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200 10$aKearny's own$b[electronic resource] $ethe history of the First New Jersey Brigade in the Civil War /$fBradley M. Gottfried
210   $aNew Brunswick, N.J. $cRutgers University Press$dc2005
215   $a1 online resource (325 p.) 
300   $aBibliographic Level Mode of Issuance: Monograph
311   $a0-8135-3661-8 
320   $aIncludes bibliographical references (p. 259-286) and index.
607   $aNew Jersey$xHistory$yCivil War, 1861-1865$xRegimental histories
607   $aUnited States$xHistory$yCivil War, 1861-1865$xRegimental histories
607   $aUnited States$xHistory$yCivil War, 1861-1865$xCampaigns
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997   $aUNINA

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200 10$aUniform rectifiability and quasiminimizing sets of arbitrary codimension /$fGuy David, Stephen Semmes
210  1$aProvidence, Rhode Island :$cAmerican Mathematical Society,$d[2000]
210  4$dİ2000
215   $a1 online resource (146 p.)
225 1 $aMemoirs of the American Mathematical Society,$x0065-9266 ;$vnumber 687
300   $a"March 2000, volume 144, number 687 (end of volume)."
311   $a0-8218-2048-6 
320   $aIncludes bibliographical references (page 131).
327   $a""Contents""; ""Chapter 0. Introduction""; ""Chapter 1. Quasiminimizers""; ""Chapter 2. Uniform Rect inability and the Main Result""; ""Chapter 3. Lipschitz Projections into Skeleta""; ""Chapter 4. Local Ahlfors-Regularity""; ""Chapter 5. Lipschitz Mappings with Big Images""; ""Chapter 6. From Lipschitz Functions to Projections""; ""Chapter 7. Regular Sets and Cubical Patchworks""; ""Chapter 8. A Stopping-Time Argument""; ""Chapter 9. Proof of Main Lemma 8.7""; ""9.1. A general deformation result""; ""9.2. Application to quasiminimizers""; ""Chapter 10. Big Projections""
327   $a""Chapter 11. Restricted and Dyadic Quasiminimizers""""Chapter 12. Applications""; ""12.1. The initial set-up""; ""12.2. Stability of sets""; ""12.3. Topological interpretations""; ""12.4. Polyhedral approximations and minimizers""; ""12.5. General sets""; ""Bibliography""
410  0$aMemoirs of the American Mathematical Society ;$vno. 687.
606   $aMinimal surfaces
606   $aGeometric measure theory
606   $aFourier analysis
615  0$aMinimal surfaces.
615  0$aGeometric measure theory.
615  0$aFourier analysis.
676   $a510 s
676   $a516.3/62
700   $aDavid$b Guy$f1957-$01101804
702   $aSemmes$b Stephen$f1962-
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