Search results for "pac"

showing 10 items of 28794 documents

CCDC 871116: Experimental Crystal Structure Determination

2015

Related Article: Michael Mirion, Lars Andernach, Caroline Stobe, Joaquin Barjau, Dieter Schollmeyer, Till Opatz, Arne Lützen, Siegfried R. Waldvogel|2015|Eur.J.Org.Chem.|2015|4876|doi:10.1002/ejoc.201500600

21-ethyl-5710121618-hexamethyl-31423-trioxa-21-azahexacyclo[11.7.3.0113.0210.049.01520]tricosa-46811151719-heptaen-22-oneSpace GroupCrystallographyCrystal SystemCrystal StructureCell ParametersExperimental 3D Coordinates
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Why reg. (eu) no. 1103/2016 and 1104/2016 impact on the european citizens daily life?

2021

Why families do need the tools and instruments implemented by PSEFS Project? Why this is not an issue for lawyers, judges and University professors only. The answer to this question is that Reg. (EU) no. 1103/2016 and no. 1104/2016 impact on the European citizens daily life. We follow the problems of a young couple in order to have a better understanding and an evidence of this statement.

2386-4567 22661 Actualidad jurídica iberoamericana 587897 2021 15 8113558 Why reg. (eu) no. 1103/2016 and 1104/2016 impact on the european citizens daily life? Rimini:CIENCIAS JURÍDICAS [UNESCO]UNESCO::CIENCIAS JURÍDICASRégimen económico-matrimonialresidencia habitualjudges and University professors only. The answer to this question is that Reg. (EU) no. 1103/2016 and no. 1104/2016 impact on the European citizens daily life. We follow the problems of a young couple in order to have a better understanding and an evidence of this statement. Matrimonial property regimedivorcio. 214 221Carlo Why families do need the tools and instruments implemented by PSEFS Project? Why this is not an issue for lawyersley aplicabledivorceapplicable lawhabitual residence
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CCDC 141172: Experimental Crystal Structure Determination

2001

Related Article: Young Lag Cho, D.M.Rudkevich, A.Shivanyuk, K.Rissanen, J.Rebek Junior|2000|Chem.-Eur.J.|6|3788|doi:10.1002/1521-3765(20001016)6:20<3788::AID-CHEM3788>3.0.CO;2-Y

25262728-tetrakis((N-n-Butylcarbamoyl)methoxy)-5111723-tetra-nitrocalix(4)arene acetonitrile solvateSpace GroupCrystallographyCrystal SystemCrystal StructureCell ParametersExperimental 3D Coordinates
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CCDC 973532: Experimental Crystal Structure Determination

2014

Related Article: Ludovico G. Tulli, Negar Moridi, Wenjie Wang, Kaisa Helttunen, Markus Neuburger, David Vaknin, Wolfgang Meier, Patrick Shahgaldian|2014|Chem.Commun.|50|3938|doi:10.1039/C4CC00928B

25262728-tetrakis(Dodecyloxy)pentacyclo[19.3.1.137.1913.11519]octacosa-1(25)3(28)469(27)101215(26)16182123-dodecaene-5111723-tetracarboxylic acid pyridine solvateSpace GroupCrystallographyCrystal SystemCrystal StructureCell ParametersExperimental 3D Coordinates
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Space-filling vs. Luzin's condition (N)

2013

Let us assume that we are given two metric spaces, where the Hausdorff dimension of the first space is strictly smaller than the one of the second space. Suppose further that the first space has sigma-finite measure with respect to the Hausdorff measure of the corresponding dimension. We show for quite general metric spaces that for any measurable surjection from the first onto the second space, there is a set of measure zero that is mapped to a set of positive measure (both measures are the Hausdorff measures corresponding to the Hausdorff dimension of the first space). We also study more general situations where the measures on the two metric spaces are not necessarily the same and not ne…

28A75 (Primary) 54C10 26B35 28A12 28A20 (Secondary)General Mathematicsta111Hausdorff spaceMathematics::General TopologySpace (mathematics)Functional Analysis (math.FA)Mathematics - Functional AnalysisSurjective functionCombinatoricsSet (abstract data type)Metric spaceMathematics - Classical Analysis and ODEsHausdorff dimensionClassical Analysis and ODEs (math.CA)FOS: MathematicsMathematicsAnnales Academiae Scientiarum Fennicae Mathematica
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Visible parts of fractal percolation

2009

We study dimensional properties of visible parts of fractal percolation in the plane. Provided that the dimension of the fractal percolation is at least 1, we show that, conditioned on non-extinction, almost surely all visible parts from lines are 1-dimensional. Furthermore, almost all of them have positive and finite Hausdorff measure. We also verify analogous results for visible parts from points. These results are motivated by an open problem on the dimensions of visible parts.

