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Modulus of surface families and the radial stretch in the Heisenberg group

Published online by Cambridge University Press:  26 May 2016

IOANNIS D. PLATIS*
Affiliation:
Department of Mathematics and Applied Mathematics, University of Crete, GR 70013 Heraklion Crete, Greece. e-mail: [email protected]

Abstract

We develop a modulus method for surface families inside a domain in the Heisenberg group and we prove that the stretch map between two Heisenberg spherical rings is a minimiser for the mean distortion among the class of contact quasiconformal maps between these rings which satisfy certain boundary conditions.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 2016 

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References

REFERENCES

[1] Astala, K., Iwaniec, T., Martin, G. J. and Onninen, J. Extremal mappings of finite distortion. Proc. Lon. Math. Soc. 3 (2005), 655702.Google Scholar
[2] Balogh, Z. M., Fässler, K. and Platis, I. D. Modulus method and radial stretch map in the Heisenberg group. Ann. Acad. Sci. Fenn. 38 (2013), 132.Google Scholar
[3] Balogh, Z. M., Fässler, K. and Platis, I. D. Modulus of curve families and extremality of spiral–stretch maps. J. Anal. Math. 113 (2011), 265291.Google Scholar
[4] Capogna, L., Danielli, D., Pauls, S. D. and Tyson, J. T. An introduction to the Heisenberg group and the sub-Riemannian isoperimetric problem. Progr. Math. 259 (Birkhuser Verlag, Basel, 2007).Google Scholar
[5] Dairbekov, N. S. On mappings of bounded distortion on the Heisenberg group. Sib. Math. Zh. 41 (1), (2000), 4959.Google Scholar
[6] Do Carmo, M. P. Differential geometry of curves and surfaces (Prentice-Hall, NJ, 1976).Google Scholar
[7] Fuglede, B. Extremal length and functional completion. Acta Math. 98 (1), 171219.Google Scholar
[8] Gardiner, F. and Lakic, N. Quasiconformal Teichmüller theory. Math. Surv. and Mon. 76 (AMS, 2000).Google Scholar
[9] Grötzsch, H. Über möglichst konforme Abbildungen von schlichten Bereichen. Ber. Math.-phys. Kl. Sachs. Akad. Wis. Leipsig. 84 (1932), 114120.Google Scholar
[10] Gutlyanskii, V. and Martio, O. Rotation estimates and spirals. Conf. Geom. Dyn. 5 (2001), 620.Google Scholar
[11] Heinonen, J. Calculus on Carnot groups. In: Fall school in Analysis (Jyväskylä, 1994), Report 68 (Univ. Jyväskylä, Jyväskylä, 1995), 1–31.Google Scholar
[12] Kirchheim, B. and Serra Cassano, F. Rectifiability and parametrization of intrinsic regular surfaces in the Heisenberg group. Ann. Sc. Norm. Sup. Pisa CI. Sci. 5 (2004), 871896.Google Scholar
[13] Korányi, A. and Reimann, H. M. Foundations for the theory of quasiconformal mappings of the Heisenberg group. Adv. in Math. 111 (1995), 187.Google Scholar
[14] Korányi, A. and Reimann, H. M. Quasiconformal mappings on the Heisenberg group. Invent. Math. 80 (2) (1985), 309338.Google Scholar
[15] Martin, G. J. The Teichmüller problem for mean distortion. Ann. Acad. Sci. Fenn. Math. 34 (2009), 233247.Google Scholar
[16] Mostow, G. D. Strong rigidity in locally symmetric spaces. Ann. Math. Stud. 78 (Princeton University Press, Princeton, N.J., 1973).Google Scholar
[17] Pansu, P. Métriques de Carnot-Carathéodory et quasiisométries des espaces symétriques de rang un. Ann. of Math. 129 (1989), 160.CrossRefGoogle Scholar
[18] Platis, I. D. Straight ruled surfaces in the Heisenberg group. J. Geom. 105 (2014), 119138.CrossRefGoogle Scholar
[19] Platis, I. D. The geometry of complex hyperbolic packs. Math. Proc. Cam. Phil. 147 (2009), 205234.Google Scholar
[20] Strebel, K. Extremal quasiconformal mappings. Res. Math. 10 (1986), 168210.Google Scholar
[21] Strebel, K. Quadratic differentials (Springer-Verlag, Berlin and New York, 1984).Google Scholar
[22] Teichmüller, O. Extremale quasikonforme Abbildungen und quadratische Differentiale. Abh. Preuss. Akad. Wiss. Math.-Nat. Kl. 22 (1939), 197.Google Scholar
[23] Vasil'ev, A. Moduli of families of curves for conformal and quasiconformal mappings (Springer-Verlag, Berlin and New York, 2004).Google Scholar
[24] Vodop'yanov, S. K. Monotone functions and quasiconformal mappings on Carnot groups. Sib. Math. Zh. 37 (6) (1996), 12691295.Google Scholar