Multiplicative Differential Geometry Multiplicative Differential Geometry

Multiplicative Differential Geometry

    • ¥11,800
    • ¥11,800

発行者による作品情報

This book introduces multiplicative Frenet curves. We define multiplicative tangent, multiplicative normal, and multiplicative normal plane for a multiplicative Frenet curve. We investigate the local behaviours of a multiplicative parameterized curve around multiplicative biregular points, define multiplicative Bertrand curves and investigate some of their properties. A multiplicative rigid motion is introduced.

The book is addressed to instructors and graduate students, and also specialists in geometry, mathematical physics, differential equations, engineering, and specialists in applied sciences. The book is suitable as a textbook for graduate and under-graduate level courses in geometry and analysis. Many examples and problems are included.

The author introduces the main conceptions for multiplicative surfaces: multiplicative first fundamental form, the main multiplicative rules for differentiations on multiplicative surfaces, and the main multiplicative regularity conditions for multiplicative surfaces. An investigation of the main classes of multiplicative surfaces and second fundamental forms for multiplicative surfaces is also employed. Multiplicative differential forms and their properties, multiplicative manifolds, multiplicative Einstein manifolds and their properties, are investigated as well.

Many unique applications in mathematical physics, classical geometry, economic theory, and theory of time scale calculus are offered.

ジャンル
科学/自然
発売日
2022年
7月20日
言語
EN
英語
ページ数
372
ページ
発行者
CRC Press
販売元
Taylor & Francis Group
サイズ
4.5
MB
Alpha Calculus Alpha Calculus
2026年
PARTIAL DIFFERENTIAL EQUATIONS IN SOBOLEV & ANALYTIC SPACES PARTIAL DIFFERENTIAL EQUATIONS IN SOBOLEV & ANALYTIC SPACES
2025年
STIELTJES DIFFERENTIAL CALCULUS WITH APPLICATIONS STIELTJES DIFFERENTIAL CALCULUS WITH APPLICATIONS
2024年
ADVANCES ON FRACTIONAL DYNAMIC INEQUALITIES ON TIME SCALES ADVANCES ON FRACTIONAL DYNAMIC INEQUALITIES ON TIME SCALES
2023年
P(X)-BI-LAPLACIAN: APPLICATION ON TIME-PDES VISCOELASTICITY P(X)-BI-LAPLACIAN: APPLICATION ON TIME-PDES VISCOELASTICITY
2024年
General Quantum Variational Calculus General Quantum Variational Calculus
2024年