16: Appendix C- Analysis Topics Overview

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16.1: Introduction to Metric Spaces
This page introduces metric spaces, highlighting their significance in continuity and convergence discussions, particularly in signal processing. It explains the structure of metric spaces, including defining distances through specific functions. Various metrics, such as Euclidean and taxicab, are examined, alongside the relationship between norms and metrics. The text emphasizes how norms induce metrics in vector spaces, which are vital for analyzing signals and systems.
16.2: Convergence of Sequences
This page discusses sequences as functions defined on positive integers, highlighting examples such as real number and vector sequences. It defines convergence, stating that a sequence converges to a limit \(g\) if terms beyond a certain index are within any specified distance \(\varepsilon\) of \(g\). The sequence \(g_n=\frac{1}{n}\) is presented as converging to 0, while a sequence oscillating between 1 and -1 is noted as non-converging.
16.3: Convergence of Sequences of Vectors
This page explores vector convergence in normed spaces, differentiating between pointwise and norm convergence, with equivalence in finite dimensions but not in infinite dimensions, supported by counterexamples. It also examines the convergence of a sequence of functions \(g_n\) towards \(g\), highlighting that while \(g_n\) converges in norm as \(\frac{1}{n}\) approaches 0, it fails to converge pointwise due to oscillations at \(t=0\).
16.4: Uniform Convergence of Function Sequences
This page explains uniform convergence of function sequences from \(\mathbb{R}\) to \(\mathbb{R}\), defining it as a scenario where a single integer \(N\) ensures that \(|g_n(t) - g(t)| < \varepsilon\) for all \(t\). It provides examples to illustrate uniform convergence and a case of pointwise convergence that lacks uniformity. The page concludes that while uniform convergence ensures pointwise convergence, the opposite is not necessarily true.

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