The dual of a Boolean function $F(x_1,x_2 \dots x_n,+,\bullet)$, written as $F^D$, is the same expression as that of $F$ with $+$ and $\bullet$ swapped. $F$ is said to be self-dual if $F=F^D$. What is the number of self-dual functions with $n$ Boolean variables?
I have no clue where to begin with. Any subtle hint would be great.
Thanks !