Manifold optimization is an emerging field of contemporary
optimization that constructs efficient and robust algorithms
by exploiting the specific geometrical structure of the
search space. In our case the search space takes the form of
a manifold. Manifold optimization methods mainly focus
on adapting existing optimization methods from the usual
“easy-to-deal-with” Euclidean search spaces to
manifolds whose local geometry can be defined e.g. by a
Riemannian structure. In this way the form of the adapted
algorithms can stay unchanged. However, to accommodate the
adaptation process, assumptions on the search space manifold often
have to be made. In addition, the computations and
estimations are confined by the local geometry. This book
presents a framework for population-based optimization on
Riemannian manifolds that overcomes both the constraints of
locality and additional assumptions. Multi-modal, black-box
manifold optimization problems on Riemannian manifolds can be
tackled using zero-order stochastic optimization methods from a
geometrical perspective, utilizing both the statistical
geometry of the decision space and Riemannian geometry of the
search space. This monograph presents in a self-contained manner
both theoretical and empirical aspects of stochastic
population-based optimization on abstract
Riemannian manifolds.
General
| Imprint: |
Springer International Publishing AG
|
| Country of origin: |
Switzerland |
| Series: |
Studies in Computational Intelligence, 1046 |
| Release date: |
May 2023 |
| Firstpublished: |
2022 |
| Authors: |
Robert Simon Fong
• Peter Tino
|
| Dimensions: |
235 x 155mm (L x W) |
| Pages: |
168 |
| Edition: |
1st ed. 2022 |
| ISBN-13: |
978-3-03-104295-9 |
| Categories: |
Books
Promotions
|
| LSN: |
3-03-104295-6 |
| Barcode: |
9783031042959 |
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