28A80Plane (geometry)General MathematicsOpen problemProbability (math.PR)Mathematical analysisFractalDimension (vector space)Mathematics - Classical Analysis and ODEsPercolationHausdorff dimensionClassical Analysis and ODEs (math.CA)FOS: MathematicsHausdorff measureAlmost surelyMathematics - ProbabilityMathematics
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The richest superclusters : I Morphology

2007

We study the morphology of the richest superclusters from the catalogues of superclusters of galaxies in the 2dF Galaxy Redshift Survey and compare the morphology of real superclusters with model superclusters in the Millennium Simulation. We use Minkowski functionals and shapefinders to quantify the morphology of superclusters: their sizes, shapes, and clumpiness. We generate empirical models of simple geometry to understand which morphologies correspond to the supercluster shapefinders. We show that rich superclusters have elongated, filamentary shapes with high-density clumps in their core regions. The clumpiness of superclusters is determined using the fourth Minkowski functional $V_3$.…

2dF Galaxy Redshift SurveyPhysicsMorphology (linguistics)Large-scale structure of UniverseMinkowski functionalAstrophysics (astro-ph)FOS: Physical sciencesAstronomy and AstrophysicsAstrophysicsGalaxiesAstrophysicsUNESCO::ASTRONOMÍA Y ASTROFÍSICA:ASTRONOMÍA Y ASTROFÍSICA::Cosmología y cosmogonia [UNESCO]GalaxyCosmologyClustersSpace and Planetary ScienceSuperclusterMinkowski spaceUNESCO::ASTRONOMÍA Y ASTROFÍSICA::Cosmología y cosmogonia:ASTRONOMÍA Y ASTROFÍSICA [UNESCO]Cosmology ; Large-scale structure of Universe ; Galaxies ; Clusters
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Multi-scale morphology of the galaxy distribution

2006

Many statistical methods have been proposed in the last years for analyzing the spatial distribution of galaxies. Very few of them, however, can handle properly the border effects of complex observational sample volumes. In this paper, we first show how to calculate the Minkowski Functionals (MF) taking into account these border effects. Then we present a multiscale extension of the MF which gives us more information about how the galaxies are spatially distributed. A range of examples using Gaussian random fields illustrate the results. Finally we have applied the Multiscale Minkowski Functionals (MMF) to the 2dF Galaxy Redshift Survey data. The MMF clearly indicates an evolution of morpho…

2dF Galaxy Redshift SurveyPhysicsRandom fieldScale (ratio)GaussianAstrophysics (astro-ph)FOS: Physical sciencesAstronomy and AstrophysicsAstrophysicsAstrophysics::Cosmology and Extragalactic AstrophysicsAstrophysicsGalaxysymbols.namesakeDistribution (mathematics)Space and Planetary ScienceMinkowski spaceRange (statistics)symbols
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CCDC 784160: Experimental Crystal Structure Determination

2011

Related Article: R.Francke, G.Schnakenburg, S.R.Waldvogel|2010|Org.Lett.|12|4288|doi:10.1021/ol101698a

33'44'55'-Hexafluorobiphenyl-22'-diolSpace GroupCrystallographyCrystal SystemCrystal StructureCell ParametersExperimental 3D Coordinates
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CCDC 1908608: Experimental Crystal Structure Determination

2019

Related Article: Clève D. Mboyi, Delphine Vivier, Ahmad Daher, Paul Fleurat-Lessard, Hélène Cattey, Charles H. Devillers, Claire Bernhard, Franck Denat, Julien Roger, Jean-Cyrille Hierso|2020|Angew.Chem.,Int.Ed.|59|1149|doi:10.1002/anie.201911947

33'-([11'-biphenyl]-22'-diyl)bis[6-(2-fluorophenyl)-1245-tetrazine]Space GroupCrystallographyCrystal SystemCrystal StructureCell ParametersExperimental 3D Coordinates
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