Let $F_n(b)= b^{2^n}+1 $ where $b$ is an even integer , $ 3\nmid b , 5\nmid b  $ and $n\ge2$

Let $S_i=P_b(S_{i-1})$ with $S_0=P_{b/2}(P_{b/2}(8))$ where

$P_m(x)=2^{-m}\cdot((x-\sqrt{x^2-4})^m+(x+\sqrt{x^2-4})^m)$ then

Conjecture :

$F_n(b)$ is prime iff $S_{2^n-2} \equiv 0 \pmod{F_n(b)}$

Question

Are there similar criteria for generalized Fermat numbers in the literature ?