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I want to show that $$\newcommand{\cov}{\operatorname{cov}}\newcommand{\d}{\mathrm{d}}\cov(x,y) = \iint (F_{X,Y}(x,y) - F_X(x)F_Y(y))\,\d x\,\d y$$ However, I have no idea how to start. I know that $$\cov(x,y) = \iint (x-\mu_X)(y-\mu_Y)f_{X,Y}(x,y)\,\d x\,\d y = \iint xyf_{X,Y}(x,y)\,\d x\,\d y - \mu_x \mu_y$$ where $\mu_x = \int x f_X(x)\,\d x$ and $\mu_y = \int y f_Y(y)\,\d y$.
However, I have no idea how to proceed. I would be very grateful for at least a small hint.
Assume $(X_{1},Y_{1})$ and $(X_{2},Y_{2})$ are independent each distributed according to the same joint CDF. Then
$$2{cov(X_{1},Y_{1})}=E((X_{2}-X_{1})(Y_{2}-Y_{1})) = E(\int\int(\delta(X_{2}<=u)-\delta(X_{1}<=u))(\delta(Y_{2}<=v)-\delta(Y_{1}<=v)) du dv) $$ where $\delta(X<=u)=1$ when $X<=u$, and $=0$ otherwise. We can now take the expectation under the integral. QED.
Source: Lemma 2 in Lehmann, E.L., 1966. Some concepts of dependence. The Annals of Mathematical Statistics, pp.1137-1153.
