The best trigonometric and bilinear approximations for functions of many variables from the classesB p, θ r . II

Order estimates are obtained for the best trigonometric and bilinear approximations of the classesB _p, ^r of functions of many variables in the metricL _q, wherep andq connected by certain relations.Translated from Ukrainskii Matematicheskii Zhurnal, Vol. 45, No. 10, pp. 1411–1423, October, 1993.     

The scattering problem for the Schrödinger equation with a potential linear in time and in space. II. Correctness,smoothness, behavior of the solution at infinity

We study the scattering problem associated with the behavior of whispering gallery waves near the inflection point of the boundary. In order to solve the scattering problem, we prove the theorems of existence, uniqueness and smoothness of the solution. The formal asymptotic behavior is justified for t– and superexponential smallness of the wave field in the shadow zone is proved.Translated from Zapiski Nauchnykh Seminarov Leningradskogo Otdeleniya Matematicheskogo Instituta im. V. A. Steklova AN SSSR, Vol. 148, pp. 13–29, 1985.     

A note on “Existence and uniqueness of coexistence states for an elliptic system coupled in the linear part”, by Hei Li-jun,Nonlinear Anal. Real World Appl. 5, 2004

In this short paper I report on a paper published in Nonlinear Analysis: Real World Applications in 2004. There is a major mistake early in that paper which makes most of its claims false. The class of reaction–diffusion systems considered in the paper has been the object of a renewed investigation in the past few years, by myself and others, and recent discoveries provide explicit counter-examples.     

Corrigendum to “Super-multiplicativity and a lower bound for the decay of the signature of a path of finite length” [C. R. Acad. Sci. Paris,Ser. I 356 (7) (2018) 720–724]

The purpose of this Corrigendum is to correct an error in our above-mentioned article.     

Optimal L^2, H^1 and L^\infty analysis of finite volume methods for the stationary Navier–Stokes equations with large data

Previous work on the stability and convergence analysis of numerical methods for the stationary Navier–Stokes equations was carried out under the uniqueness condition of the solution, which required that the data be small enough in certain norms. In this paper an optimal analysis for the finite volume methods is performed for the stationary Navier–Stokes equations, which relaxes the solution uniqueness condition and thus the data requirement. In particular, optimal order error estimates in the $H^1$ -norm for velocity and the $L^2$ -norm for pressure are obtained with large data, and a new residual technique for the stationary Navier–Stokes equations is introduced for the first time to obtain a convergence rate of optimal order in the $L^2$ -norm for the velocity. In addition, after proving a number of additional technical lemmas including weighted $L^2$ -norm estimates for regularized Green’s functions associated with the Stokes problem, optimal error estimates in the $L^\infty $ -norm are derived for the first time for the velocity gradient and pressure without a logarithmic factor $O(|\log h|)$ for the stationary Naiver–Stokes equations.     

On exact solutions of Stokes second problem for a Burgers�� fluid, II. The cases �� =?��2/4 and �� > ��2/4

In this study, the exact solutions of the Stokes second problem for a Burgers?? fluid are presented when the relaxation time satisfies the conditions ?? =???²/4 and ?? >???²/4. The velocity field and the associated tangential stress, when only one initial condition is necessary for velocity, are determined by means of the Laplace transform. The physical interpretation for the emerging parameters is discussed with the help of graphical illustrations. The similar solutions for the Stokes?? first problem are obtained as the limiting cases of our solutions.     

Corrigendum to the paper: Existence and stability results for semilinear systems of impulsive stochastic differential equations with fractional Brownian motion. Stoch. Anal. Appl. 34 (2016), no. 5, 792–834

In this paper we correct an error made in our paper [Blouhi, T.; Caraballo, T.; Ouahab, A. Existence and stability results for semilinear systems of impulsive stochastic differential equations with fractional Brownian motion. Stoch. Anal. Appl. 34 (2016), no. 5, 792-834]. In fact, in this corrigendum we present the correct hypotheses and results, and highlight that the results can be proved using the same method used in the original work. The main feature is that we used a result which has been proved only when the diffusion term does not depend on the unknown.