Connecting homomorphism in non-abelian cohomology

Question

Let $G$ be a simply connected, semisimple algebraic group over $\mathbb{R}$ and let $X$ be a homogeneous space for $G$ with finite commutative stabilizer $\mu$. There is a connecting homomorphism from non-abelian cohomology $\delta:X(\mathbb{R})\to\mathrm{H}^1(\mathbb{R},\mu(\mathbb{C}))$ that identifies the image of $\delta$ with $\ker(\mathrm{H}^1(\mathbb{R},\mu(\mathbb{C}))\to \mathrm{H}^1(\mathbb{R},G(\mathbb{C})))$, where $\ker$ means kernel as maps of pointed sets.

I wonder if it is always true that the image of $\delta$ is a subgroup of $\mathrm{H}^1(\mathbb{R},\mu(\mathbb{C}))$? In the general setting of non-abelian cohomology this is false and the only general setting in which I know the result to be true is when the subgroup is taken to be central. Note that since $\delta$ factors via an injection via $\pi_0(X(\mathbb{R}))$ and since $\mathrm{H}^1(\mathbb{R},\mu(\mathbb{C}))$ is a $2$-group, it suffices to give a homogeneous space $X$ such that $\pi_0(X(\mathbb{R}))$ has cardinality different from a $2^m$-th power.

Thanks in advance to anyone answering!

Answer 1

$\newcommand{\diag}{{\rm diag}} \newcommand{\sH}{{\mathcal H}} \newcommand{\R}{{\mathbb R}} \newcommand{\HH}{\sf H} \newcommand{\V}{{\sf V}} \newcommand{\B}{{\sf B}} \newcommand{\C}{{\Bbb C}} $No, the kernel $\ker \big[H^1(\R,\mu)\to H^1(\R,G)\big]$ does not have to be a subgroup of the abelian group $H^1(\R,\mu)$.

Indeed, let $G={\rm SU}(2,1)$, the special unitary group of the Hermitian form $$\sH(z_1,z_2,z_3)=z_1\bar z_1+z_2\bar z_2-z_3\bar z_3$$ corresponding to the Hermitian matrix $\diag(1,1,-1)$. Let $T\subset G$ denote the diagonal maximal torus, and set $$\mu=T_2:=\{1,a,b,ab\}$$ where \begin{align*} 1&=\diag(1,1,1),\\ a&=\diag(-1,1,-1),\\ b&=\diag(1,-1,-1), \\ ab&=\diag(-1,-1,1). \end{align*} Then $$H^1(\R,\mu)=Z^1(\R,\mu)=\mu(\R)_2=\mu(\R)=\mu({\mathbb C})=\{1,a,b,ab\}.$$ We use the 1-cocycles $a,b,ab$ to twist the Hermitian form $\sH$. We obtain the twisted Hermitian forms \begin{align*} _a\sH &=-z_1\bar z_1+z_2\bar z_2+z_3\bar z_3\,,\\ _b\sH &=z_1\bar z_1-z_2\bar z_2+z_3\bar z_3\,,\\ _{ab}\sH &= -z_1\bar z_1-z_2\bar z_2-z_3\bar z_3\,. \end{align*} We see that $_a\sH$ and $_b\sH$ are equivalent to $\sH$, whereas $_{ab}\sH$ is not. Thus $$\ker\big[H^1(\R,\mu)\to H^1(\R,G)\big]=\{1,a,b\},$$ which is not a subgroup of the group $H^1(\R,\mu)=\{1,a,b,ab\}$.

Edit. At the request of OP, I compute twisting of the Hermitian form in one variable
$$\sH(z,w)=\lambda \bar z w\quad\ \text{with}\ \, \lambda\in\R^\times$$ by the cocycle $-1$.

Let $$ \HH\colon V\times V\to\C $$ be a Hermitian map, where $\V=\C^1$. Then in coordinates $$\sH(z,w)=\lambda\bar z w$$ where $\lambda\in\R^\times$. We work over $\R$, so $\HH$ is given by two bilinear maps $$ \B_1\colon \V\times \V\to\R,\quad\ \B_2\colon \V\times\V\to\R$$ (the real and the imaginary parts of $\HH$). In coordinates they are given as \begin{align*} &B_1\big((z_1,z_2),(w_1,w_2)\big)=\lambda(z_1w_1+z_2w_2),\\ &B_2\big((z_1,z_2),(w_1,w_2)\big)=\lambda(z_1w_2-z_2w_1). \end{align*}

We regard $\V$ as a two-dimensional $\R$-space with basis $e_1,e_2$. We consider $\V_\C$ with basis $e_1,e_2$ and the standard complex conjugation $$\sigma(x_1e_1+x_2e_2)=\bar x_1e_1+\bar x_2e_2.$$

We twist the pair $(\V,\HH)$ by the cocycle $-1$. That is, we consider the new complex conjugation $\tau=-\sigma$, $$\tau(x_1e_1+x_2e_2)=-\bar x_1e_1-\bar x_2e_2.$$ Then the fixed point set in $\V_\C$ of the twisted complex conjugation $\tau$ is the real vector space $\V'$ with basis $$e_1'=ie_2,\ \,e_2'=ie_2.$$ In this new basis, our vector $$z=(z_1,z_2)=z_1e_1+z_2e_2$$ is written as $$z=z'_1e'_1+z'_2e'_2\quad\ \text{with}\ \, z_1'=-iz_1,\ z_2'=-iz_2,$$ and our bilinear maps $\B_1, \B_2$ are written in coordinates as \begin{align*} &B'_1\big((z'_1,z'_2),(w'_1,w'_2)\big)=-\lambda(z'_1w'_1+z'_2w'_2),\\ &B'_2\big((z'_1,z'_2),(w'_1,w'_2)\big)=-\lambda(z'_1w'_2-z'_2w'_1). \end{align*} This means that twisting by the cocycle $-1$ sends our bilinear forms $(B_1,B_2)$ to $(-B_1,-B_2)$, and it sends our Hermitian form $\sH$ to $-\sH$ (as expected!).