Primitive Divisors of Certain Elliptic Divisibility Sequences
Abstract
Let P be a non-torsion point on the elliptic curve Ea: y2=x3+ax. We show that if a is fourth-power-free and either n>2 is even or n>1 is odd with x(P)<0 or x(P) a perfect square, then the n-th element of the elliptic divisibility sequence generated by P always has a primitive divisor.
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