Asymptotic solutions of the generalized Fermat-type equation of signature (p,p,3) over totally real number fields
Abstract
In this article, we study the asymptotic solutions of the generalized Fermat-type equation of signature (p,p,3) over totally real number fields K, i.e., Axp+Byp=Cz3 with prime exponent p and A,B,C ∈ OK \0\. For certain class of fields K, we prove that Axp+Byp=Cz3 has no asymptotic solutions over K (resp., solutions of certain type over K) with restrictions on A,B,C (resp., for all A,B,C ∈ OK \0\). Finally, we present several local criteria over K.
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