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1. Process dynamics and control [2017]
 Seborg, Dale E. author.
 Fourth edition.  Hoboken, NJ : John Wiley & Sons, Inc., [2017]
 Description
 Book — ix, 502 pages : illustrations ; 25 cm
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

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TP155.75 .S43 2017  Unknown On reserve at Li and Ma Science Library 2hour loan 
CHEMENG10001
 Course
 CHEMENG10001  Chemical Process Modeling, Dynamics, and Control
 Instructor(s)
 Shaqfeh, Eric Stefan
 Boyce, William E.
 Tenth edition.  Hoboken, NJ : Wiley, [2012]
 Description
 Book — xix, 809 pages : illustrations ; 27 cm
 Summary

 Chapter 1 Introduction
 1 1.1 Some Basic Mathematical Models Direction Fields
 1 1.2 Solutions of Some Differential Equations
 10 1.3 Classification of Differential Equations
 19 1.4 Historical Remarks
 26
 Chapter 2 First Order Differential Equations
 31 2.1 Linear Equations Method of Integrating Factors
 31 2.2 Separable Equations
 42 2.3 Modeling with First Order Equations
 51 2.4 Differences Between Linear and Nonlinear Equations
 68 2.5 Autonomous Equations and Population Dynamics
 78 2.6 Exact Equations and Integrating Factors
 95 2.7 Numerical Approximations: Euler's Method
 102 2.8 The Existence and Uniqueness Theorem
 112 2.9 First Order Difference Equations
 122
 Chapter 3 Second Order Linear Equations
 137 3.1 Homogeneous Equations with Constant Coefficients
 137 3.2 Solutions of Linear Homogeneous Equations the Wronskian
 145 3.3 Complex Roots of the Characteristic Equation
 158 3.4 Repeated Roots Reduction of Order
 167 3.5 Nonhomogeneous Equations Method of Undetermined Coefficients
 175 3.6 Variation of Parameters
 186 3.7 Mechanical and Electrical Vibrations
 192 3.8 Forced Vibrations
 207
 Chapter 4 Higher Order Linear Equations
 221 4.1 General Theory of nth Order Linear Equations
 221 4.2 Homogeneous Equations with Constant Coefficients
 228 4.3 The Method of Undetermined Coefficients
 236 4.4 The Method of Variation of Parameters
 241
 Chapter 5 Series Solutions of Second Order Linear Equations
 247 5.1 Review of Power Series
 247 5.2 Series Solutions Near an Ordinary Point, Part I
 254 5.3 Series Solutions Near an Ordinary Point, Part II
 265 5.4 Euler Equations Regular Singular Points
 272 5.5 Series Solutions Near a Regular Singular Point, Part I
 282 5.6 Series Solutions Near a Regular Singular Point, Part II
 288 5.7 Bessel's Equation
 296
 Chapter 6 The Laplace Transform
 309 6.1 Definition of the Laplace Transform
 309 6.2 Solution of Initial Value Problems
 317 6.3 Step Functions
 327 6.4 Differential Equations with Discontinuous Forcing Functions
 336 6.5 Impulse Functions
 343 6.6 The Convolution Integral
 350
 Chapter 7 Systems of First Order Linear Equations
 359 7.1 Introduction
 359 7.2 Review of Matrices
 368 7.3 Systems of Linear Algebraic Equations Linear Independence, Eigenvalues, Eigenvectors
 378 7.4 Basic Theory of Systems of First Order Linear Equations
 390 7.5 Homogeneous Linear Systems with Constant Coefficients
 396 7.6 Complex Eigenvalues
 408 7.7 Fundamental Matrices
 421 7.8 Repeated Eigenvalues
 429 7.9 Nonhomogeneous Linear Systems
 440
 Chapter 8 Numerical Methods
 451 8.1 The Euler or Tangent Line Method
 451 8.2 Improvements on the Euler Method
 462 8.3 The RungeKutta Method
 468 8.4 Multistep Methods
 472 8.5 Systems of First Order Equations
 478 8.6 More on Errors Stability
 482
 Chapter 9 Nonlinear Differential Equations and Stability
 495 9.1 The Phase Plane: Linear Systems
 495 9.2 Autonomous Systems and Stability
 508 9.3 Locally Linear Systems
 519 9.4 Competing Species
 531 9.5 PredatorPrey Equations
 544 9.6 Liapunov's Second Method
 554 9.7 Periodic Solutions and Limit Cycles
 565 9.8 Chaos and Strange Attractors: The Lorenz Equations
 577
 Chapter 10 Partial Differential Equations and Fourier Series
 589 10.1 TwoPoint Boundary Value Problems
 589 10.2 Fourier Series
 596 10.3 The Fourier Convergence Theorem
 607 10.4 Even and Odd Functions
 614 10.5 Separation of Variables Heat Conduction in a Rod
 623 10.6 Other Heat Conduction Problems
 632 10.7 TheWave Equation: Vibrations of an Elastic String
 643 10.8 Laplace's Equation
 658 AppendixA Derivation of the Heat Conduction Equation
 669 Appendix B Derivation of theWave Equation
 673
 Chapter 11 Boundary Value Problems and SturmLiouville Theory
 677 11.1 The Occurrence of TwoPoint Boundary Value Problems
 677 11.2 SturmLiouville Boundary Value Problems
 685 11.3 Nonhomogeneous Boundary Value Problems
 699 11.4 Singular SturmLiouville Problems
 714 11.5 Further Remarks on the Method of Separation of Variables: A Bessel Series Expansion
 721 11.6 Series of Orthogonal Functions: Mean Convergence
 728 Answers to Problems
 739 Index 799.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA371 .B773 2012  Unknown On reserve at Li and Ma Science Library 2hour loan 
QA371 .B773 2012  Unknown On reserve at Li and Ma Science Library 2hour loan 
CHEMENG10001
 Course
 CHEMENG10001  Chemical Process Modeling, Dynamics, and Control
 Instructor(s)
 Shaqfeh, Eric Stefan
3. Process systems analysis and control [2009]
 LeBlanc, Steven E.
 3rd ed.  Boston : McGrawHill Higher Education, ©2009.
 Description
 Book — xx, 602 pages : illustrations ; 24 cm.
 Summary

