Principality of prime ideals of algebraic number fields

Abstract

We discuss principality of prime ideals of finite algebraic number fields L=K(θ) over an algebraic number field K ([K:Q]<∞) defined by irreducible polynomials f(x)∈ OK[x] and f(θ)=0. Our main Theorem says that if a principal prime ideal (π)⊂ OK is relatively prime to conductor F =\α∈ OL| a principal ideal (α) of OL⊂ OK[θ]\ and splits completely over L: (π)OL=Π pi, then pi is a principal ideal of OL for all i, where OL= L Z is integer ring of L. We use Jacobian Varieties of non-singular projective curve model of super elliptic curves yl=f(x) to show the main Theorem, where l is a large enough prime number which is relatively prime to degree of f(x) and (π).

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