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Multiplicative generalized tube surfaces with multiplicative quaternions algebra

Hazal Ceyhan, Zehra Özdemi̇r, İsmai̇l Gök

2024Mathematical Methods in the Applied Sciences10 citationsDOIOpen Access PDF

Abstract

Along with other types of calculus, multiplicative calculus brings an entirely new perspective. Geometry now has a new field as a result of this new understanding. In this study, multiplicative differential geometry was used to explore peculiar surfaces. Multiplicative quaternions are also used to depict surfaces. Additionally, multiplicative differential geometry was used to generate the accretive surface subject, which is a developing subject. The derived surfaces' perspective silhouette curve equation is provided. The Bishop multiplicative frame was also established and applied when expressing surfaces along with these. Finally, the surfaces and perspective silhouette curves were visualized using Maple, and the equations were obtained.

Topics & Concepts

MathematicsQuaternionMultiplicative functionAlgebra over a fieldTube (container)Multiplicative inversePure mathematicsMathematical analysisGeometryInverseEngineeringMechanical engineeringAlgebraic and Geometric AnalysisAdvanced Numerical Analysis TechniquesMathematics and Applications