The Boundary Element Method for the Helmholtz Equation ... - FEI VÅ B
The Boundary Element Method for the Helmholtz Equation ... - FEI VÅ B
The Boundary Element Method for the Helmholtz Equation ... - FEI VÅ B
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89References[1] ADAMS, Robert A.; FOURNIER, John J. F. Sobolev Spaces. Ox<strong>for</strong>d : Elsevier ScienceLtd, 2003. 305p.[2] BENTHIEN, George W.; SCHENCK, Harry A. Nonexistence and nonuniqueness problemsassociated with integral equation methods in acoustics. Computers & Structures.1997, 65, 3, p. 295–305.[3] BOUCHALA, Jiří. Úvod do <strong>Boundary</strong> <strong>Element</strong>s <strong>Method</strong>. In BLAHETA, Radim,STARÝ, Jiří. Proceedings of <strong>the</strong> conference SNA ’07 : Seminar on Numerical Analysis.Ostrava : Institute of Geonics AS CR, 2007. [in Czech][4] BURTON, A. J.; MILLER, G. F. <strong>The</strong> Application of Integral <strong>Equation</strong> <strong>Method</strong>s to <strong>the</strong>Numerical Solution of Some Exterior <strong>Boundary</strong>-Value Problems. Proceedings of <strong>the</strong>Royal Society of London. Series A, Ma<strong>the</strong>matical and Physical Sciences. 1971, 323,1553, p. 201–210.[5] BRAKHAGE, Helmut; WERNER, Peter Über das Dirichletsche Außenraumproblemfür die <strong>Helmholtz</strong>sche Schwingungsgleichung. Archiv der Ma<strong>the</strong>matik. 1965, 16, 1, p.325–329. [in German][6] COLTON, David; KRESS, Rainer. Applied Ma<strong>the</strong>matical Sciences : Inverse acousticand electromagnetic scattering <strong>the</strong>ory. Berlin : Springer–Verlag, 1998. 334 p.[7] DRÁBEK, Pavel; MILOTA, Jaroslav. <strong>Method</strong>s of Nonlinear Analysis : Applicationsto Differential <strong>Equation</strong>s. Basel : Birkhäuser, 2007. 568 p.[8] DUFFY, Michael G. Quadrature over a pyramid or cube of integrands with a singularityat a vertex. SIAM J. Numer. Anal. 1982, 19, 6, p. 1260–1262.[9] ENGLEDER, Sarah. Stabilisierte Randintegralgleichungen für äussere Randwertproblemeder <strong>Helmholtz</strong>-gleichung. [s.l.], 2006. 97 s. Technische Universität Graz. Diploma<strong>the</strong>sis. [in German][10] IHLENBURG, Frank. Applied Ma<strong>the</strong>matical Sciences : Finite <strong>Element</strong> Analysis ofAcoustic Scattering. New York : Springer, 1998. 224 p.[11] KUFNER, Alois; JOHN Oldřich; FUČÍK, Svatopluk. Function Spaces. Leyden : NoordhoffInternational Publishing, 1977. 454 p.[12] McLEAN, William. Strongly Elliptic Systems and <strong>Boundary</strong> Integral <strong>Equation</strong>s. Cambridge: Cambridge University Press, 2000. 357 p.[13] NÉDÉLEC, Jean-Claude. Acoustic and Electromagnetic <strong>Equation</strong>s : Integral Representations<strong>for</strong> Harmonic Problems. New York : Springer–Verlag, 2001. 316 p.[14] SADOWSKÁ, Marie. Solution of Variational Inequalities by <strong>Boundary</strong> Integral <strong>Equation</strong>s.[s.l.], 2005. 73 s. VŠB-TU Ostrava. Diploma <strong>the</strong>sis. [in Czech]
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