Let $A\rightrightarrows X$ be a groupoid, where $X$ is the set of objects and $A$ is the set of arrows.
My favorite example of a groupoid is an action groupoid. If a group $G$ acts on the left on a set $X$,
we set
$$
A=\{(x,g,y)\mid x,y\in X, g\in G,\ y=g*x\},
$$
then $A\rightrightarrows X$ with the evident maps is called the action groupoid corresponding to the action of $G$ on $X$.
It is often denoted by $G\ltimes X$.
Let $F\colon (A\rightrightarrows X)\to (B\rightrightarrows Y)$ be a morphism of groupoids (a functor).
We say that $F$ is an *equivalence of groupoids* if it is an equivalence of categories.
Let $x\in X$. We denote by $A(x)$ the set of arrows $a\colon x\to x$.
We denote by $\pi_0(X)$ the set of connected components of $X$
(i.e., the set of equivalence classes in $X$ with respect to the equivalence relation induced by $A$).
We say that a morphism $F$ as above is a *weak equivalence of groupoids* (or a *quasi-isomorphism*) if
$\pi_0(F)\colon \pi_0(X)\to \pi_0(Y)$ is a bijection and, for any $x\in X$, the induced homomorphism
$F_x\colon A(x)\to B(y)$ is an isomorphism, where $y=F(x)$.
> **Question 1.** Is it true that any weak equivalence of groupoids is an equivalence?
Now assume that a group $\Gamma$ acts on our groupoid $A\rightrightarrows X$. We say that $A\rightrightarrows X$ is a $\Gamma$-groupoid.
My favorite example of a $\Gamma$-groupoid comes from an action of an algebraic group $\mathcal{G}$, defined over a field $k$, on a $k$-variety
$\mathcal{X}$. Let $k_s$ denote a separable closure of $k$, then we set $\Gamma:={\rm Gal}(k_s/k)$, and we consider the action groupoid
$\mathcal{G}(k_s)\ltimes\mathcal{X}(k_s)$, on which $\Gamma$ acts.
By a *weak equivalence of $\Gamma$-groupoids* we mean a $\Gamma$-functor $F\colon (A\rightrightarrows X)\to (B\rightrightarrows Y)$
that is a weak equivalence of groupoids.
By an *equivalence of $\Gamma$-groupoids* we mean a $\Gamma$-functor $F\colon (A\rightrightarrows X)\to (B\rightrightarrows Y)$
such that there exists a a $\Gamma$-functor $F'$ in the opposite direction and each of the composite functors $F\circ F'$ and $F'\circ F$ is
$\Gamma$-naturally-isomorphic to the corresponding identity functor.
> **Question 2** Is it true that any weak equivalence of $\Gamma$-groupoids is an equivalence of $\Gamma$-groupoids?
I expect the answer "No" to Question 2, but I cannot construct a counter-example.