دانلود کتاب Mathematics For Circuits And Filters
کتاب ریاضیات برای مدارها و فیلترها نسخه زبان اصلی
دانلود کتاب ریاضیات برای مدارها و فیلترها بعد از پرداخت مقدور خواهد بود
توضیحات کتاب در بخش جزئیات آمده است و می توانید موارد را مشاهده فرمایید
توضیحاتی در مورد کتاب Mathematics For Circuits And Filters
نام کتاب : Mathematics For Circuits And Filters
عنوان ترجمه شده به فارسی : ریاضیات برای مدارها و فیلترها
سری :
نویسندگان : Wai-Kai Chen
ناشر : CRC Press
سال نشر : 2000
تعداد صفحات : 274
ISBN (شابک) : 9780849300523 , 9781315214023
زبان کتاب : English
فرمت کتاب : pdf
حجم کتاب : 9 مگابایت
بعد از تکمیل فرایند پرداخت لینک دانلود کتاب ارائه خواهد شد. درصورت ثبت نام و ورود به حساب کاربری خود قادر خواهید بود لیست کتاب های خریداری شده را مشاهده فرمایید.
فهرست مطالب :
Cover
Half Title
Title
Copyright
Preface
Contributors
Contents
1 Linear Operators and Matrices
1.1 Introduction
1.2 Vector Spaces Over Fields
1.3 Linear Operators and Matrix Representations
1.4 Matrix Operations
1.5 Determinant, Inverse, and Rank
1.6 Basis Transformations
1.7 Characteristics: Eigenvalues, Eigenvectors, and Singular Values
1.8 On Linear Systems
2 Bilinear Operators and Matrices
2.1 Introduction
2.2 Algebras
2.3 Bilinear Operators
2.4 Tensor Product
2.5 Basis Tensors
2.6 Multiple Products
2.7 Determinants
2.8 Skew Symmetric Products
2.9 Solving Linear Equations
2.10 Symmetric Products
2.11 Summary
3 The Laplace Transform
3.1 Introduction
3.2 Motivational Example
3.3 Formal Developments
3.4 Laplace Transform Analysis of Linear Systems
3.5 Conclusions and Further Reading
3.6 Appendix A: The Dirac Delta (Impulse) Function
3.7 Appendix B: Relationships among the Laplace, Fourier, and z-Transforms
4 Fourier Series, Fourier Transforms and the DFT
4.1 Introduction
4.2 Fourier Series Representation of Continuous Time Periodic Signals
4.3 The Classical Fourier Transform for Continuous Time Signals
4.4 The Discrete Time Fourier Transform
4.5 The Discrete Fourier Transform
4.6 Family Tree of Fourier Transforms
4.7 Selected Applications of Fourier Methods
4.8 Summary
5 z-Transform
5.1 Introduction
5.2 Definition of the z-Transform
5.3 Inverse z-Transform
5.4 Properties of the z-Transform
5.5 Role of the z-Transform in Linear Time-Invariant Systems
5.6 Variations on the z-Transform
5.7 Concluding Remarks
6 Wavelet Transforms
6.1 Introduction
6.2 Signal Representation Using Basis Functions
6.3 The Short-Time Fourier Transform
6.4 Digital Filter Banks and Subband Coders
6.5 Deeper Study of Wavelets, Filter Banks, and Short-Time Fourier Transforms
6.6 The Space of L1 and L2 Signals
6.7 Riesz Basis, Biorthogonality, and Other Fine Points
6.8 Frames in Hilbert Spaces
6.9 Short-Time Fourier Transform: Invertibility, Orthonormality, and Localization
6.10 Wavelets and Multiresolution
6.11 Orthonormal Wavelet Basis from Para unitary Filter Banks
6.12 Compactly Supported Orthonormal Wavelets
6.13 Wavelet Regularity
6.14 Concluding Remarks
7 Graph Theory
7.1 Introduction
7.2 Basic Concepts
7.3 Cuts, Circuits, and Orthogonality
7.4 Incidence, Circuit, and Cut Matrices of a Graph
7.5 Orthogonality Relation and Ranks of Circuit and Cut Matrices
7.6 Spanning Tree Enumeration
7.7 Graphs and Electrical Networks
7.8 Tellegen\'s Theorem and Network Sensitivity Computation
7.9 Arc Coloring Theorem and the No-Gain Property
8 Signal Flow Graphs
8.1 Introduction
8.2 Adjacency Matrix of a Directed Graph
8.3 Coates\' Gain Formula
8.4 Mason\'s Gain Formula
Index
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