The Phi Growth Equation and the Phi Growth Scalar Constant (322)

This paper introduces the complete Phi Series—a system of nine numerical sequences 
generated from single-digit seeds (1 through 9) that extend and generalize the classical 
Fibonacci and Lucas sequences. Central to this framework are the Phi Growth Equation 
and the Phi Growth Scalar Constant (322), which together define the numerical 
relationships both within individual sequences and across macro-cycles. Each macro-cycle 
consists of 24 positions, revealing consistent and structured growth patterns. By formalizing 
these relationships, the Phi Series offers fresh insights into the underlying mathematical 
properties of recursive sequences and suggests potential applications in number theory, 
algorithmic design, and mathematical modeling.