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References (7)
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H. Fujita, V. MacCosham (1959)
Extension of Sedimentation Velocity Theory to Molecules of Intermediate SizesJournal of Chemical Physics, 30
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H. Fujita (1956)
Effects of a Concentration Dependence of the Sedimentation Coefficient in Velocity UltracentrifugationJournal of Chemical Physics, 24
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I. Billick, G. Weiss (1966)
The Solution to a Nonlinear Lamm Equation in the Faxén Approximation.Journal of research of the National Bureau of Standards. Section A, Physics and chemistry, 70A 1
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H. Fujita (1962)
Mathematical theory of sedimentation analysis -
G. Weiss, D. Yphantis (1965)
RECTANGULAR APPROXIMATION FOR CONCENTRATION-DEPENDENT SEDIMENTATION IN THE ULTRACENTRIFUGE.The Journal of chemical physics, 42
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Daniel Glaubiger, J. Hearst (1967)
Effect of superhelical structure on the secondary structure of DNA ringsBiopolymers, 5
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P. Morse, H. Feshbach (1955)
Methods of theoretical physics
- Publisher
- Wiley
- Copyright
- Copyright © 1969 John Wiley & Sons, Inc.
- ISSN
- 0006-3525
- eISSN
- 1097-0282
- DOI
- 10.1002/bip.1969.360070307
- Publisher site
- See Article on Publisher Site
Abstract
An expansion valid for short times is presented for the rectangular approximation to the Lamm equation when the sedimentation coefficient can be expressed as s = S0(1−kc). The expansion allows the study of meniscus perturbations on the Faxén approximation, as well as a determination of when reflections from the base become significant.
Journal
Biopolymers – Wiley
Published: Mar 1, 1969