We all need peace , security , stability We all need peace , security , stability We all need peace , security , stability Нам потрібен Мир! Ми за Мир!! МИР!!! This publication presents two interconnected works developing the Unified Entropic Framework — an effective theoretical approach in which opposition-generated entropy is explored as a possible organizing principle connecting different scales of physical and adaptive reality. The first part establishes the conceptual foundation. It integrates four directions: Guided Symbiosis Theory (system adaptation through survival-driven dynamics), Useful Chaos (resilience and stabilization in complex systems), Entropic General Relativity (where the cosmological term is treated as entropy-dependent), and an entropic interpretation of quantum measurement. Within this perspective, nonlocality is interpreted not as a paradox but as an effective global adjustment of entropic correlations revealed during measurement. The second part proposes an effective extension of the Schrödinger framework — the Entropic Schrödinger Equation — introducing additional terms intended to model survival dynamics and adaptive entropy processes while remaining consistent with the standard quantum limit. The proposed framework is not intended as a complete microscopic theory. Instead, it outlines a research direction aimed at identifying invariant entropic structures linking information, adaptation, and physical dynamics across scales. The work serves as a conceptual basis for further mathematical development, phenomenological modeling, and possible empirical exploration. P.S. I remain an independent researcher. I invite you to support this project to accelerate the release of subsequent parts and the further development of this architecture. Your contribution ensures the independence of these findings. Donations / Crypto Support: BTC: bc1q5y3aspsjtnp85sqqzze6m90xgrt8uy6kwqxrrl ETH: (ERC 20) 0xe0b139C553c44C4A0a6140EfAE28b4433aB53C97 USDT (TRC20): TJ8NjQxHLepPBiBpCDCnKzosQszPum2VDa
Yaroslav Isachenkov (Mon,) studied this question.