The density of primes dividing a particular non-linear recurrence sequence

Abstract

Define the sequence \bn\ by b0=1,b1=1, b2=2,b3=1, and bn=cases bn-1bn-3-bn-22bn-4&if~ n 0 3, bn-1bn-3-3bn-22bn-4&if~ n 0 3. We relate this sequence \bn\ to the coordinates of points on the elliptic curve E:y2+y=x3-3x+4. We use Galois representations attached to E to prove that the density of primes dividing a term in this sequence is equal to 179336. Furthermore, we describe an infinite family of elliptic curves whose Galois images match that of E.