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by Vladimir V. Mitin, Micheal P. Polis and Dimitri Romanov

Edition: 01Copyright: 2001

Publisher: John Wiley & Sons, Inc.

Published: 2001

International: No

Vladimir V. Mitin, Micheal P. Polis and Dimitri Romanov

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A convenient single source for vital mathematical concepts, written by engineers and for engineers

Almost every discipline in electrical and computer engineering relies heavily on advanced mathematics. Modern Advanced Mathematics for Engineers builds a strong foundation in modern applied mathematics for engineering students, and offers them a concise and comprehensive treatment that summarizes and unifies their mathematical knowledge using a system focused on basic concepts rather than exhaustive theorems and proofs.

The authors provide several levels of explanation and exercises involving increasing degrees of mathematical difficulty to recall and develop basic topics such as calculus, determinants, Gaussian elimination, differential equations, and functions of a complex variable. They include an assortment of examples ranging from simple illustrations to highly involved problems as well as a number of applications that demonstrate the concepts and methods discussed throughout the book. This broad treatment also offers: *Key mathematical tools needed by engineers working in communications, semiconductor device simulation, and control theory *Concise coverage of fundamental concepts such as sets, mappings, and linearity *Thorough discussion of topics such as distance, inner product, and orthogonality *Essentials of operator equations, theory of approximations, transform methods, and *partial differential equations *A treatment that is adaptable for use with computer systems

Modern Advanced Mathematics for Engineers gives students a strong foundation in modern applied mathematics and the confidence to apply it across diverse engineering disciplines. It makes an excellent companion to less general engineering texts and a useful reference for practitioners.

**Mitin, Vladimir V. : Wayne State University**

Vladimir V. Mitin is Professors in the Department of Electrical and Computer Engineering at Wayne State University.

**Romanov, Dmitri : Wayne State University**

** **Dmitri Romanov is Professors in the Department of Electrical and Computer Engineering at Wayne State University.

**Polis, Michael P. : Oakland University in Michigan**

Michael P. Polis is Professor in the School of Engineering and Computer Science at Oakland University in Michigan.

Dedication.

Preface.

The Basic of Set Theory.

Relations and Mappings.

Mathematical Logic.

Algebraic Structures: Group Through Linear Space.

Linear Mappings and Matrices.

Metrics and Topological Properties.

Banach and Hilbert Spaces.

Orthonormal Bases and Fourier Series.

Operator Equations.

Fourier and Laplace Transforms.

Partial Differential Equations.

Topic Index.

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Summary

A convenient single source for vital mathematical concepts, written by engineers and for engineers

Almost every discipline in electrical and computer engineering relies heavily on advanced mathematics. Modern Advanced Mathematics for Engineers builds a strong foundation in modern applied mathematics for engineering students, and offers them a concise and comprehensive treatment that summarizes and unifies their mathematical knowledge using a system focused on basic concepts rather than exhaustive theorems and proofs.

The authors provide several levels of explanation and exercises involving increasing degrees of mathematical difficulty to recall and develop basic topics such as calculus, determinants, Gaussian elimination, differential equations, and functions of a complex variable. They include an assortment of examples ranging from simple illustrations to highly involved problems as well as a number of applications that demonstrate the concepts and methods discussed throughout the book. This broad treatment also offers: *Key mathematical tools needed by engineers working in communications, semiconductor device simulation, and control theory *Concise coverage of fundamental concepts such as sets, mappings, and linearity *Thorough discussion of topics such as distance, inner product, and orthogonality *Essentials of operator equations, theory of approximations, transform methods, and *partial differential equations *A treatment that is adaptable for use with computer systems

Modern Advanced Mathematics for Engineers gives students a strong foundation in modern applied mathematics and the confidence to apply it across diverse engineering disciplines. It makes an excellent companion to less general engineering texts and a useful reference for practitioners.

Author Bio

**Mitin, Vladimir V. : Wayne State University**

Vladimir V. Mitin is Professors in the Department of Electrical and Computer Engineering at Wayne State University.

**Romanov, Dmitri : Wayne State University**

** **Dmitri Romanov is Professors in the Department of Electrical and Computer Engineering at Wayne State University.

**Polis, Michael P. : Oakland University in Michigan**

Michael P. Polis is Professor in the School of Engineering and Computer Science at Oakland University in Michigan.

Table of Contents

Dedication.

Preface.

The Basic of Set Theory.

Relations and Mappings.

Mathematical Logic.

Algebraic Structures: Group Through Linear Space.

Linear Mappings and Matrices.

Metrics and Topological Properties.

Banach and Hilbert Spaces.

Orthonormal Bases and Fourier Series.

Operator Equations.

Fourier and Laplace Transforms.

Partial Differential Equations.

Topic Index.

Publisher Info

Publisher: John Wiley & Sons, Inc.

Published: 2001

International: No

Published: 2001

International: No

A convenient single source for vital mathematical concepts, written by engineers and for engineers

Almost every discipline in electrical and computer engineering relies heavily on advanced mathematics. Modern Advanced Mathematics for Engineers builds a strong foundation in modern applied mathematics for engineering students, and offers them a concise and comprehensive treatment that summarizes and unifies their mathematical knowledge using a system focused on basic concepts rather than exhaustive theorems and proofs.

The authors provide several levels of explanation and exercises involving increasing degrees of mathematical difficulty to recall and develop basic topics such as calculus, determinants, Gaussian elimination, differential equations, and functions of a complex variable. They include an assortment of examples ranging from simple illustrations to highly involved problems as well as a number of applications that demonstrate the concepts and methods discussed throughout the book. This broad treatment also offers: *Key mathematical tools needed by engineers working in communications, semiconductor device simulation, and control theory *Concise coverage of fundamental concepts such as sets, mappings, and linearity *Thorough discussion of topics such as distance, inner product, and orthogonality *Essentials of operator equations, theory of approximations, transform methods, and *partial differential equations *A treatment that is adaptable for use with computer systems

Modern Advanced Mathematics for Engineers gives students a strong foundation in modern applied mathematics and the confidence to apply it across diverse engineering disciplines. It makes an excellent companion to less general engineering texts and a useful reference for practitioners.

**Mitin, Vladimir V. : Wayne State University**

Vladimir V. Mitin is Professors in the Department of Electrical and Computer Engineering at Wayne State University.

**Romanov, Dmitri : Wayne State University**

** **Dmitri Romanov is Professors in the Department of Electrical and Computer Engineering at Wayne State University.

**Polis, Michael P. : Oakland University in Michigan**

Michael P. Polis is Professor in the School of Engineering and Computer Science at Oakland University in Michigan.

Preface.

The Basic of Set Theory.

Relations and Mappings.

Mathematical Logic.

Algebraic Structures: Group Through Linear Space.

Linear Mappings and Matrices.

Metrics and Topological Properties.

Banach and Hilbert Spaces.

Orthonormal Bases and Fourier Series.

Operator Equations.

Fourier and Laplace Transforms.

Partial Differential Equations.

Topic Index.