English

Redefining Euler-Rabinowitsch Polynomials with Heegner Number Based Quadratic Formulation

Number Theory 2025-08-06 v1

Abstract

This paper introduces a novel class of prime-generating quadratic polynomials defined by fZ,k,H(n)=n2(2Zk1)n+(2Zk1)2+H4f_{Z,k,H}(n) = n^2 - (2Zk - 1)n + \frac{(2Zk - 1)^2 + H}{4}, where ZkZ0Zk \in \mathbb{Z}_{\geq 0} and HH belongs to the set of Heegner numbers. This form is closely related to the Euler-Rabinowitsch polynomials through specific substitutions. The structure enables algebraic tuning for prime-rich outputs and provides deeper insight into the impact of Heegner numbers on prime distribution. Using tools such as the Bateman-Horn conjecture and prime-counting functions, we demonstrate that this family can be optimized to generate a high density of primes. This work offers new directions for research in analytic number theory and potential applications in cryptography and signal processing.

Keywords

Cite

@article{arxiv.2508.02821,
  title  = {Redefining Euler-Rabinowitsch Polynomials with Heegner Number Based Quadratic Formulation},
  author = {Sudarshan Kumaresan and Shipra Kumari and Neha Mishra},
  journal= {arXiv preprint arXiv:2508.02821},
  year   = {2025}
}

Comments

39 pages, 4 figures

R2 v1 2026-07-01T04:34:04.729Z