 Ch. 1. Introductory Concepts
 pt. I. Modeling for Process Dynamics
 Ch. 2. Modeling Tools for Process Dynamics
 Ch. 3. Inversion by Partial Fractions
 pt. II. Linear OpenLoop Systems
 Ch. 4. Response of FirstOrder Systems
 Ch. 5. Physical Examples of FirstOrder Systems
 Ch. 6. Response of FirstOrder Systems in Series
 Ch. 7. HigherOrder Systems: SecondOrder and Transportation Lag
 pt. III. Linear ClosedLoop Systems
 Ch. 8. The Control System
 Ch. 9. Controllers and Final Control Elements
 Ch. 10. Block Diagram of a ChemicalReactor Control System
 Ch. 11. ClosedLoop Transfer Functions
 Ch. 12. Transient Response of Simple Control Systems
 Ch. 13. Stability
 Ch. 14. Root Locus.
(source: Nielsen Book Data)
Process Systems Analysis and Control, third edition retains the clarity of presentation for which this book is well known. It is an ideal teaching and learning tool for a semesterlong undergraduate chemical engineering course in process dynamics and control. It avoids the encyclopedic approach of many other texts on this topic. Computer examples using MATLAB(R) and Simulink(R) have been introduced throughout the book to supplement and enhance standard handsolved examples. These packages allow the easy construction of block diagrams and quick analysis of control concepts to enable the student to explore "whatif" type problems that would be much more difficult and time consuming by hand.
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
TP155.75 .C68 2009  Unknown On reserve at Li and Ma Science Library 2hour loan 
CHEMENG10001
 Course
 CHEMENG10001  Chemical Process Modeling, Dynamics, and Control
 Instructor(s)
 Shaqfeh, Eric Stefan
4. Advanced engineering mathematics [1998]
 Greenberg, Michael D., 1935
 2nd ed.  Upper Saddle River, N.J. : Prentice Hall, c1998.
 Description
 Book — xix, 1324 p. : ill. ; 26 cm.
 Summary

