Letteratura scientifica selezionata sul tema "Differentialgeometry"
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Articoli di riviste sul tema "Differentialgeometry":
Jankovský, Zdeněk. "Laguerre's differential geometry and kinematics". Mathematica Bohemica 120, n. 1 (1995): 29–40. http://dx.doi.org/10.21136/mb.1995.125894.
Brecher, Christian, Marcel Fey e Maria Hildebrand. "Methode zur Bestimmung von Hauptkrümmungen in Wälzkontakten/Method for Calculating Main Curvatures in Rolling Contacts". Konstruktion 68, n. 11-12 (2016): 74–82. http://dx.doi.org/10.37544/0720-5953-2016-11-12-74.
Shimada, Ichiro. "Zariski Hyperplane Section Theorem for Grassmannian Varieties". Canadian Journal of Mathematics 55, n. 1 (1 febbraio 2003): 157–80. http://dx.doi.org/10.4153/cjm-2003-007-9.
Biquard, Olivier, Simon Brendle e Bernhard Leeb. "Differentialgeometrie im Großen". Oberwolfach Reports 10, n. 3 (2013): 1929–74. http://dx.doi.org/10.4171/owr/2013/33.
Besson, Gérard, Ursula Hamenstädt e Michael Kapovich. "Differentialgeometrie im Großen". Oberwolfach Reports 12, n. 3 (2015): 1759–807. http://dx.doi.org/10.4171/owr/2015/31.
Besson, Gérard, Ursula Hamenstädt, Michael Kapovich e Ben Weinkove. "Differentialgeometrie im Großen". Oberwolfach Reports 14, n. 2 (27 aprile 2018): 1917–71. http://dx.doi.org/10.4171/owr/2017/31.
Besson, Gérard, Ursula Hamenstädt, Michael Kapovich e Ben Weinkove. "Differentialgeometrie im Großen". Oberwolfach Reports 16, n. 2 (3 giugno 2020): 1791–839. http://dx.doi.org/10.4171/owr/2019/30.
Bamler, Richard, Ursula Hamenstädt, Urs Lang e Ben Weinkove. "Differentialgeometrie im Grossen". Oberwolfach Reports 18, n. 3 (25 novembre 2022): 1685–734. http://dx.doi.org/10.4171/owr/2021/32.
Burghardt, R. "Gruppenwirkung und Differentialgeometrie". Annalen der Physik 502, n. 5 (1990): 383–90. http://dx.doi.org/10.1002/andp.19905020503.
Bamler, Richard, Otis Chodosh, Urs Lang e Ben Weinkove. "Differentialgeometrie im Grossen". Oberwolfach Reports 20, n. 3 (18 aprile 2024): 1617–70. http://dx.doi.org/10.4171/owr/2023/29.
Tesi sul tema "Differentialgeometry":
Demircioglu, Aydin. "Reconstruction of deligne classes and cocycles". Phd thesis, Universität Potsdam, 2007. http://opus.kobv.de/ubp/volltexte/2007/1375/.
In this thesis we mainly generalize two theorems from Mackaay-Picken and Picken (2002, 2004). In the first paper, Mackaay and Picken show that there is a bijective correspondence between Deligne 2-classes $xi in check{H}^2(M,mathcal{D}^2)$ and holonomy maps from the second thin-homotopy group $pi_2^2(M)$ to $U(1)$. In the second one, a generalization of this theorem to manifolds with boundaries is given: Picken shows that there is a bijection between Deligne 2-cocycles and a certain variant of 2-dimensional topological quantum field theories. In this thesis we show that these two theorems hold in every dimension. We consider first the holonomy case, and by using simplicial methods we can prove that the group of smooth Deligne $d$-classes is isomorphic to the group of smooth holonomy maps from the $d^{th}$ thin-homotopy group $pi_d^d(M)$ to $U(1)$, if $M$ is $(d-1)$-connected. We contrast this with a result of Gajer (1999). Gajer showed that Deligne $d$-classes can be reconstructed by a different class of holonomy maps, which not only include holonomies along spheres, but also along general $d$-manifolds in $M$. This approach does not require the manifold $M$ to be $(d-1)$-connected. We show that in the case of flat Deligne $d$-classes, our result differs from Gajers, if $M$ is not $(d-1)$-connected, but only $(d-2)$-connected. Stiefel manifolds do have this property, and if one applies our theorem to these and compare the result with that of Gajers theorem, it is revealed that our theorem reconstructs too many Deligne classes. This means, that our reconstruction theorem cannot live without the extra assumption on the manifold $M$, that is our reconstruction needs less informations about the holonomy of $d$-manifolds in $M$ at the price of assuming $M$ to be $(d-1)$-connected. We continue to show, that also the second theorem can be generalized: By introducing the concept of Picken-type topological quantum field theory in arbitrary dimensions, we can show that every Deligne $d$-cocycle induces such a $d$-dimensional field theory with two special properties, namely thin-invariance and smoothness. We show that any $d$-dimensional topological quantum field theory with these two properties gives rise to a Deligne $d$-cocycle and verify that this construction is surjective and injective, that is both groups are isomorphic.
