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This textbook offers a comprehensive introduction to the fundamental principles of signals and systems, with balanced coverage of both continuous-time and discrete-time domains. It begins with the basic classification and operations on signals (Chapter 1) and systems (Chapter 2), laying a solid foundation for understanding linear, time-invariant behavior.

Chapters 3 and 4 provide detailed time-domain analysis of systems, including impulse responses, convolution, and difference/differential equations, with an emphasis on BIBO stability and eigenfunctions.

The core of the text (Chapters 5–9) is dedicated to Fourier analysis, beginning with periodic signals (Fourier Series) and extending to aperiodic signals (Fourier Transforms) in both continuous and discrete time. These chapters also explore the properties of transforms, circular convolution, and convergence issues such as Gibbs phenomena.

Chapter 10 introduces sampling and signal reconstruction, including the sampling theorem, aliasing, and anti-aliasing filters, and explains how discrete-time processing can be applied to continuous-time signals.

Chapters 11 and 12 delve into system analysis and design using the Laplace Transform and Z-Transform, covering pole-zero analysis, regions of convergence, and filter design techniques.

Chapter 13 serves as a capstone, introducing modern signal processing tools such as the Fast Fourier Transform (FFT) and matched filtering for detection.

The textbook concludes with four appendices:

Appendix A covers key linear algebra concepts, especially eigenvalue problems and diagonalization.
Appendix B provides a foundation in Hilbert spaces, norms, inner products, orthonormal bases, and function space theory.
Appendix C introduces essential analysis topics, including convergence in metric spaces and uniform convergence of function sequences.
Appendix D gives instructions for interactive content viewing, including LabVIEW and Mathematica integration.

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