 I. ORDINARY DIFFERENTIAL EQUATIONS.
 1. Introduction to Differential Equations.
 2. Equations of First Order.
 3. Linear Differential Equations of Second Order and Higher.
 4. Power Series Solutions.
 5. Laplace Transform.
 6. Quantitative Methods: Numerical Solution of Differential Equations.
 7. Qualitative Methods: Phase Plane and Nonlinear Differential Equations. II. LINEAR ALGEBRA.
 8. Systems of Linear Algebraic Equations Gauss Elimination.
 9. Vector Space.
 10. Matrices and Linear Equations.
 11. The Eigenvalue Problem.
 12. Extension to Complex Case (Optional). III. SCALAR and VECTOR FIELD THEORY.
 13. Differential Calculus of Functions of Several Variables.
 14. Vectors in 3Space. 15.Curves, Surfaces, and Volumes.
 16. Scalar and Vector Field Theory. IV. FOURIER SERIES AND PARTIAL DIFFERENTIAL EQUATIONS.
 17. Fourier Series, Fourier Integral, Fourier Transform.
 18. Diffusion Equation.
 19. Wave Equation.
 20. Laplace Equation. V. COMPLEX VARIABLE THEORY.
 21. Functions of a Complex Variable.
 22. Conformal Mapping.
 23. The Complex Integral Calculus.
 24. Taylor Series, Laurent Series, and the Residue Theorem. Appendix A: Review of Partial Fraction Expansions. Appendix B: Existence and Uniqueness of Solutions of Systems of Linear Algebraic Equations. Appendix C: Table of Laplace Transforms. Appendix D: Table of Fourier Transforms. Appendix E: Table of Fourier Cosine and Sine Transforms. Appendix F: Table of Conformal Maps.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
TA330 .G725 1998  Unknown On reserve at Li and Ma Science Library 2hour loan 
TA330 .G725 1998  Unknown On reserve at Li and Ma Science Library 2hour loan 
TA330 .G725 1998  Unknown On reserve at Li and Ma Science Library 2hour loan 
TA330 .G725 1998  Unknown On reserve at Li and Ma Science Library 2hour loan 
TA330 .G725 1998  Unknown On reserve at Li and Ma Science Library 2hour loan 
CHEMENG10001
 Course
 CHEMENG10001  Chemical Process Modeling, Dynamics, and Control
 Instructor(s)
 Shaqfeh, Eric Stefan
5. Advanced calculus for applications [1976]
 Hildebrand, Francis Begnaud.
 2d ed.  Englewood Cliffs, N.J. : PrenticeHall, c1976.
 Description
 Book — xiii, 733 p. : ill. ; 24 cm.
 Summary

 1. Ordinary Differential Equations.
 2. The Laplace Transform.
 3. Numerical Methods for Solving Ordinary Differential Equations.
 4. Series Solutions of Differential Equations Special Functions. BoundaryValue Problems and CharacteristicFunction Representations.
 5. Vector Analysis.
 6. Topics in HigherDimensional Calculus.
 7. Partial Differential Equations.
 8. Solutions of Partial Differential Equations.
 9. Solutions of Partial Differential Equations of Mathematical Physics.
 10. Functions of a Complex Variable.
 11. Applications of Analytic Function Theory.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA303 .H55 1976  Unknown On reserve at Li and Ma Science Library 2hour loan 
QA303 .H55 1976  Unknown On reserve at Li and Ma Science Library 2hour loan 
QA303 .H55 1976  Unknown On reserve at Li and Ma Science Library 2hour loan 
CHEMENG10001
 Course
 CHEMENG10001  Chemical Process Modeling, Dynamics, and Control
 Instructor(s)
 Shaqfeh, Eric Stefan