The inter-universal Teichm\"uller theory and new Diophantine results over rational numbers. II
Abstract
[This is an older version of the paper, which will be updated soon.] In the present paper, we continue our research on the generalized Fermat equation xr + ys = zt with signature (r, s, t), where r, s, t 2 are positive integers such that 1r + 1s + 1t < 1. All known positive primitive solutions for the generalized Fermat equation when 1r + 1s + 1t < 1 are related to the Catalan solutions 1n + 23 = 32 and nine non-Catalan solutions. By applying inter-universal Teichm\"uller theory and its slight modification in the case of elliptic curves over rational numbers, we deduce that the generalized Fermat equation xr + ys = zt has no non-trivial primitive solution except for those related to the Catalan solutions and nine non-Catalan solutions mentioned above, when (r, s, t) is not a permutation of the following signatures: (4,5,n), (4,7,n), (5,6,n), with 7 n 303. (2,3,n), (3,4,n), (3,8,n), (3,10,n), with 11 n 109 or n∈ \113, 121\. (3,5,n), with 7 n 3677; (3,7,n), (3,11,n), with 11 n 667. (3,m,n), with 13 m 17, m < n 29; (2,m,n), with m 5, n 7. As a corollary, to solve the generalized Fermat equation xr + ys = zt with exponents r,s,t 4, we are left with 244 signatures (r,s,t) up to permutation; to solve the Beal conjecture, we are left with 2446 signatures (r,s,t) up to permutatio
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