This preprint formalizes a ten-face non-edge-sharing triangular wing arrangement on a regular icosahedron under a pole-anchored geometric framework. The work proves that the pole-opposite edge midpoints form a perfectly balanced regular decagon on the equatorial plane with closed-form radius R = (phi/2)l, where l is the icosahedron edge length and phi is the golden ratio. The paper establishes a reproducible geometric construction workflow suitable for CAD and parametric geometry implementations. Submitted to Discrete & Computational Geometry.
Young June Jeon (Wed,) studied this question.