Olga Kireeva scite author profile

Olga Kireeva

4Publications

43Citation Statements Received

57Citation Statements Given

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Affiliations

Russian State Social University, Université Libre de Bruxelles, Material (Belgium)

Publications

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On Compact 4th Order Finite-Difference Schemes for the Wave Equation

Злотник

Kireeva

2021

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We consider compact finite-difference schemes of the 4th approximation order for an initial-boundary value problem (IBVP) for the n-dimensional nonhomogeneous wave equation, n≥ 1. Their construction is accomplished by both the classical Numerov approach and alternative technique based on averaging of the equation, together with further necessary improvements of the arising scheme for n≥ 2. The alternative technique is applicable to other types of PDEs including parabolic and time-dependent Schro¨dinger ones. The schemes are implicit and three-point in each spatial direction and time and include a scheme with a splitting operator for n≥ 2. For n = 1 and the mesh on characteristics, the 4th order scheme becomes explicit and close to an exact four-point scheme. We present a conditional stability theorem covering the cases of stability in strong and weak energy norms with respect to both initial functions and free term in the equation. Its corollary ensures the 4th order error bound in the case of smooth solutions to the IBVP. The main schemes are generalized for non-uniform rectangular meshes. We also give results of numerical experiments showing the sensitive dependence of the error orders in three norms on the weak smoothness order of the initial functions and free term and essential advantages over the 2nd approximation order schemes in the non-smooth case as well.

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Practical Error Analysis for the Three-Level Bilinear Fem and Finite-Difference Scheme for the 1d Wave Equation With Non-Smooth Data

Злотник

Kireeva

2018

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Abstract. We deal with the standard three-level bilinear FEM and finite-difference scheme with a weight to solve the initial-boundary value problem for the 1D wave equation. We consider the rich collection of initial data and the free term which are the Dirac δ-functions, discontinuous, continuous but with discontinuous derivatives and from the Sobolev spaces, accomplish the practical error analysis in the L 2 , L 1 , energy and uniform norms as the mesh refines and compare results with known theoretical error bounds.

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On compact 4th order finite-difference schemes for the wave equation

Zlotnik¹,

Kireeva²

2020

Preprint

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A coupled EFGM–CIE method for acoustic radiation

Kireeva

Mertens

Bouillard

2006

Computers & Structures

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Olga Kireeva

On Compact 4th Order Finite-Difference Schemes for the Wave Equation

Practical Error Analysis for the Three-Level Bilinear Fem and Finite-Difference Scheme for the 1d Wave Equation With Non-Smooth Data

On compact 4th order finite-difference schemes for the wave equation

A coupled EFGM–CIE method for acoustic radiation

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