Root Repulsion and Faster Solving for Very Sparse Polynomials Over $p$-adic Fields

Abstract: For any fixed field K ∈ {Q 2 , Q 3 , Q 5 , . . .}, we prove that all polynomials f ∈ Z[x] with exactly 3 (resp. 2) monomial terms, degree d, and all coefficients having absolute value at most H, can be solved over K within deterministic time log 4+o(1) (dH) log 3 (d) (resp. log 2+o(1) (dH)) in the classical Turing model: Our underlying algorithm correctly counts the number of roots of f in K, and for each such root generates an approximation in Q with logarithmic height O(log 2 (dH) log(d)) that converges at a… Show more