τ-Norm-Perfect and τ-Perfect Eisenstein Integers for τ=ω+2 and 2
Abstract
Using Robert Spira's D definitions of complex Mersenne numbers and the complex sum-of-divisors function, we characterize (ω+2)-norm-perfect and (ω+2)-perfect numbers that are divisble by ω+2 and prove the nonexistence of 2-norm-perfect numbers that are divisible by 2 in the Eisenstein integers.
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