| Record ID | ia:advancedboundary0000turi |
| Source | Internet Archive |
| Download MARC XML | https://archive.org/download/advancedboundary0000turi/advancedboundary0000turi_marc.xml |
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LEADER: 02434cam a22002774a 4500
001 2001091676
003 DLC
005 20060217113843.0
008 010525s2002 maua b 000 0 eng
010 $a 2001091676
020 $a1853128988
040 $aDLC$cDLC$dDLC
042 $apcc
050 00 $aTJ260$b.T86 2002
082 00 $a621.402/2$221
100 1 $aTuriel Ibañez, Max.
245 10 $aAdvanced boundary elements for heat transfer /$cby M-T. Ibańẽz, H. Power.
260 $aBoston :$bWIT Press,$cc2002.
300 $a134 p. :$bill. ;$c25 cm.
440 0 $aTopics in engineering,$x0952-5300 ;$vv. 42
504 $aIncludes bibliographical references.
505 8 $aMachine generated contents note: Chapter 1 Introduction -- 1.1 Related schemes -- 1.2 Contents of this work -- Chapter 2 Integral representation formula for heat transfer -- 2.1 Introduction -- 2.2 Integral representation formula -- 2.3 Boundary element method -- Chapter 3 Non-history-dependent convolution scheme -- 3.1 Introduction -- 3.2 Green function -- 3.3 Integral equation with degenerate kemal -- 3.4 Convolution scheme -- Chapter 4 Recursive reinitialization scheme -- 4.1 Introduction -- 4.2 Greengard and Strain algorithm -- 4.3 Boundary integral equation -- 4.4 Proposed numerical scheme -- 4.5 Internal value of the temperature using Fourier series -- Chapter 5 Numerical examples for fixed boundaries -- 5.1 Numerical results -- 5.1.1 Accuracy comparison -- 5.2 CPU-time comparison -- 5.3 Refined approach by adding images -- Chapter 6 Thermal diffusion with moving boundary -- 6.1 Introduction -- 6.2 Boundary integral representation -- 6.3 Proposed numerical scheme -- Chapter 7 Numerical examples with moving boundary -- 7.1 Introduction -- 7.2 Numerical examples -- Appendices -- Appendix A Fourier series representation for the Green function -- Appendix B Bounds for the integral of the absolute value of the kernal -- and for the truncated Fourier series in the convolution scheme -- Appendix C Truncation error bound for the Fourier series -- Appendix D Surface trigonometric moments of u and q -- Appendix E Analytical space integration of the single-layer potential when the collocation point lies in the integration element -- References.
650 0 $aHeat$xTransmission$xMathematics.
650 0 $aBoundary element methods.
700 1 $aPower, H.
856 41 $3Table of contents$uhttp://www.loc.gov/catdir/toc/fy033/2001091676.html