%0 Journal Article
%A Bulavatskiy, Vladimir M.
%A Kryvonos, Iurii G.
%D 2014
%I Begell House
%K abnormal dynamics, consolidation process, deformed medium, partially saturated geoporous medium, fractional-differential models, pure water, salt solution, analytical solutions, one-dimensional nonstationary boundary-value problems, geometrically varied domains
%N 10
%P 1-10
%R 10.1615/JAutomatInfScien.v46.i10.10
%T Mathematical Modeling of Consolidation Dynamics on the Basis of Fractional-Differential Approach
%U http://dl.begellhouse.com/journals/2b6239406278e43e,235d545259518a9b,511fb03939ddb4c1.html
%V 46
%X For description of abnormal dynamics of consolidation process in deformed partially saturated geoporous medium the new (fractional-difference) mathematical models are introduced. According to cases of saturation of geoporous medium with pure water or salt solution analytical solutions were obtained within the framework of these mathematical models of one-dimensional nonstationary boundary-value problems of fractional-differential dynamics of consolidation process in finite by geometrical variation domain.
%8 2014-10-29