Generalised Fourier Series, Part 2: Making Series Expansions
Read OriginalThis technical article, part two of a series, details the process of creating generalized Fourier series expansions. It builds on linear algebra concepts to show how any function can be expressed as a unique series using an orthogonal basis of functions, focusing on minimizing error through inner product properties. The content is deeply mathematical and related to computational algorithms and functional analysis.
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