Gotowa bibliografia na temat „Teichmüller disc”
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Artykuły w czasopismach na temat "Teichmüller disc"
Hubert, Pascal, Erwan Lanneau i Martin Möller. "The Arnoux–Yoccoz Teichmüller disc". Geometric and Functional Analysis 18, nr 6 (11.02.2009): 1988–2016. http://dx.doi.org/10.1007/s00039-009-0706-y.
Pełny tekst źródłaChaika, Jon, i Pascal Hubert. "Circle averages and disjointness in typical translation surfaces on every Teichmüller disc". Bulletin of the London Mathematical Society 49, nr 5 (4.07.2017): 755–69. http://dx.doi.org/10.1112/blms.12065.
Pełny tekst źródłaYAO, GUOWU. "HAMILTON SEQUENCES FOR EXTREMAL QUASICONFORMAL MAPPINGS OF DOUBLY-CONNECTED DOMAINS". Bulletin of the Australian Mathematical Society 88, nr 3 (22.03.2013): 376–79. http://dx.doi.org/10.1017/s0004972713000191.
Pełny tekst źródłaTanigawa, Harumi. "Holomorphic families of geodesic discs in infinite dimensional Teichmüller spaces". Nagoya Mathematical Journal 127 (wrzesień 1992): 117–28. http://dx.doi.org/10.1017/s0027763000004128.
Pełny tekst źródłaJINHUA, FAN, i CHEN JIXIU. "ON INFINITESIMAL TEICHMÜLLER SPACE". Bulletin of the Australian Mathematical Society 78, nr 2 (październik 2008): 293–300. http://dx.doi.org/10.1017/s0004972708000749.
Pełny tekst źródłaLI, Zhong. "Geodesic discs in Teichmüller space". Science in China Series A 48, nr 8 (2005): 1075. http://dx.doi.org/10.1360/04ys0122.
Pełny tekst źródłaAulicino, David. "Teichmüller discs with completely degenerate Kontsevich–Zorich spectrum". Commentarii Mathematici Helvetici 90, nr 3 (2015): 573–643. http://dx.doi.org/10.4171/cmh/365.
Pełny tekst źródłaTang, Robert, i Richard C. H. Webb. "Shadows of Teichmüller Discs in the Curve Graph". International Mathematics Research Notices 2018, nr 11 (4.02.2017): 3301–41. http://dx.doi.org/10.1093/imrn/rnw318.
Pełny tekst źródłaHubert, Pascal, i Samuel Lelièvre. "Prime arithmetic Teichmüller discs in $$\mathcal{H}(2)$$". Israel Journal of Mathematics 151, nr 1 (grudzień 2006): 281–321. http://dx.doi.org/10.1007/bf02777365.
Pełny tekst źródłaRozprawy doktorskie na temat "Teichmüller disc"
Viglioni, Humberto Henrique de Barros. "Dinâmica de vórtices em superfícies com aplicações ao problema de dois vórtices no toro plano". Universidade de São Paulo, 2013. http://www.teses.usp.br/teses/disponiveis/45/45132/tde-03042017-161053/.
Pełny tekst źródłaIn this thesis the equations for the motion of vortices on Riemannian surfaces is studied. Using conservation of momentum and physical arguments, the classical equations of Hally and Boatto/Koiller are recovered. Then the localization result for the Euler\'s equation with flat metric (Marchioro and Pulvirenti) and the determination of the Green\'s and Robin\'s functions on plane domains are revisited in the context of Riemannian surfaces. On a second part of the thesis two examples are analyzed. At first the dynamics of a passive tracer in the unit disk on the flat plane with constant background vorticity. At second the dynamics of two vortices on flat tori. This last system is integrable. The dynamics is determined by the level sets of the Green\'s function which depends on the modular parameter of the torus. The full bifurcation diagram of the system as a function of the module parameter is determined.
Cheboui, Smail. "Intersection Algébrique sur les surfaces à petits carreaux". Electronic Thesis or Diss., Montpellier, 2021. http://www.theses.fr/2021MONTS006.
Pełny tekst źródłaWe study the quantity denoted Kvol defined by KVol(X,g) = Vol(X,g)*sup_{alpha,beta} frac{Int(alpha,beta)}{l_g (alpha)l_g(beta)} where X is a compact surface of genus s, Vol(X,g) is the volume (area) of the surface with respect to the metric g and alpha, beta two simple closed curves on the surface X.The main results of this thesis can be found in Chapters 3 and 4. In Chapter 3 titled "Algebraic intersection for translation surfaces in the stratum H(2)" we are interested in the sequence of kvol of surfaces L(n,n) and we provide that KVol(L(n,n)) goes to 2 when n goes to infinity. In Chapter 4 titled "Algebraic intersection for translation surfaces in a family of Teichmüller disks" we are interested in the Kvol for a surfaces belonging to the stratum H(2s-2) wich is an n-fold ramified cover of a flat torus. We are also interested in the surfaces St(2s-1) and we show that kvol(St(2s-1))=2s-1. We are also interested in the minimum of Kvol on the Teichmüller disk of the surface St(2s-1) which will be (2s-1)sqrt {frac {143}{ 144}} and it is achieved at the two points (pm frac{9}{14}, frac{sqrt{143}}{14})
Części książek na temat "Teichmüller disc"
Fresse, Benoit. "Little discs operads, graph complexes and Grothendieck-Teichmüller groups". W Handbook of Homotopy Theory, 405–41. Chapman and Hall/CRC, 2020. http://dx.doi.org/10.1201/9781351251624-11.
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