Let $A$ be a set of prime numbers, generated by the following procedure. Let $A_0 = \{2\}$. Let $A_n$ be generated by setting $x_n = (\prod_{p_i \in A_{n-1}}p_i) + 1$, and adding all the prime factors of $x_n$ to $A_{n-1}$. Let $A=\bigcup_{n\in \mathbb{N}} A_n$.
Clearly, $A$ does not contain all primes. Is there any other way to characterize the elements of $A$? What's the computational complexity of determining whether a prime belongs to $A$? What's the density of $A$ in the set of primes?
The related problem where only the minimum prime divisor of $x_n$ is added to the list $A_{n-1}$ is open as pointed out by @JoeSilverman. This sequence of primes is called the Euclid-Mullin sequence. See the following links:
https://math.stackexchange.com/questions/272958/are-all-primes-euclid-primes
Now, your sequence has more members than the Euclid-Mullin sequence. Thus it would be at least as hard, if not harder, to prove that some prime is missing in your sequence, given that no one has been able to prove that such a prime is missing in theEuclid-Mullin sequence.
Edit: Thanks to Francois Brunault for pointing out that containment is needed for the above claim to hold. The difficulty of your problem is possibly still similar to Euclid-Mullin. Thanks to Greg Martin for the further reference.
