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Main Author: Couey, Vincent Wesley
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.17095
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author Couey, Vincent Wesley
author_facet Couey, Vincent Wesley
contents Many engineering failures in orientation-dependent systems are geometric failure modes: changing the geometry can eliminate what changing the material merely delays. The mono-monostatic property (exactly one stable equilibrium under gravity) is mathematically proven to exist in convex homogeneous bodies, but no verified geometry has been openly published. We introduce an Equilibrium Count Score (ECS) oracle measuring stable equilibria via drainage basin analysis on the center-of-mass height landscape. Applying this oracle to Sloan's (2023) analytical Gomboc parameterization, we find that no tested parameter value produces a mono-monostatic body. The surface function has two critical points as proven, but the COM height landscape exhibits 4-11 local minima. Surface critical points are necessary but not sufficient for mono-monostatic behavior. We close this gap by extending the Sloan phase function with Fourier terms and optimizing via differential evolution, constructing three verified mono-monostatic bodies with ECS=1 confirmed across merge thresholds from 0.5% to 10%. The primary instance (beta=0.023, a1=0.234) is the first openly published, computationally verified mono-monostatic geometry. The central result: conventional geometries cannot achieve ECS=1 through ballast alone. Cylinders retain multiple equilibria even at 30% bottom-weighted mass. Applied to IMU calibration housing (349x precision improvement, zero prior art), aerial reforestation seed pods (eliminating 20-67% germination loss from orientation), and marine buoy self-righting. Cross-layer scoring confirms the Gomboc is 11.8x worse than the cylinder on contact distribution while optimal on equilibrium stability, demonstrating framework discrimination across three invariant classes.
format Preprint
id arxiv_https___arxiv_org_abs_2604_17095
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Computational Construction and Engineering Evaluation of Verified Mono-Monostatic Bodies
Couey, Vincent Wesley
Computational Engineering, Finance, and Science
52A15, 70E18, 74M15
Many engineering failures in orientation-dependent systems are geometric failure modes: changing the geometry can eliminate what changing the material merely delays. The mono-monostatic property (exactly one stable equilibrium under gravity) is mathematically proven to exist in convex homogeneous bodies, but no verified geometry has been openly published. We introduce an Equilibrium Count Score (ECS) oracle measuring stable equilibria via drainage basin analysis on the center-of-mass height landscape. Applying this oracle to Sloan's (2023) analytical Gomboc parameterization, we find that no tested parameter value produces a mono-monostatic body. The surface function has two critical points as proven, but the COM height landscape exhibits 4-11 local minima. Surface critical points are necessary but not sufficient for mono-monostatic behavior. We close this gap by extending the Sloan phase function with Fourier terms and optimizing via differential evolution, constructing three verified mono-monostatic bodies with ECS=1 confirmed across merge thresholds from 0.5% to 10%. The primary instance (beta=0.023, a1=0.234) is the first openly published, computationally verified mono-monostatic geometry. The central result: conventional geometries cannot achieve ECS=1 through ballast alone. Cylinders retain multiple equilibria even at 30% bottom-weighted mass. Applied to IMU calibration housing (349x precision improvement, zero prior art), aerial reforestation seed pods (eliminating 20-67% germination loss from orientation), and marine buoy self-righting. Cross-layer scoring confirms the Gomboc is 11.8x worse than the cylinder on contact distribution while optimal on equilibrium stability, demonstrating framework discrimination across three invariant classes.
title Computational Construction and Engineering Evaluation of Verified Mono-Monostatic Bodies
topic Computational Engineering, Finance, and Science
52A15, 70E18, 74M15
url https://arxiv.org/abs/2604.17095