Efficient resolution of Thue-Mahler equations
Abstract
A Thue-Mahler equation is a Diophantine equation of the form F(X,Y) = a· p1z1·s pvzv, (X,Y)=1 where F be an irreducible homogeneous binary form of degree at least 3 with integer coefficients, a is a non-zero integer and p1, …, pv are rational primes. Existing algorithms for resolving such equations require computations in the number field obtained by adjoining three roots of F(X,1)=0. We give a new algorithm that requires computations only in the number field obtained by adjoining one root, making it far more suited for higher degree examples. We also introduce a lattice sieving technique reminiscent of the Mordell--Weil sieve that makes it practical to tackle Thue--Mahler equations of higher degree and with larger sets of primes. We give several examples including one of degree 11. Let P(m) denote the largest prime divisor of an integer m 2. As an application of our algorithm we determine all pairs (X,Y) of coprime non-negative integers such that P(X4-2Y4) 100, finding that there are precisely 49 such pairs.
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