Totally real Thue inequalities over imaginary quadratic fields
Abstract
Let F(x,y) be an irreducible binary form of degree ≥ 3 with integer coefficients and with real roots. Let M be an imaginary quadratic field, with ring of integers ZM. Let K>0. We describe an efficient method how to reduce the resolution of the relative Thue inequalities \[ |F(x,y)|≤ K \;\; (x,y∈ ZM) \] to the resolution of absolute Thue inequalities of type \[ |F(x,y)|≤ k \;\; (x,y∈ Z). \] We illustrate our method with an explicit example.
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