We give a finite divisor-set reformulation of the perfect cuboid problem with a prescribed odd edge. Using this reformulation, we prove that no perfect cuboid has an odd prime-power edge or an odd squarefree semiprime edge. We also prove a large-prime descent theorem, showing that sufficiently large prime-power factors in an odd edge can only occur as common scaling factors. Finally, we show that the valuation-monotonicity obstruction behind the prime-power case is sharp.
Ricky Cipollini (Tue,) studied this question.
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