The Dual of a Boolean function $F(x_1, x_2, ..., x_n)$, written as $F^D$ is the same expression as that of $F$ with $+$ and $.$ swapped. $F$ is said to be self dual if $$F=F^D$$
How can we count total number of self dual function with $n$ Boolean variables.
I know For $n$ variables total $2^n$ minterms or maxterms are possible and any boolean function can be expressed as combination of minterms or maxterms. But what else is required to count all self dual functions of $n$ variable.