible Brauer states. In the two-sided case we describe the special symmetry that only appears for $(n,n)$-extendible symmetric states. From the concrete form of the commutant to the diagonal action of the orthogonal group, we explicitly determine the set of parameters for which the Brauer states are $(1,2)$-, $(1,3)$- and $(2,2)$-extendible in any dimension $d$. Using the branching rules from $\mathrm{SU}(d)$ to $\mathrm{SO}(d)$, we obtain the set of $n$-de Finetti-extendible Brauer states in low dimensions, and analytically describe the $n\to\infty$ limiting shape for $d=3$. Finally, we derive some general properties pertaining to the extendibility of Werner, isotropic and Brauer states.