Jacob's ladders, crossbreeding and infinite sets of meta-functional equations as new species generated by the mother formula

TL;DR

This paper introduces a new class of meta-functional equations in classical analysis, generated through crossbreeding a fundamental mother formula with an infinite set of subsidiary equations, creating novel mathematical species.

Contribution

It presents a novel method of generating new meta-functional equations via crossbreeding a core mother formula with infinite subsidiary sets, expanding the landscape of functional equations.

Findings

New meta-functional equations derived from mother formula

Infinite set of equations generated through crossbreeding

Introduction of a new species of formulas in analysis

Abstract

In this paper we obtain a set of meta-functional equations as new species of formulas in classical mathematical analysis. Mentioned species are generated by crossbreeding complete hybrid formula as a mother formula. Namely, they are generated by an infinite set of crossbreedings on some subsidiary infinite set of meta-functional equations with one neutral factor.