On the quantity m2-pk where pk m2 is an odd perfect number -- Part II

Abstract

Let pk m2 be an odd perfect number with special prime p. Extending previous work of the authors, we prove that the inequality m < pk follows from m2 - pk = 2r t, where r ≥ 2 and (2,t)=1, under the following hypotheses: (a) m > t > 2r, or (b) m > 2r > t. We also prove that the estimate m2 - pk > 2m holds. We can also improve this unconditional estimate to m2 - pk > 313m2/315.