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osu1322578686.pdf (4.46 MB)
ETD Abstract Container
Abstract Header
Limit Theorems for the Rotational Isomeric State Model
Author Info
Samara, Marko
Permalink:
http://rave.ohiolink.edu/etdc/view?acc_num=osu1322578686
Abstract Details
Year and Degree
2011, Doctor of Philosophy, Ohio State University, Mathematics.
Abstract
In late 1950's M.V. Volkenstein and other chemists suggested a discretized model of polymers called Rotational Isomeric State approximation model (RIS model), in which torsional angles at each step of polymer configuration take values from a fixed finite set of angles. This model was further studied by P. Flory and others. One of the natural questions is what happens with polymer when number of its bonds tends to infinity. Investigation related to this question was not completely done at the time, while some results found then were not quite rigorously proved and remained justified by intuitive or heuristic arguments. The reason for this is because some mathematical techniques and results were either not known at the time RIS model was developed, or were discovered not long before. The work presented in this thesis is continuation of study on the RIS model done by Volkenstein, Flory and others. We consider what happens with the RIS polymer when the number of its bonds tends to infinity, and show that, under suitable scaling, it converges to the Kratky-Porod model. We rigorously prove (already known) convergence of the sequence of torsional angles of the polymer, which forms an inhomogeneous Markov chain, to some homogeneous Markov chain. We also show that the rate of this convergence is geometric. To prove that the RIS model converges to the Kratky-Porod model, we use sequence of stochastic rotations whose limit satisfies linear Stratonovich stochastic equation. Driving process of this equation is antisymmetric Gaussian stochastic matrix, which rises from the sequence of torsional angles.
Committee
Peter March, PhD (Advisor)
Saleh Tanveer, PhD (Committee Member)
Yuan Lou, PhD (Committee Member)
Dorinda Gallant, PhD (Committee Member)
Pages
190 p.
Subject Headings
Mathematics
;
Molecular Chemistry
Keywords
rotational isomeric state model
;
RIS model
;
polymers
;
Kratky-Porod model
;
semi-flexible
;
Markov chain
;
torsional angles
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Citations
Samara, M. (2011).
Limit Theorems for the Rotational Isomeric State Model
[Doctoral dissertation, Ohio State University]. OhioLINK Electronic Theses and Dissertations Center. http://rave.ohiolink.edu/etdc/view?acc_num=osu1322578686
APA Style (7th edition)
Samara, Marko.
Limit Theorems for the Rotational Isomeric State Model.
2011. Ohio State University, Doctoral dissertation.
OhioLINK Electronic Theses and Dissertations Center
, http://rave.ohiolink.edu/etdc/view?acc_num=osu1322578686.
MLA Style (8th edition)
Samara, Marko. "Limit Theorems for the Rotational Isomeric State Model." Doctoral dissertation, Ohio State University, 2011. http://rave.ohiolink.edu/etdc/view?acc_num=osu1322578686
Chicago Manual of Style (17th edition)
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Document number:
osu1322578686
Download Count:
942
Copyright Info
© 2011, all rights reserved.
This open access ETD is published by The Ohio State University and OhioLINK.