Litcius/Paper detail

Ze System Generates Ze System

Jaba Tkemaladze

2026Longevity Horizon8 citationsDOIOpen Access PDF

Abstract

The Ze framework represents spacetime as a statistical partitioning of a binary event stream into T-events (state repetitions) and S-events (state transitions), from which proper time tau = sqrt(T^2 - X^2) and velocity v = N_S / N are derived in direct analogy with the Minkowski interval. This paper investigates a new phenomenon: a Ze system Ze1 can generate a daughter Ze system Ze2 by re-encoding the run-length parities of its S-events. We derive the analytical formula v2 = 2(1-v1)/(2-v1)^2 and verify it against simulation data (N = 5 x 10^6, nine velocity values) with residuals below 5 x 10^-4. The map f(v) = 2(1-v)/(2-v)^2 has a unique stable fixed point v* = 0.45631 governed by the cubic equation u^3 - 2u^2 + 2u - 2 = 0 (u = 2 - v*). The Ze cascade Ze1 -> Ze2 -> Ze3 -> ... converges numerically to v*, confirming the fixed-point prediction. An exact algebraic conservation law holds for any partition of Ze1: tau1^2 = tau2^2 + tau3^2 + 2 T2 T3 (1 - v2 v3), verified with relative error < 10^-6. The paper presents four falsifiable predictions of the cascade theory.

Topics & Concepts

CascadeMathematicsMinkowski spaceBinary numberMathematical analysisApplied mathematicsPoint (geometry)Algebraic equationPartition (number theory)Algebraic numberPhysicsAnalogyDivision (mathematics)Truncation (statistics)Event (particle physics)Discrete time and continuous timeStatistical physicsBinary systemCold Fusion and Nuclear ReactionsEarth Systems and Cosmic EvolutionQuantum and Classical Electrodynamics