An integral test for quasiregularity

1. Yu. G. Reshetnyak, Space Mappings with Bounded Distortion [in Russian], Nauka, Novosibirsk (1982).

   Google Scholar 

2. J. Väisälä, “A survey of quasiregular maps in\(\mathbb{R}^n \),” in: Proceedings of the International Congress of Mathematicians, Helsinki, 1978,2 pp. 685–691.

3. S. P. Ponomarëv, “On a certain condition for quasiconformality,” Mat. Zametki,9, No. 6, 663–666 (1971).

   MATH  Google Scholar 

4. A. P. Kopylov, Stability in theC-Norm of Classes of Mappings, [in Russian], Nauka, Novosibirsk (1990).

   Google Scholar 

5. T. Rado and P. V. Reichelderfer, Continuous Transformations in Analysis, Springer, Berlin (1955).

   MATH  Google Scholar 

6. A. V. Chernavskiî, “Finite-to-one open mappings on manifolds,” Mat. Sb.,65, No. 3, 357–369 (1964).

   Google Scholar 

7. A. V. Chernavskiî, “A Supplement to the article: ‘Finite-to-one open mappings on manifolds’,” Mat. Sb.66, No. 3, 471–472 (1965).

   Google Scholar 

8. Yu. G. Reshetnyak, Space Mappings with Bounded Distortion, Amer. Math. Soc., Providence (1989).

   MATH  Google Scholar 

9. F. W. Gehring and O. Lehto, “On the total differentiability of functions of a complex variable,” Ann. Acad. Sci. Fenn. Ser. A I Math., No. 272, 3–9 (1959).

   Google Scholar 

10. S. L. Krushkal', “On absolute continuity and differentiability of some classes of mappings of many-dimensional domains,” Sibirsk. Mat. Zh.,6, No. 3, 692–696 (1965).

    Google Scholar 

11. E. M. Stein, Singular Integrals and Differentiability Properties of Functions, [Russian translation], Mir, Moscow (1973).

    MATH  Google Scholar 

12. H. Federer, Geometric Measure Theory, Springer, Berlin etc. (1969).

    MATH  Google Scholar 

13. S. Sacks, Theory of the Integral [Russian translation], Izdat. Inostr. Lit., Moscow (1949).

    Google Scholar 

14. W. Rudin, Real and Complex Analysis, Mc Graw-Hill Book Company, New York and London (1966).

    MATH  Google Scholar 

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