This book is devoted to the multiplicative differential calculus. It summarizes the most recent contributions in this area. The book is intended for senior undergraduate students and beginning graduate students of engineering and science courses. Two operations, differentiation and integration, are basic in calculus and analysis. In fact, they are the infinitesimal versions of the subtraction and addition operations on numbers, respectively. In the period from 1967 till 1970 Michael Grossman and Robert Katz gave definitions of a new kind of derivative and integral, moving the roles of subtraction and addition to division and multiplication, and thus established a new calculus, called multiplicative calculus. It is also called an alternative or non-Newtonian calculus. Multiplicative calculus can especially be useful as a mathematical tool for economics, finance, biology, and engineering.
This book is devoted to the multiplicative differential calculus. It summarizes the most recent contributions in this area. The book is intended for senior undergraduate students and beginning graduate students of engineering and science courses. The book contains seven chapters. The chapters in the book are pedagogically organized. Each chapter concludes with a section with practical problems. This book is addressed to a wide audience of specialists such as mathematicians, physicists, engineers, and biologists. It is primarily meant as a textbook at the graduate level and may be used for a course on differential calculus.
Each chapter concludes with a section with practical problems to be assigned or for self-study. Table of Contents 1 The Field R * 1.1 Definition 1.2 An Order in R * 1.3 Multiplicative Absolute Value 1.4 The Multiplicative Factorial. Multiplicative Binomial Coefficients 1.5 Multiplicative Functions of One Variable 1.
6 The Multiplicative Power Function 1.7 Multiplicative Trigonometric Functions 1.8 Multiplicative Inverse Trigonometric Functions 1.9 Multiplicative Hyperbolic Functions 1.10 Multiplicative Inverse Hyperbolic Functions 1.11 Multiplicative Matrices 1.12 Advanced Practical Problems 2 Multiplicative Differentiation 2.1 Definition 2.
2 Properties 2.3 Higher Order Multiplicative Derivatives 2.4 Multiplicative Differentials 2.5 Monotone Functions 2.6 Local Extremum 2.7 The Multiplicative Rolle Theorem 2.8 The Multiplicative Lagrange Theorem 2.9 The Multiplicative Cauchy Theorem 2.
10 The Multiplicative Taylor Formula 2.11 Advanced Practical Problems 3 Multiplicative Integration 3.1 Definition for the Multiplicative Improper Integral and Multiplicative Cauchy Integral 3.2 Table of the Basic Multiplicative Integrals 3.3 Properties of the Multiplicative Integrals 3.4 Multiplicative Integration by Substitution 3.5 Multiplicative Integration by Parts 3.6 Inequalities for Multiplicative Integrals 3.
7 Mean Value Theorems for Multiplicative Integrals 3.8 Advanced Practical Problems 4 Improper Multiplicative Integrals 4.1 Definition for Improper Multiplicative Integrals over Finite Intervals 4.2 Definition for Improper Multiplicative Integrals over Infinite Intervals 4.3 Properties of the Improper Multiplicative Integrals 4.4 Criteria for Comparison of Improper Multiplicative Integrals 4.5 Conditional Convergence of Improper Multiplicative Integrals 4.6 The Abel-Dirichlet Criterion 4.
7 Advanced Practical Problems 5 The Vector Space Rn 5.1 Basic Definitions 5.2 Multiplicative Linear Dependence and Independence 5.3 Multiplicative Inner Product 5.4 Multiplicative Length and Multiplicative Distance 5.5 Advanced Practical Problems 6 Partial Multiplicative Differentiation 6.1 Definition for Multiplicative Functions of Several Variables 6.2 Definition for Multiplicative Partial Derivatives 6.
3 Multiplicative Differentials 6.4 The Chain Rule 6.5 Multiplicative Homogeneous Functions 6.6 Multiplicative Directional Derivatives 6.7 Extremum of a Function 6.8 Advanced Practical Problems 7 Multiple Multiplicative Integrals 7.1 Multiplicative Integrals Depending on Parameters 7.2 Iterated Multiplicative Integrals 7.
3 Multiple Multiplicative Integrals 7.4 Multiplicative Improper Multiple Multiplicative Integrals 7.5 Advanced Practical Problems References Index Author Biographies Svetlin G. Georgiev is a mathematician who has worked in various areas of the study. He currently focuses on harmonic analysis, functional analysis, partial differential equations, ordinary differential equations, Clifford and quaternion analysis, integral equations, and dynamic calculus on time scales. He is also the author of Dynamic Geometry of Time Scales, CRC Press. He is a co-author of Conformable Dynamic Equations on Time Scales , with Douglas R. Anderson, CRC Press.
Khaled Zennir earned his PhD in mathematics from Sidi Bel Abbès University, Algeria. He received his highest diploma in Habilitation in mathematics from Constantine University, Algeria. He is currently Assistant Professor at Qassim University in the Kingdom of Saudi Arabia. His research interests lie in the subjects of nonlinear hyperbolic partial differential equations: global existence, blowup, and long-time behavior. The authors have also published: Multiple Fixed-Point Theorems and Applications in the Theory of ODEs, FDEs and PDE; Boundary Value Problems on Time Scales, Volume 1 and Volume II, all with CRC Press.