Let $G$ be a connected reductive group and $K=G^{\sigma}$ where $\sigma$ is an involution of $G$. Could someone please help me to understand what will be the (Analytic) Algebraic Brauer groups of the complex symmetric spaces $G/K$.
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$\begingroup$ Also, please help to understand the third integral cohomology group of symmetric space. $\endgroup$– Pinaki SCommented Oct 9 at 18:19
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