The diophantine exponent of the Z/qZ points of Sd-2⊂ Sd
Abstract
Assume a polynomial-time algorithm for factoring integers, Conjecture~conj, d≥ 3, and q and p are prime numbers, where p≤ qA for some A>0. We develop a polynomial-time algorithm in (q) that lifts every Z/qZ point of Sd-2⊂ Sd to a Z[1/p] point of Sd with the minimum height. We implement our algorithm for d=3 and 4. Based on our numerical results, we formulate a conjecture which can be checked in polynomial-time and gives the optimal bound on the diophantine exponent of the Z/qZ points of Sd-2⊂ Sd.
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