# Structures in P based on Properties of Semigroup and Arithmetical   Sequence H = (+-3*2; 1)

**Authors:** Michael H. Hebert

arXiv: 1812.10417 · 2018-12-27

## TL;DR

This paper explores the structure of prime numbers within a specific arithmetical sequence H, revealing its properties as a semigroup, its relation to prime twins, and providing insights into the Goldbach conjecture.

## Contribution

It introduces a new framework based on the sequence H for analyzing prime structures, including a revised definition of P and geometric interpretations of prime relations.

## Key findings

- H is the smallest superset of P excluding 3 and 2
- H forms a semigroup with unique properties
- The set of prime twins in H is infinite

## Abstract

This paper presents results on structures in P based on tools developed from subjects of elementary number theory. Key findings are: The arithmetical sequence H = (+-3*2; 1) is in Z the smallest superset of P \ {3, 2}. H is a semigroup. A revised definition of P. Unique Gestalt of p in Z. The prime number lattice packing H exp n. The geometrical locus in HxH of the family of solutions of: - the set of prime twins, - the set of PRACHAR prime twins, - in H exp 2, H exp 3 family of solutions of the GOLDBACH conjunction. Partition of H in p exp 2-intervals. Prime numbers in p exp 2-intervals. Infinity of the set of prime twins. Verification of the GOLDBACH conjunction.

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Source: https://tomesphere.com/paper/1812.10417