From Euclidian to Hilbert Spaces analyzes the transition from
finite dimensional Euclidian spaces to infinite-dimensional Hilbert
spaces, a notion that can sometimes be difficult for
non-specialists to grasp. The focus is on the parallels and
differences between the properties of the finite and infinite
dimensions, noting the fundamental importance of coherence between
the algebraic and topological structure, which makes Hilbert spaces
the infinite-dimensional objects most closely related to Euclidian
spaces. The common thread of this book is the Fourier transform,
which is examined starting from the discrete Fourier transform
(DFT), along with its applications in signal and image processing,
passing through the Fourier series and finishing with the use of
the Fourier transform to solve differential equations. The
geometric structure of Hilbert spaces and the most significant
properties of bounded linear operators in these spaces are also
covered extensively. The theorems are presented with detailed
proofs as well as meticulously explained exercises and solutions,
with the aim of illustrating the variety of applications of the
theoretical results.
General
| Imprint: |
Iste
|
| Country of origin: |
United Kingdom |
| Release date: |
September 2021 |
| First published: |
2021 |
| Authors: |
E Provenzi
|
| Dimensions: |
234 x 156 x 21mm (L x W x T) |
| Format: |
Hardcover
|
| Pages: |
368 |
| ISBN-13: |
978-1-78630-682-1 |
| Categories: |
Books >
Science & Mathematics >
Mathematics >
General
Promotions
|
| LSN: |
1-78630-682-4 |
| Barcode: |
9781786306821 |
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