Primitive Indexes, Zsigmondy Numbers, and Primoverization

Abstract

We define a primitive index of an integer in a sequence to be the index of the term with the integer as a primitive divisor. For the sequences ku+hu and ku-hu, we discern a formula to find the primitive indexes of any composite number given the primitive indexes of its prime factors. We show how this formula reduces to a formula relating the multiplicative order of k modulo N to that of its prime factors. We then introduce immediate consequences of the formula: certain sequences which yield the same primitive indexes for numbers with the same unique prime factors, an expansion of the lifting the exponent lemma for v2(kn+hn), a simple formula to find any Zsigmondy number, a note on a certain class of pseudoprimes titled overpseudoprime, and a proof that numbers such as Wagstaff numbers are either overpseudoprime or prime.