Diophantine Equation Generated by the Subfield of a Circular Field

Abstract

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Two forms f (x, y, z) and g(x, y, z) of degree 3 were constructed, with their values being the norms of numbers in the subfields of degree 3 of the circular fields K13 and K19 , respectively. Using the decomposition law in a circular field, Diophantine equations f (x, y, z) = a and g(x, y, z) = b , where a, b ∈ Z, a 6= 0, b 6= 0 were solved. The assertions that, based on the canonical decomposition of the numbers a and b into prime factors, make it possible to determine whether the equations f (x, y, z) = a and g(x, y, z) = b have solutions were proved.

Keywords

• algebraic integer
• galois group
• norm of algebraic number
• principal ideal
• fundamental basis
• decomposition law in circular field
• diophantine equation