Asymptotic Analysis - Volume 13, issue 3

Authors: Frank, L.S.

Article Type: Research Article

Abstract: Quasi-stationary surface water waves propagating along a distinguished space direction in an infinite channel of finite depth are considered under the assumption that the liquid is inviscid irrotational and incompressible. Besides the gravitation effect also the capillary phenomenon is taken into consideration. After rescaling the mathematical problem is reduced to a singularly perturbed pseudodifferential equation on the free boundary of the liquid. Depending on the values of two basic dimensionless parameters, the rescaled speed of propagation and the parameter characterizing the surface tension (capillarity), the existence of different kind of quasi-stationary waves (periodic, solitary and their superposition) is established for …this exact mathematical model and their asymptotic behavior is investigated when the natural dimensionless small parameter (the ratio of the depth of the undisturbed liquid's layer and the wave's length scale) vanishes. Show more

DOI: 10.3233/ASY-1996-13301

Citation: Asymptotic Analysis, vol. 13, no. 3, pp. 217-252, 1996

Authors: Bakhvalov, N.S. | Saint Jean Paulin, J.

Article Type: Research Article

Abstract: We study here the problem of heat transfer in a porous medium consisting of a homogeneous isotropic material. We assume that the period of the medium is not the same in the two directions and that the ratio of these two periods tends to zero. We find the explicit representation of the coefficients of the averaged equations and prove strong convergence to the solution of the averaged problem.

DOI: 10.3233/ASY-1996-13302

Citation: Asymptotic Analysis, vol. 13, no. 3, pp. 253-276, 1996

Authors: Baraket, Sami

Article Type: Research Article

Abstract: We study here the Ginzburg-Landau functional on a Riemannian surface S endowed with an arbitrary metric Eε (u)=½∫𝒮 ||∇u||2 +1/(4ε2 )∫𝒮 (|u|2 −1)2 , u∈H1 (S,C), where ε∈]0,+∞[. We study the asymptotic behaviour of the critical points for Eε as ε→0. We define a renormalized energy which allows to characterize the position of the singularities at the limit.

DOI: 10.3233/ASY-1996-13303

Citation: Asymptotic Analysis, vol. 13, no. 3, pp. 277-317, 1996