English

Monogenic Fields from Polynomial Compositions with Applications

Number Theory 2026-05-05 v1

Abstract

A number field KK is called \emph{monogenic} if its ring of integers ZK\mathbb{Z}_K can be expressed as a simple ring extension Z[α]\mathbb{Z}[\alpha] for some αZK\alpha \in \mathbb{Z}_K. A monic irreducible polynomial f(x)Z[x]f(x)\in\mathbb{Z}[x] is said to be monogenic if one of its roots generates both the number field and its ring of integers. In this article, we establish the necessary and sufficient conditions for [ZKi:Z[αi]]=1[\mathbb{Z}_{K_i}:\mathbb{Z}[\alpha_i]]=1, where Ki=Q(αi)K_i=\mathbb{Q}(\alpha_i) and αi\alpha_i is a root of the composed polynomial fi(xk+b)f_i(x^k+b) for i=1,2i=1,2. Here, f1(x)=xn+cj=1n(ax)njZ[x]f_1(x)=x^n+c\sum_{j=1}^{n}(ax)^{n-j}\in\mathbb{Z}[x] and f2(x)=xn+cj=1naj1xnjZ[x]f_2(x)=x^n+c\sum_{j=1}^{n}a^{j-1}x^{n-j}\in\mathbb{Z}[x] are irreducible polynomials of degree n3n\ge 3. In addition, we derive asymptotic estimates for the number of monogenic polynomials in these families under natural assumptions. As an application of our main results, we construct a class of polynomials with non-square-free discriminants. We also analyze the behavior of solutions to certain related differential equations.

Keywords

Cite

@article{arxiv.2605.00949,
  title  = {Monogenic Fields from Polynomial Compositions with Applications},
  author = {Anuj Jakhar and Ravi Kalwaniya and Prabhakar Yadav},
  journal= {arXiv preprint arXiv:2605.00949},
  year   = {2026}
}

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R2 v1 2026-07-01T12:45:44.117Z