Linear Systems Theory is a comprehensive text that presents a mathematically rigorous development of important tools of linear systems theory. These tools include differential and difference equations, Laplace and Z transforms, state space and transfer function representations, stability, controllability and observability, duality, canonical forms, realizability, minimal realizations, observers, feedback compensators, nonnegative systems, Kalman filters, and adaptive control and neural networks.

Review:

"Szidarovszky and Bahill differentiate their work from others on systems theory as more vigorously mathematical, more broadly theoretical, and based on computer-oriented rather than graphical methods." -Booknews, Inc.

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