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200 10$a1998 IEEE Southwest Symposium on Image Analysis and Interpretation : April 5-7, 1998, Tucson, Arizona, U.S.A
210 31$a[Place of publication not identified]$cIEEE$d1998
300   $aBibliographic Level Mode of Issuance: Monograph
311   $a0-7803-4876-1 
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606   $aImage analysis$xCongresses
606   $aRemote sensing$xCongresses
606   $aDiagnostic imaging$xCongresses
606   $aEngineering & Applied Sciences$2HILCC
606   $aApplied Physics$2HILCC
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615  0$aImage analysis$xCongresses
615  0$aRemote sensing$xCongresses
615  0$aDiagnostic imaging$xCongresses
615  7$aEngineering & Applied Sciences
615  7$aApplied Physics
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712 02$aUniversity of Arizona
712 02$aUniversity of Arizona Foundation.
712 02$aInstitute of Electrical and Electronics Engineers
712 02$aArizona State University
712 12$aIEEE Southwest Symposium on Image Analysis and Interpretation
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996   $a1998 IEEE Southwest Symposium on Image Analysis and Interpretation : April 5-7, 1998, Tucson, Arizona, U.S.A$92527008
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200 00$aMathematical Physics II
210   $aBasel, Switzerland$cMDPI - Multidisciplinary Digital Publishing Institute$d2020
215   $a1 online resource (182 p.)
311 08$a3-03943-495-0 
311 08$a3-03943-496-9 
330   $aThe charm of Mathematical Physics resides in the conceptual difficulty of understanding why the language of Mathematics is so appropriate to formulate the laws of Physics and to make precise predictions. Citing Eugene Wigner, this "unreasonable appropriateness of Mathematics in the Natural Sciences" emerged soon at the beginning of the scientific thought and was splendidly depicted by the words of Galileo: "The grand book, the Universe, is written in the language of Mathematics." In this marriage, what Bertrand Russell called the supreme beauty, cold and austere, of Mathematics complements the supreme beauty, warm and engaging, of Physics. This book, which consists of nine articles, gives a flavor of these beauties and covers an ample range of mathematical subjects that play a relevant role in the study of physics and engineering. This range includes the study of free probability measures associated with p-adic number fields, non-commutative measures of quantum discord, non-linear Schro?dinger equation analysis, spectral operators related to holomorphic extensions of series expansions, Gibbs phenomenon, deformed wave equation analysis, and optimization methods in the numerical study of material properties.
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610   $aB-splines
610   $aBanach *-probability spaces
610   $abearing capacity
610   $acrack growth behavior
610   $adeformed wave equation
610   $adual tight framelets
610   $adynamic models
610   $afailure probability
610   $aFCM fuel
610   $aFourier-Legendre expansion
610   $afree probability
610   $ageneralized Fourier transform
610   $aGibbs phenomenon
610   $aholomorphic extension
610   $aHuygens' principle
610   $ainitial-boundary value problem
610   $aintersecting flaws
610   $amNLS equation
610   $anon-commutativity measure
610   $anon-Euclidean Fourier transform
610   $aoblique extension principle
610   $aoptimization
610   $ap-adic number fields
610   $aparticle model
610   $aparticle swarm optimization
610   $aprimes
610   $aprolongation structure
610   $aPSO
610   $aquantum discord
610   $aquasi-affine
610   $areinforced concrete
610   $arepresentation of ??(2,?)
610   $aretaining wall
610   $aRiemann-Hilbert problem
610   $asemicircular elements
610   $ashift-invariant system
610   $asilicon carbide
610   $aspherical Laplace transform
610   $athermal-mechanical performance
610   $atruncated linear functionals
610   $auniaxial compression
610   $aweighted-semicircular elements
615  7$aMathematics and Science
615  7$aResearch and information: general
700   $aDe Micheli$b Enrico$4edt$01289207
702   $aDe Micheli$b Enrico$4oth
906   $aBOOK
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996   $aMathematical Physics II$93021086
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