LEADER 02617oam  2200445   450 
001 996418195703316
005 20210506102323.0
010   $a3-030-54154-1
024 7 $a10.1007/978-3-030-54154-5
035   $a(CKB)4100000011586021
035   $a(DE-He213)978-3-030-54154-5
035   $a(MiAaPQ)EBC6404862
035   $a(PPN)251087115
035   $a(EXLCZ)994100000011586021
100   $a20210506d2020      uy             0
101 0 $aeng
135   $aurnn#008mamaa
181   $ctxt$2rdacontent
182   $cc$2rdamedia
183   $acr$2rdacarrier
200 10$aGeometry and analysis of metric spaces via weighted partitions /$fJun Kigami
205   $a1st ed. 2020.
210  1$aCham, Switzerland :$cSpringer,$d[2020]
210  4$d©2020
215   $a1 online resource (VIII, 164 p. 10 illus.)
225 1 $aLecture Notes in Mathematics ;$vVolume 2265
311   $a3-030-54153-3 
330   $aThe aim of these lecture notes is to propose a systematic framework for geometry and analysis on metric spaces. The central notion is a partition (an iterated decomposition) of a compact metric space. Via a partition, a compact metric space is associated with an infinite graph whose boundary is the original space. Metrics and measures on the space are then studied from an integrated point of view as weights of the partition. In the course of the text: It is shown that a weight corresponds to a metric if and only if the associated weighted graph is Gromov hyperbolic. Various relations between metrics and measures such as bilipschitz equivalence, quasisymmetry, Ahlfors regularity, and the volume doubling property are translated to relations between weights. In particular, it is shown that the volume doubling property between a metric and a measure corresponds to a quasisymmetry between two metrics in the language of weights. The Ahlfors regular conformal dimension of a compact metric space is characterized as the critical index of p-energies associated with the partition and the weight function corresponding to the metric. These notes should interest researchers and PhD students working in conformal geometry, analysis on metric spaces, and related areas.
410  0$aLecture notes in mathematics ;$vVolume 2265.
606   $aConformational analysis
615  0$aConformational analysis.
676   $a541.223
700   $aKigami$b Jun$065976
801  0$bCaPaEBR
801  1$bCaPaEBR
801  2$bUtOrBLW
906   $aBOOK
912   $a996418195703316
996   $aGeometry and Analysis of Metric Spaces via Weighted Partitions$91768616
997   $aUNISA

LEADER 01568nam  2200433Ia 450 
001 996383627303316
005 20221108090355.0
035   $a(CKB)1000000000598969
035   $a(EEBO)2240935981
035   $a(OCoLC)12375345
035   $a(EXLCZ)991000000000598969
100   $a19850812d1665      uy             |
101 0 $alat
135   $aurbn||||a|bb|
200 10$aRemonstrantia Hibernorum contra Lovanienses$b[electronic resource] $eultramontanasque censuras, de incommutabili regum imperio, subditorumque fidelitate, et obedientia indispensabili : ex S.S. Scripturis, patribus, theologis, &c. vindicata : cum duplici$fauthore R.P.F.R. Caron ..
210   $a[London $cs.n.]$d1665
215   $a[24], 266, [2], 94, 102, [7] p
300   $aReproduction of original in Cambridge University Library.
300   $aAttributed to Raymond Caron. cf. BM.
300   $a"Remonstrantia Hibernorum contra Lovanienses, &c vindicata" begins new paging.
300   $aTable of contents: p. [1]-[7] at end.
330   $aeebo-0021
606   $aChurch and state$zIreland
606   $aCatholics$zIreland
606   $aGallicanism
606   $aPopes$xInfallibility
615  0$aChurch and state
615  0$aCatholics
615  0$aGallicanism.
615  0$aPopes$xInfallibility.
700   $aCaron$b R$g(Redmond),$f1605?-1666.$01001612
801  0$bEAA
801  1$bEAA
801  2$bm/c
801  2$bWaOLN
906   $aBOOK
912   $a996383627303316
996   $aRemonstrantia Hibernorum contra Lovanienses$92326313
997   $aUNISA