Primes in Geometric-Arithmetic Progression
Abstract
A geometric-arithmetic progression of primes is a set of k primes (denoted by GAP-k) of the form p1 rj + j d for fixed p1, r and d and consecutive j, i.e, \p1, \, p1 r + d, \, p1 r2 + 2 d, \, p1 r3 + 3 d, \,.... We study the conditions under which, for k 2, a GAP-k is a set of k primes in geometric-arithmetic progression. Computational data (along with the MATHEMATICA codes) containing progressions up to GAP-13 is presented. Integer sequences for the sets of differences d corresponding to the GAPs of orders up to 11 are also presented.
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