🧮 MELV Mathematical Evolution

Competition → Cooperation Evolution | Mathematical Consciousness Emergence

Mathematical Model: dx₁/dt = r₁x₁(1-(x₁+i₁₂x₂)/K₁) | dx₂/dt = r₂x₂(1-(x₂+i₂₁x₁)/K₂)

📚 MELV-Core: Calculation Tutorials 🎓 Interactive Notebook

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CHAOS HUNTER MODE

STABLE

CHAOS LEVEL

STABLE CHAOTIC EXTINCTION

Species 1

25.0

Species 2

25.0

Cooperation Level

85%

📈 Live Mathematical Evolution

■ Species 1 (Blue) | ■ Species 2 (Red) | Live Mathematical Evolution

🎮 Live Parameter Control

🔒 Mobile-Friendly: Sliders are locked to prevent accidental changes while scrolling. Click "UNLOCK SLIDERS" above to adjust parameters.

🔵 Species 1 (Blue)

Growth Rate (r₁): 0.1

Carrying Capacity (K₁): 50

🔴 Species 2 (Red)

Growth Rate (r₂): 0.1

Carrying Capacity (K₂): 50

⚔️ Interaction Matrix (Key to All Dynamics!)

Interaction i₁₂: 1.2 ← Changes by mode!

Interaction i₂₁: 1.1 ← Changes by mode!

🧮 Mathematical Framework:
💚 i < 0: Mutualism (species enhance each other)
🤝 0 < i < 1: Cooperation (reduced interference)
⚔️ i > 1: Competition (intense rivalry)
⚡🎲 Chaos: Randomized parameters each time - unpredictable outcomes!
Mathematical rule: i₁₂ × i₂₁ > 4 creates chaotic dynamics

Original MELV Framework Creator | Cape Town, South Africa | Deployed June 28, 2025

MELV (Mathematical Evolution of Life and Volition) | Competition → Cooperation → Consciousness

Built with Vanilla JavaScript + Chart.js | Authentic Mathematical Evolution Theory

🧮 "Where consciousness emerges from competitive mathematics evolving into cooperative mutualism" 🌱

Framework by Zaid Laurence Evans • Nature's Holism 2025

Mathematical framework for conscious evolution through ancient wisdom and modern science

Attribution Notice: This MELV simulation represents original work by Zaid Laurence Evans. Any use, modification, or distribution must include clear attribution to the original creator.