Đã lưu trong:
| Tác giả chính: | |
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| Định dạng: | Recurso digital |
| Ngôn ngữ: | |
| Được phát hành: |
Zenodo
2025
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| Những chủ đề: | |
| Truy cập trực tuyến: | https://doi.org/10.5281/zenodo.17731632 |
| Các nhãn: |
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Mục lục:
- <p>This paper introduces a relational and model-independent formulation for open systems within the Hermes Structural Framework (HSF). Building on the minimal structural operator set, we define the structural divergence</p> <p>\Delta_\Lambda(\Phi) = \nabla\cdot\Phi + (\nabla\Lambda / \Lambda)\cdot\Phi</p> <p>and derive a universal three-regime classification of structural stability: fixed points, structural flow regimes, and divergence-driven transition regimes.</p> <p> </p> <p>The formulation is purely mathematical and independent of physical interpretation, geometry, or energetic assumptions. It provides a general operator-level foundation for analysing open systems and is fully compatible with previously published HSF papers on operator algebra, computational structural analysis, and structural field formulations.</p>