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We derive an explicit formula for the N-point correlation 
$F_N(s)$ of the van der Corput sequence in base 
$2$ for all 
$N \in \mathbb {N}$ and 
$s \geq 0$. The formula can be evaluated without explicit knowledge about the elements of the van der Corput sequence. This constitutes the first example of an exact closed-form expression of 
$F_N(s)$ for all 
$N \in \mathbb {N}$ and all 
$s \geq 0$ which does not require explicit knowledge about the involved sequence. Moreover, it can be immediately read off that 
$\lim _{N \to \infty } F_N(s)$ exists only for 
$0 \leq s \leq 1/2$.
