Asymptotic Analysis - Volume 93, issue 4

Authors: Hamouda, Makram | Sboui, Abir

Article Type: Research Article

Abstract: Our aim in this article is to study the Linearized Navier–Stokes (LNS) problem including an interior singularity of the source function. At small viscosity, in addition to the classical boundary layers, interior layers are then developed inside the domain due to the discontinuities appearing in the limit inviscid solution. Using boundary layer functions method, the asymptotic expansion of the viscous solution is constructed and the uniform validity of the approximate solution is then proved.

Keywords: interior layers, correctors, singular problems, discontinuous and non-smooth solution, Navier–Stokes equations

DOI: 10.3233/ASY-151287

Citation: Asymptotic Analysis, vol. 93, no. 4, pp. 281-310, 2015

Authors: Gontsov, R.R. | Goryuchkina, I.V.

Article Type: Research Article

Abstract: Here we propose a sufficient condition of the convergence of a generalized power series formally satisfying an algebraic (polynomial) ordinary differential equation. The proof is based on the majorant method.

Keywords: algebraic ODE, formal solution, generalized power series, majorant method, convergent series

DOI: 10.3233/ASY-151297

Citation: Asymptotic Analysis, vol. 93, no. 4, pp. 311-325, 2015

Authors: Iantchenko, Alexei | Korotyaev, Evgeny

Article Type: Research Article

Abstract: We consider the radial Dirac operator with compactly supported potentials. We study resonances as the poles of scattering matrix or equivalently as the zeros of modified Fredholm determinant. We obtain the following properties of the resonances: (1) asymptotics of counting function, (2) in the massless case we get the trace formula in terms of resonances.

Keywords: resonances, 1D Dirac

DOI: 10.3233/ASY-151298

Citation: Asymptotic Analysis, vol. 93, no. 4, pp. 327-370, 2015

Article Type: Other

Citation: Asymptotic Analysis, vol. 93, no. 4, pp. 371-372, 2015