Meyer, Arnd, e Andreas Steinbrecher. "Grundlagen der Differentialgeometrie". Universitätsbibliothek Chemnitz, 2000. http://nbn-resolving.de/urn:nbn:de:bsz:ch1-200000905.
Hamann, Marco. "Zur Differentialgeometrie zweiparametriger Geradenmengen im KLEINschen Modell". Doctoral thesis, [S.l.] : [s.n.], 2004. http://deposit.ddb.de/cgi-bin/dokserv?idn=974391425.
Hamann, Marco. "Zur Differentialgeometrie zweiparametriger Geradenmengen im KLEINschen Modell". Doctoral thesis, Saechsische Landesbibliothek- Staats- und Universitaetsbibliothek Dresden, 2005. http://nbn-resolving.de/urn:nbn:de:swb:14-1111593005151-37742.
In the available work line congruences of the projectively extended three-dimensional euclidean space will be analysed. Following to J. PLÜCKER lines can be seen as basic elements of an line space like in the same way points in a point-space. Taking this fact in consideration a "natural" handling with line congruences might be interesting and reasonable. A special detail in the thesis is the question to minimal congruences in the set of lines of the projectively extended euclidean three-space. It can also be seen as an analogous problem in the geometry of lines which can be find in the differential geometry of surfaces. In this case the line congruences are similar to the surfaces of the three-dimensional (point-)space. The phrase "minimal" means in the line space the connection to the minimal surfaces in the differential geometry. These questions offer in line geometry demonstrative interpretation possibilities if a point-model in the line space exists. One-parameter manifolds of lines (rule surfaces) can be seen in this ambiance as curves and line congruences as two dimensional surfaces. The four-parametric set of lines in the projectively extended three-dimensional euclidian space is in this model a quadric of the index 2 in a real projective five-dimensional space, the so called KLEIN-quadric. The changing of the model is managed by the KLEIN-mapping
Fels, Gregor. "Differentialgeometrische Charaktersisierung invarianter Holomorphiegebiete /". Bochum : Ruhr-Universität, Inst. für Mathematik, 1994. http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&doc_number=006663938&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA.
Welk, Martin. "Kovariante Differentialrechnung auf Quantensphären ungerader Dimension ein Beitrag zur nichtkommutativen Geometrie homogener Quantenräume /". [S.l. : s.n.], 1998. http://dol.uni-leipzig.de/pub/1999-3.
Heck, Thomas. "Methoden und Anwendungen der Riemannschen Differentialgeometrie in Yang-Mills-Theorien". [S.l. : s.n.], 1993. http://deposit.ddb.de/cgi-bin/dokserv?idn=962822760.
Heck e Thomas. "Methoden und Anwendungen der Riemannschen Differentialgeometrie in Yang-Mills-Theorien". Phd thesis, Universitaet Stuttgart, 1993. http://elib.uni-stuttgart.de/opus/volltexte/2001/916/index.html.
Schöberl, Markus. "Geometry and control of mechanical systems an Eulerian, Lagrangian and Hamiltonian approach". Aachen Shaker, 2007. http://d-nb.info/989019306/04.
Dittrich, Jens. "Über globale und lokale Einbettungen". [S.l. : s.n.], 2007. http://nbn-resolving.de/urn:nbn:de:bsz:289-vts-59884.
Libri sul tema "Differentialgeometry":
Kühnel, Wolfgang. Differentialgeometrie. Wiesbaden: Springer Fachmedien Wiesbaden, 2013. http://dx.doi.org/10.1007/978-3-658-00615-0.
Kühnel, Wolfgang. Differentialgeometrie. Wiesbaden: Vieweg+Teubner Verlag, 1999. http://dx.doi.org/10.1007/978-3-322-93981-4.
Kühnel, Wolfgang. Differentialgeometrie. Wiesbaden: Vieweg+Teubner, 2010. http://dx.doi.org/10.1007/978-3-8348-9655-1.
Kühnel, Wolfgang. Differentialgeometrie. Wiesbaden: Vieweg+Teubner Verlag, 2003. http://dx.doi.org/10.1007/978-3-322-92808-5.
Wünsch, Volkmar. Differentialgeometrie. Wiesbaden: Vieweg+Teubner Verlag, 1997. http://dx.doi.org/10.1007/978-3-663-05981-3.
