Title of article
On the stability of the high-order Higdon Absorbing Boundary Conditions
Author/Authors
Baffet، نويسنده , , Daniel and Givoli، نويسنده , , Dan، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
17
From page
768
To page
784
Abstract
The Higdon sequence of Absorbing Boundary Conditions (ABCs) for the linear wave equation is considered. Building on a previous work of Ha-Duong and Joly, which related to other forms of boundary conditions, the Higdon ABCs are proved to be energy-stable (on the continuous level) up to any order. This type of stability is stronger than the more standard notion of stability of initial boundary value problems in the sense of Kreiss; in particular it leads to stability estimates which are uniform in time. In consequence to the theorem proved here, energy-stability is immediately implied for the high-order Givoli–Neta and Hagstrom–Warburton ABCs, which are reformulations of the Higdon ABCs using auxiliary variables. A weakness of this theory is that it requires sufficiently smooth data, and that the required smoothness level increases with the order of the ABC. This issue and its implications are discussed.
Keywords
Givoli–Neta , Smoothness , Hagstrom–Warburton , Higdon , absorbing boundary condition , wave equation , well-posedness , stability , Energy-stability , Kreiss
Journal title
Applied Numerical Mathematics
Serial Year
2011
Journal title
Applied Numerical Mathematics
Record number
1529689
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