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Discrete energy on rectifiable sets

Borodachov, Sergiy V.

Discrete energy on rectifiable sets

紀錄類型:	書目-電子資源 : Monograph/item
正題名/作者:	Discrete energy on rectifiable setsby Sergiy V. Borodachov, Douglas P. Hardin, Edward B. Saff.
作者:	Borodachov, Sergiy V.
其他作者:	Hardin, Douglas P.
出版者:	New York, NY :Springer New York :2019.
面頁冊數:	xviii, 666 p. :ill. (some col.), digital ;24 cm.
Contained By:	Springer eBooks
標題:	Discrete mathematics.
電子資源:	https://doi.org/10.1007/978-0-387-84808-2
ISBN:	9780387848082$q(electronic bk.)

Discrete energy on rectifiable sets
Borodachov, Sergiy V.

Discrete energy on rectifiable sets[electronic resource] /by Sergiy V. Borodachov, Douglas P. Hardin, Edward B. Saff. - New York, NY :Springer New York :2019. - xviii, 666 p. :ill. (some col.), digital ;24 cm. - Springer monographs in mathematics,1439-7382. - Springer monographs in mathematics..

0. An Overview: Discretizing Manifolds via Particle Interactions -- 1. Preliminaries -- 2. Basics of Minimal Energy -- 3. Introduction to Packing and Covering -- 4. Continuous and Discrete Energy -- 5. LP Bounds on the Sphere -- 6. Asymptotics for Energy Minimizing Congurations on Sd -- 7. Some Popular Algorithms for Distributing Points on S2 -- 8. Minimal Energy in the Hypersingular Case -- 9. Minimal Energy Asymptotics in the "Harmonic Series" Case -- 10. Periodic Riesz Energy -- 11. Congurations with non-Uniform Distribution -- 12. Low Complexity Energy Methods for Discretization -- 13. Best-Packing on Compact Sets -- 14. Optimal Discrete Measures for Potentials: Polarization (Chebyshev) Constants -- Appendix -- References -- List of Symbols -- Index.

This book aims to provide an introduction to the broad and dynamic subject of discrete energy problems and point configurations. Written by leading authorities on the topic, this treatise is designed with the graduate student and further explorers in mind. The presentation includes a chapter of preliminaries and an extensive Appendix that augments a course in Real Analysis and makes the text self-contained. Along with numerous attractive full-color images, the exposition conveys the beauty of the subject and its connection to several branches of mathematics, computational methods, and physical/biological applications. This work is destined to be a valuable research resource for such topics as packing and covering problems, generalizations of the famous Thomson Problem, and classical potential theory in Rd. It features three chapters dealing with point distributions on the sphere, including an extensive treatment of Delsarte-Yudin-Levenshtein linear programming methods for lower bounding energy, a thorough treatment of Cohn-Kumar universality, and a comparison of 'popular methods' for uniformly distributing points on the two-dimensional sphere. Some unique features of the work are its treatment of Gauss-type kernels for periodic energy problems, its asymptotic analysis of minimizing point configurations for non-integrable Riesz potentials (the so-called Poppy-seed bagel theorems), its applications to the generation of non-structured grids of prescribed densities, and its closing chapter on optimal discrete measures for Chebyshev (polarization) problems.

ISBN: 9780387848082$q(electronic bk.)

Standard No.: 10.1007/978-0-387-84808-2doiSubjects--Topical Terms:

853871
Discrete mathematics.

LC Class. No.: QA297.4 / .B676 2019

Dewey Class. No.: 511.1

Discrete energy on rectifiable sets
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100 1 $a Borodachov, Sergiy V. $3 853868
245 1 0 $a Discrete energy on rectifiable sets $h [electronic resource] / $c by Sergiy V. Borodachov, Douglas P. Hardin, Edward B. Saff.
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300 $a xviii, 666 p. : $b ill. (some col.), digital ; $c 24 cm.
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505 0 $a 0. An Overview: Discretizing Manifolds via Particle Interactions -- 1. Preliminaries -- 2. Basics of Minimal Energy -- 3. Introduction to Packing and Covering -- 4. Continuous and Discrete Energy -- 5. LP Bounds on the Sphere -- 6. Asymptotics for Energy Minimizing Congurations on Sd -- 7. Some Popular Algorithms for Distributing Points on S2 -- 8. Minimal Energy in the Hypersingular Case -- 9. Minimal Energy Asymptotics in the "Harmonic Series" Case -- 10. Periodic Riesz Energy -- 11. Congurations with non-Uniform Distribution -- 12. Low Complexity Energy Methods for Discretization -- 13. Best-Packing on Compact Sets -- 14. Optimal Discrete Measures for Potentials: Polarization (Chebyshev) Constants -- Appendix -- References -- List of Symbols -- Index.
520 $a This book aims to provide an introduction to the broad and dynamic subject of discrete energy problems and point configurations. Written by leading authorities on the topic, this treatise is designed with the graduate student and further explorers in mind. The presentation includes a chapter of preliminaries and an extensive Appendix that augments a course in Real Analysis and makes the text self-contained. Along with numerous attractive full-color images, the exposition conveys the beauty of the subject and its connection to several branches of mathematics, computational methods, and physical/biological applications. This work is destined to be a valuable research resource for such topics as packing and covering problems, generalizations of the famous Thomson Problem, and classical potential theory in Rd. It features three chapters dealing with point distributions on the sphere, including an extensive treatment of Delsarte-Yudin-Levenshtein linear programming methods for lower bounding energy, a thorough treatment of Cohn-Kumar universality, and a comparison of 'popular methods' for uniformly distributing points on the two-dimensional sphere. Some unique features of the work are its treatment of Gauss-type kernels for periodic energy problems, its asymptotic analysis of minimizing point configurations for non-integrable Riesz potentials (the so-called Poppy-seed bagel theorems), its applications to the generation of non-structured grids of prescribed densities, and its closing chapter on optimal discrete measures for Chebyshev (polarization) problems.
650 0 $a Discrete mathematics. $3 853871
650 1 4 $a Convex and Discrete Geometry. $3 277230
650 2 4 $a Mathematical Methods in Physics. $3 273796
650 2 4 $a Measure and Integration. $3 273777
650 2 4 $a Number Theory. $3 274059
650 2 4 $a Topology. $3 185965
650 2 4 $a Information and Communication, Circuits. $3 276027
700 1 $a Hardin, Douglas P. $3 853869
700 1 $a Saff, Edward B. $3 853870
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