»
Statistics of Linear Polymers in Disordered Media
 
 

Statistics of Linear Polymers in Disordered Media, 1st Edition

 
Statistics of Linear Polymers in Disordered Media, 1st Edition,Bikas Chakrabarti,ISBN9780444517098
 
 
 

B Chakrabarti   

Elsevier Science

9780444517098

9780080460475

368

240 X 165

Print Book + eBook

USD 228.00
USD 380.00

Buy both together and save 40%

Print Book

Hardcover

In Stock

Estimated Delivery Time
USD 195.00

eBook
eBook Overview

VST format:

DRM Free included formats: PDF

USD 185.00
Add to Cart
 
 

Key Features

· First book on statistics of polymers in random media.
· Contents straight away from research labs.
· Chapters written by foremost experts in the respective fields.
· Theories, experiments and computer simulations extensively discussed.
· Includes latest developments in understanding related important topics like DNA unzipping, Travelling salesman problem, etc.
· Comprehensive index for quick search for keywords.

Description

With the mapping of the partition function graphs of the n-vector magnetic model in the n to 0 limit as the self-avoiding walks, the conformational statistics of linear polymers was clearly understood in early seventies. Various models of disordered solids, percolation model in particular, were also established by late seventies. Subsequently, investigations on the
statistics of linear polymers or of self-avoiding walks in, say, porous medium or disordered lattices were started in early eighties. Inspite of the brilliant ideas forwarded and extensive studies made for the next two decades, the problem is not yet completely solved in its generality. This intriguing and important problem has remained since a topic of vigorous and active research.

This book intends to offer the readers a first hand and extensive review of the various aspects of the problem, written by the experts in the respective fields. We hope, the contents of the book will provide a valuable guide for researchers in statistical physics of polymers and will surely induce further research and advances towards a complete understanding of the problem.

Readership

Research students and practitioners in (a) Statistical Physics, (b) Theoretical Physics, (c) Physical Chemistry, (d) Polymer Chemistry, (e) Chemical Engineering, etc. Libraries of Basic Research Institutes. Industrial Laboratories on Polymer Chemistry, Chemical Engineering, etc.

Bikas Chakrabarti

Affiliations and Expertise

Saha Institute of Nuclear Physics, Kolkata, India

Statistics of Linear Polymers in Disordered Media, 1st Edition

Polymers in random media: an introduction, by B.K. Chakrabarti
Directed polymers and randomness. by S.M. Bhattacharjee
Self-avoiding walks in constrained and random geometries: series studies, by A.J. Guttmann
Renormalization group approaches to polymers in disordered media, by V. Blavats'ka, C. von Ferber, R. Folk and Yu. Holovatch
Linear and branched polymers on fractals, by D. Dhar and Y. Singh
Self-avoiding walks on deterministic and random fractals: numerical results, by A. Ordemann, M. Porto and H.E. Roman
Localization of polymers in random media: analogy with quantum particles in disorder, by Y.Y. Goldschmidt and Y. Shiferaw
Geometric properties of optimal and most probable paths on randomly disordered lattices, by P. Bhattacharyya and A. Chatterjee
Phenomenology of polymer single-chain diffusion in solution, by G.D.J. Phillies
Index
 
 
Cyber Monday SALE Upto 50 Percent OFF | Use Code CYBER14
Shop with Confidence

Free Shipping around the world
▪ Broad range of products
▪ 30 days return policy
FAQ

Contact Us