Egyptian Fractions with odd denominators
Abstract
The number of solutions of the diophantine equation Σi=1k 1xi=1, in particular when the xi are distinct odd positive integers is investigated. The number of solutions S(k) in this case is, for odd k: \[ ( ( c1\, k k)) ≤ S(k) ≤ ( (c2\, k )) \] with some positive constants c1 and c2. This improves upon an earlier lower bound of S(k) ≥ ( (1+o(1)) 22 k2).
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