Friedman vs Abel equations: A connection unraveled
A. Yurov, and V. Yurov. (2008)cite arxiv:0809.1216Comment: Replaced raw version (with fake abstract and acknowledgments) to a new, revised version.
Abstract
We present an interesting connection between Einstein-Friedmann equations for
the models of universe filled with scalar field and the special form of Abel
equation of the first kind. This connection works in both ways: first, we show
how, knowing the general solution of the Abel equation (corresponding to the
given scalar field potential) one can obtain the general solution of the
Friedman Equation (and use the former for studying such problems as existence
of inflation with exit for particular models). On the other hand, one can
invert the procedure and construct the B"acklund auto-transformations for
the Abel equation.
Description
Friedman vs Abel equations: A connection unraveled
%0 Generic
%1 Yurov2008
%A Yurov, A. V.
%A Yurov, V. A.
%D 2008
%K se
%T Friedman vs Abel equations: A connection unraveled
%U http://arxiv.org/abs/0809.1216
%X We present an interesting connection between Einstein-Friedmann equations for
the models of universe filled with scalar field and the special form of Abel
equation of the first kind. This connection works in both ways: first, we show
how, knowing the general solution of the Abel equation (corresponding to the
given scalar field potential) one can obtain the general solution of the
Friedman Equation (and use the former for studying such problems as existence
of inflation with exit for particular models). On the other hand, one can
invert the procedure and construct the B"acklund auto-transformations for
the Abel equation.
@misc{Yurov2008,
abstract = { We present an interesting connection between Einstein-Friedmann equations for
the models of universe filled with scalar field and the special form of Abel
equation of the first kind. This connection works in both ways: first, we show
how, knowing the general solution of the Abel equation (corresponding to the
given scalar field potential) one can obtain the general solution of the
Friedman Equation (and use the former for studying such problems as existence
of inflation with exit for particular models). On the other hand, one can
invert the procedure and construct the B\"{a}cklund auto-transformations for
the Abel equation.
},
added-at = {2011-09-22T23:48:04.000+0200},
author = {Yurov, A. V. and Yurov, V. A.},
biburl = {https://www.bibsonomy.org/bibtex/2b99bf0dfe338bba83951e4f1d3730a09/casvada},
description = {Friedman vs Abel equations: A connection unraveled},
interhash = {ea300a4afd0f4233e5513c14fe1fdc24},
intrahash = {b99bf0dfe338bba83951e4f1d3730a09},
keywords = {se},
note = {cite arxiv:0809.1216Comment: Replaced raw version (with fake abstract and acknowledgments) to a new, revised version},
timestamp = {2011-09-22T23:48:05.000+0200},
title = {Friedman vs Abel equations: A connection unraveled},
url = {http://arxiv.org/abs/0809.1216},
year = 2008
}