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Tuesday, October 6, 2020 | History

5 edition of Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases (Advanced Series on Theoretical Physical Science , Vol 2) found in the catalog.

Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases (Advanced Series on Theoretical Physical Science , Vol 2)

by Ou-Yang Zhong-Can

  • 164 Want to read
  • 16 Currently reading

Published by World Scientific Publishing Company .
Written in English

    Subjects:
  • Cellular biology,
  • Condensed matter physics (liquids & solids),
  • Theoretical methods,
  • Physics,
  • Differential Geometry,
  • Elasticity,
  • Science,
  • Science/Mathematics,
  • Chemistry - General,
  • Mechanics - General

  • The Physical Object
    FormatHardcover
    Number of Pages300
    ID Numbers
    Open LibraryOL9477347M
    ISBN 109810232489
    ISBN 109789810232481

      Abstract. The theoretical study of complex configurations of fluid membranes is reported on the basis of the Helfrich functional. Series of analytical results on the governing equations of closed lipid vesicles and open lipid vesicles with holes are : Zhong-Can Ou-Yang, Zhan-Chun Tu. O.-Y. Zhong-can, Ji-Xing Liu and Yu-Zhang Xie, "Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases,", World Scientific, (). Cited by: 5.

    A geometric theory on the elasticity of bio-membranes c e 1 e 2 3 Figure 1. A smooth and orientable surface M with an edge C. the first and second order variations of the total free energy. In section 6, we summarize the new results obtained in . Variational Problems in Elastic Theory of Biomembranes, Smectic-A Liquid Crystals, and Carbon Related Structures Z. C. Tu [email protected] June 9th,

    This book contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in differential geometry. Following the pioneering work by W Helfrich, the fluid membrane is seen as a nematic or smectic ” A liquid crystal film and its elastic energy form is deduced exactly from the curvature. Discover Book Depository's huge selection of Yang Zhong books online. Free delivery worldwide on over 20 million titles.


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Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases (Advanced Series on Theoretical Physical Science , Vol 2) by Ou-Yang Zhong-Can Download PDF EPUB FB2

This is the second edition of the book Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases published by World Scientific in This book gives a comprehensive treatment of the conditions of mechanical equilibrium and the deformation of membranes as a surface problem in differential geometry.

"This is the second edition of the book Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases published by World Scientific in This book gives a comprehensive treatment of the conditions of mechanical equilibrium and the deformation of membranes as a surface problem in differential geometry.

Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases (Peking University-World Scientific Advanced Physics Series Book 2) - Kindle edition by Zhanchun Tu, Zhongcan Ou-Yang, Jixing Liu, Yuzhang Xie.

Download it once and read it on your Kindle device, PC, phones or tablets. Use features like bookmarks, note taking and highlighting while reading Manufacturer: World Scientific Publishing Company. Buy Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases: Second Edition (Peking University-World Scientific Advanced Physics) on FREE SHIPPING on qualified orders.

Get this from a library. Geometric methods in the elastic theory of membranes in liquid crystal phases. [Zhong-Can Ou-Yang; Ji-Xing Liu; Yu-Zhang Xie] -- "This book contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in differential geometry.

Following the pioneering work by W Helfrich. This book contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in differential geometry.

Following the pioneering work by W Helfrich, the fluid membrane is seen as a nematic or smectic — A liquid crystal film and its elastic energy form is deduced exactly from the curvature.

Contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in differential geometry. Following the pioneering work by W.

Helfrich, the fluid membrane is seen as a nematic or smectic - a liquid crystal film and its elastic enegy form is deduced exactly from the curvature elastic theory of. Geometric MEthods in the Elastic Theory of Membranes in Liquid Crystal Phases: Authors: Ou-Yang, Zhong-Can; Liu, Ji-Xing; Xie, Yu-Zhang: Publication: Geometric MEthods in the Elastic Theory of Membranes in Liquid Crystal Phases.

Edited by OU-YANG ZHONG-CAN ET AL. Published by World Scientific Publishing Co. Pte. Ltd. ISBN # (). Geometric methods in elastic theory of membranes in liquid crystal phases, 2nd ed. Contemporary Physics: Vol. 59, No. 4, pp. Author: John D. Clayton. This is the second edition of the book Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases published by World Scientific in This book gives a comprehensive treatment of the conditions of mechanical equilibrium and the deformation of membranes as a surface problem in differential geometry.

Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases Liu, Ji-Xing, Ou-Yang, Zhong-Can, Xie, Yu-Zhang This book contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in.

Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases, Zhanchun Tu, Zhongcan Ou-Yang, Jixing Liu;Yuzhang Xie, WSPC.

Des milliers de livres avec la livraison chez vous en 1 jour ou en magasin avec -5% de réduction. Find the most up-to-date version of GEOMETRC METH ELASTC THEO MEMBR LIQ CRYST PHSE at Engineering If you want to see the full derivation, you will need to understand the Geometric Mathematic Primer discussed in Sections 2 and 3 of the book.

Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases by Zhong-Can Ou. Geometric Methods in Elastic Theory of Membranes in Geometric Methods In Elastic Theory Of Membranes In Liquid Crystal Phases,Zhanchun Tu View ProductPrice: $ Elastic Theory of Membranes Z.

Tu 1. INTRODUCTION A membrane is a thin structure that can endure the bending moment. It is usually thought of as a smooth surface (denoted by M in this paper) because its thickness is much smaller than its lateral dimension.

The elastic theory of membranes has a long history. As early as inPoisson [1 File Size: KB. Geometric methods in the elastic theory of membranes in liquid crystal phases. This book contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in differential geometry.

Following the pioneering work by W Helfrich, the fluid membrane is seen as a nematic or smectic - A liquid. This book contains a comprehensive description of the mechanical equilibrium and deformation of membranes as a surface problem in differential geometry.

Following the pioneering work by W Helfrich, the fluid membrane is seen as a nematic or smectic - A liquid crystal film and its elastic energy form is deduced exactly from the curvature elastic theory of the liquid crystals.

With. [3] Z. Ou-Yang, J. Liu and Y. Xie, Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases (World Scientific, Singapore, ).

[4] A. Biria, M. Maleki and E. Fried, (). Continuum theory for the edge of an open lipid bilayer, Advances in Applied Mechanics 46 () Research papers on closed vesicles. The Hardcover of the Ivan Stranski: The Grandmaster Of Crystal Growth by Ivan Vesselinov Markov at Barnes & Noble.

FREE Shipping on $35 or more. Geometric Methods in Elastic Theory of Membranes in. Geometric Methods in Elastic Theory of Membranes in. Geometric Methods In Elastic Theory Of Membranes In Liquid Crystal Phases,Zhanchun Tu Pages:.

3. Surface equation generalized by Nitsche. The recent analytic work, in the shape problem of bilayer membranes has attracted great interest from mathematicians and the Helfrich FM theory has been regarded as the renewal of the Poisson's theory of curvature J.C.C. Nitsche's encyclopedic book on minimal surface (new edition in ), the Helfrich energy Cited by:   Z.-C.

Ou-Yang, J.-X. Liu, Y.-Z. Xie, Geometric Methods in the Elastic Theory of Membranes in Liquid Crystal Phases (World Scientific, Hong Kong, ) CrossRef zbMATH Google Scholar J. Singer, L. Nicolson, The fluid mosaic model of the structure of cell membranes.This is the second edition of the book Geometric Methods in Elastic Theory of Membranes in Liquid Crystal Phases published by World Scientific in