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200 12$aA sermon preached in Christ-Church before His Excellency the Lord Deputy and the Parliament, on the fifth day of November, 1695$b[electronic resource] $ebeing the anniversary thanksgiving for the happy deliverance of K. James Ist, and the three estates of the realm of England from the most trayterous intended massacre by gun-powder : and also for the happy arrival of His present Majesty K. William on that day, for the deliverance of our church and nation /$fby Tobias, Lord Bishop of Dromore
210   $aDublin $cPrinted for William Norman ...$d1695
215   $a[2], 19 [i.e. 17] p
300   $aReproduction of original in the Cambridge University Library.
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606   $aSermons, Irish$y17th century
607   $aGreat Britain$xHistory$yStuarts, 1603-1714$vSermons
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100 1 $aGiovannini, Alberto$0111410
245 10$a8 settembre 1943 :$bpieta e tragedia /$cmonografia di Alberto Giovannini
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300   $aXXXI, 197 p. :$bill. ;$c24 cm.
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200 10$aCarleman estimates for coefficient inverse problems and numerical applications /$fM. V. Klibanov and A. Timonov
210  1$aUtrecht, [Netherlands] ;$aBoston, [Massachusetts] :$cVSP,$d2004.
210  4$dİ2004
215   $a1 online resource (282 p.)
225 1 $aInverse and Ill-Posed Problems Series
300   $aDescription based upon print version of record.
311   $a3-11-062749-3 
311   $a90-6764-405-6 
320   $aIncludes bibliographical references.
327   $tFrontmatter -- $tPreface -- $tContents -- $tChapter 1. Introduction -- $tChapter 2. Carleman estimates and ill-posed Cauchy problems -- $tChapter 3. Global uniqueness results in high dimensions -- $tChapter 4. The global uniqueness of a nonlinear parabolic problem -- $tChapter 5. On the numerical solution of coefficient inverse problems -- $tChapter 6. Some globally convergent convexification algorithms -- $tChapter 7. Some applied problems -- $tBibliography
330   $aIn this monograph, the main subject of the author's considerations is coefficient inverse problems. Arising in many areas of natural sciences and technology, such problems consist of determining the variable coefficients of a certain differential operator defined in a domain from boundary measurements of a solution or its functionals. Although the authors pay strong attention to the rigorous justification of known results, they place the primary emphasis on new concepts and developments.
410  0$aInverse and ill-posed problems series.
606   $aInverse problems (Differential equations)$xNumerical solutions
610   $aBoundary Measurements.
610   $aCoefficient Inverse Problems.
610   $aCoefficients.
610   $aDifferential Operator.
615  0$aInverse problems (Differential equations)$xNumerical solutions.
676   $a515/.357
700   $aKlibanov$b M. V$g(Michael V.),$01179153
702   $aTimonov$b A. A$g(Aleksandr Anatoevich),
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996   $aCarleman estimates for coefficient inverse problems and numerical applications$93808458
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