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作 者:Emmanuel Cadier Anaxhaoza Emmanuel Cadier Anaxhaoza(Shiva’s Technologies Institute, Smith River, California, USA)
机构地区:[1]Shiva’s Technologies Institute, Smith River, California, USA
出 处:《Advances in Pure Mathematics》2023年第9期543-551,共9页理论数学进展(英文)
摘 要:Polysurfacic tori or kideas are three-dimensional objects formed by rotating a regular polygon around a central axis. These toric shapes are referred to as “polysurfacic” because their characteristics, such as the number of sides or surfaces separated by edges, can vary in a non-trivial manner depending on the degree of twisting during the revolution. We use the term “Kideas” to specifically denote these polysurfacic tori, and we represent the number of sides (referred to as “facets”) of the original polygon followed by a point, while the number of facets from which the torus is twisted during its revolution is indicated. We then explore the use of concave regular polygons to generate Kideas. We finally give acceleration for the algorithm for calculating the set of prime numbers.Polysurfacic tori or kideas are three-dimensional objects formed by rotating a regular polygon around a central axis. These toric shapes are referred to as “polysurfacic” because their characteristics, such as the number of sides or surfaces separated by edges, can vary in a non-trivial manner depending on the degree of twisting during the revolution. We use the term “Kideas” to specifically denote these polysurfacic tori, and we represent the number of sides (referred to as “facets”) of the original polygon followed by a point, while the number of facets from which the torus is twisted during its revolution is indicated. We then explore the use of concave regular polygons to generate Kideas. We finally give acceleration for the algorithm for calculating the set of prime numbers.
关 键 词:Heavenly Things Topology Euclidian Geometry Möbius Strip Emmanuel’s Tori YiBoLong’s Tori Cadier’s Tori Möbius Tori Polysurfacic Tori Kideas The Keys KideaCross KideaStar Churros Algorithm for Calculating the Set of Prime Numbers P The Last Found Element of P
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