| Record ID | marc_columbia/Columbia-extract-20221130-031.mrc:89055465:4150 |
| Source | marc_columbia |
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LEADER: 04150cam a2200601Ia 4500
001 15082822
005 20220618231534.0
006 m o d
007 cr |||||||||||
008 110913s2011 nhua ob 001 0 eng d
035 $a(OCoLC)ocn752198881
035 $a(NNC)15082822
040 $aCUS$beng$epn$cCUS$dCUS$dOTZ$dOCLCQ$dOCLCF$dCRCPR$dUIU$dOCLCQ$dN$T$dIDEBK$dYDXCP$dE7B$dEBLCP$dDEBSZ$dOCLCQ$dIDB$dOCLCQ$dMERUC$dUAB$dOCLCQ$dNLE$dOCLCQ$dUKMGB$dWYU$dYDX$dTYFRS$dLEAUB$dAU@$dOCLCQ$dUKAHL$dOCLCQ$dK6U$dOCLCO
015 $aGBB7A5429$2bnb
016 7 $a018380913$2Uk
019 $a899156403$a903956338$a1065683740
020 $a9781439876213$q(electronic bk.)
020 $a1439876215$q(electronic bk.)
020 $z9781578087105$q(hardback)
020 $z1578087104$q(hardback)
035 $a(OCoLC)752198881$z(OCoLC)899156403$z(OCoLC)903956338$z(OCoLC)1065683740
037 $aTANDF_240810$bIngram Content Group
050 4 $aQC20.7.I58$bM365 2011
072 7 $aMAT$x005000$2bisacsh
072 7 $aMAT$x034000$2bisacsh
082 04 $a515.45$bM271
084 $aMAT003000$aMAT007000$2bisacsh
049 $aZCUA
100 1 $aMandal, B. N.
245 10 $aApplied singular integral equations /$cB.N. Mandal, A. Chakrabarti.
260 $aEnfield, NH :$bScience Publishers ;$aBoca Raton, FL :$bMarketed and distributed by CRC Press,$c©2011.
300 $a1 online resource (ix, 264 pages) :$billustrations
336 $atext$btxt$2rdacontent
337 $acomputer$bc$2rdamedia
338 $aonline resource$bcr$2rdacarrier
520 $a"Integral equations occur in a natural way in the course of obtaining mathematical solutions to mixed boundary value problems of mathematical physics. Of the many possible approaches to the reduction of a given mixed boundary value problem to an integral equation, Green's function technique appears to be the most useful one, and Green's functions involving elliptic operators (e.g., Laplace's equation) in two variables, are known to possess logarithmic singularities. The existence of singularities in the Green's function associated with a given boundary value problem, thus, brings in singularities in the kernels of the resulting integral equations to be analyzed in order to obtain useful solutions of the boundary value problems under consideration. The present book is devoted to varieties of linear singular integral equations, with special emphasis on their methods of solution and helps in introducing the subject of singular integral equations and their applications to researchers as well as graduate students of this fascinating and growing branch of applied mathematics."$cProvided by publisher.
504 $aIncludes bibliographical references (page 257261) and index.
588 0 $aPrint version record.
505 0 $a1. Introduction -- 2. Some elementary methods of solution of singular integral equations -- 3. Riemann-Hilbert problems and their uses in singular integral equations -- 4. Special methods of solution of singular integral equations -- 5. Hypersingular integral equations -- 6. Singular integro-differential equations -- 7. Galerkin method and its application -- 8. Numerical methods -- 9. Some special types of coupled singular integral equations of Carleman type and their solutions.
650 0 $aIntegral equations.
650 0 $aMathematical physics.
650 6 $aÉquations intégrales.
650 6 $aPhysique mathématique.
650 7 $aMATHEMATICS$xCalculus.$2bisacsh
650 7 $aMATHEMATICS$xMathematical Analysis.$2bisacsh
650 7 $aIntegral equations.$2fast$0(OCoLC)fst00975507
650 7 $aMathematical physics.$2fast$0(OCoLC)fst01012104
655 0 $aElectronic books.
655 4 $aElectronic books.
700 1 $aChakrabarti, A.$q(Aloknath)
776 08 $iPrint version:$aMandal, B.N.$tApplied singular integral equations.$dEnfield, NH : Science Publishers ; Boca Raton, FL : Marketed and distributed by CRC Press, ©2011$z9781578087105$w(DLC) 2011008899$w(OCoLC)706022516
856 40 $uhttp://www.columbia.edu/cgi-bin/cul/resolve?clio15082822$zTaylor & Francis eBooks
852 8 $blweb$hEBOOKS