I mean it could be, but not in the way you're talking about. There's a common misconception that quantum algorithms being able to factor integers and solve the discrete log problem in polynomial time has some implications for P vs NP. However, integer factoring and the discrete log problems are NOT NP complete problems, and there is no quantum algorithm published that can solve an NP complete problem in polynomial time. It's actually an open problem if quantum computers, in terms of computability classes, are any more powerful than classical computers (I think even assuming P!=NP, but I'm not a computing theory person haven't looked into more recent work on it).