Kühnel, Wolfgang. Differentialgeometrie. Wiesbaden: Vieweg+Teubner Verlag, 2005. http://dx.doi.org/10.1007/978-3-322-93422-2.
Jost, Jürgen. Differentialgeometrie und Minimalflächen. Berlin, Heidelberg: Springer Berlin Heidelberg, 1994. http://dx.doi.org/10.1007/978-3-662-06718-5.
Eschenburg, Jost-Hinrich, e Jürgen Jost. Differentialgeometrie und Minimalflächen. Berlin, Heidelberg: Springer Berlin Heidelberg, 2014. http://dx.doi.org/10.1007/978-3-642-38522-3.
Malkowsky, Eberhard, e Wolfgang Nickel. Computergrafik in der Differentialgeometrie. A cura di Kurt Endl. Wiesbaden: Vieweg+Teubner Verlag, 1993. http://dx.doi.org/10.1007/978-3-663-05912-7.
Nakahara, Mikio. Differentialgeometrie, Topologie und Physik. Berlin, Heidelberg: Springer Berlin Heidelberg, 2015. http://dx.doi.org/10.1007/978-3-662-45300-1.
Capitoli di libri sul tema "Differentialgeometry":
Hilbert, David, e Stephan Cohn-Vossen. "Differentialgeometrie". In Anschauliche Geometrie, 151–239. Berlin, Heidelberg: Springer Berlin Heidelberg, 1996. http://dx.doi.org/10.1007/978-3-642-19948-6_4.
Dombrowski, Peter. "Differentialgeometrie". In Ein Jahrhundert Mathematik 1890–1990, 323–60. Wiesbaden: Vieweg+Teubner Verlag, 1990. http://dx.doi.org/10.1007/978-3-322-80265-1_7.
Brauch, Wolfgang, Hans-Joachim Dreyer e Wolfhart Haacke. "Differentialgeometrie". In Mathematik für Ingenieure, 436–60. Wiesbaden: Vieweg+Teubner Verlag, 1990. http://dx.doi.org/10.1007/978-3-322-91789-8_8.
Brauch, Wolfgang, Hans-Joachim Dreyer e Wolfhart Haacke. "Differentialgeometrie". In Mathematik für Ingenieure, 436–60. Wiesbaden: Vieweg+Teubner Verlag, 2003. http://dx.doi.org/10.1007/978-3-322-91830-7_8.
Brauch, Wolfgang, Hans-Joachim Dreyer e Wolfhart Haacke. "Differentialgeometrie". In Mathematik für Ingenieure, 436–60. Wiesbaden: Vieweg+Teubner Verlag, 1995. http://dx.doi.org/10.1007/978-3-322-91831-4_8.
do Carmo, Manfredo P., Gerd Fischer, Ulrich Pinkall e Helmut Reckziegel. "Differentialgeometrie". In Mathematische Modelle, 25–51. Wiesbaden: Vieweg+Teubner Verlag, 1986. http://dx.doi.org/10.1007/978-3-322-85045-4_3.
Fischer, Helmut, e Helmut Kaul. "Differentialgeometrie". In Mathematik für Physiker Band 3, 189–320. Berlin, Heidelberg: Springer Berlin Heidelberg, 2017. http://dx.doi.org/10.1007/978-3-662-53969-9_2.
Taschner, Rudolf. "Differentialgeometrie". In Anwendungsorientierte Mathematik Band für ingenieurwissenschaftliche Fachrichtungen, 74–119. München: Carl Hanser Verlag GmbH & Co. KG, 2014. http://dx.doi.org/10.3139/9783446441668.002.
Gärtner, Karl-Heinz, Margitta Bellmann, Werner Lyska e Roland Schmieder. "Differentialgeometrie". In Mathematik für Ingenieure und Naturwissenschaftler, 146–68. Wiesbaden: Vieweg+Teubner Verlag, 1995. http://dx.doi.org/10.1007/978-3-322-81034-2_4.
Taschner, Rudolf. "Differentialgeometrie". In Anwendungsorientierte Mathematik, 74–119. 2a ed. München: Carl Hanser Verlag GmbH & Co. KG, 2021. http://dx.doi.org/10.3139/9783446472020.002.
Atti di convegni sul tema "Differentialgeometry":
Terze, Zdravko, Joris Naudet e Dirk Lefeber. "Constraint Gradient Projective Method for Stabilized Dynamic Simulation of Constrained Multibody Systems". In ASME 2003 International Design Engineering Technical Conferences and Computers and Information in Engineering Conference. ASMEDC, 2003. http://dx.doi.org/10.1115/detc2003/vib-48314.