Abstract
We study the Riemann boundary-value problem on non-rectifiable curves for holomorphic matrices with Fokas–Its–Kitaev asymptotics by means of the Cauchy transforms of certain distributions with supports on that curves. The main results concern the existence of solutions of sufficiently large degree.
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References
Gakhov, F. D. “Das Riemannsche Randwertproblem fúr ein System von n Funktionenpaaren”, Usp. Mat. Nauk 7, No. 4, 3–54 (1952) [in Russian].
Litvinchuk, G. S., Spitkovsky, I. M. Factorization of Measurable Matrix Functions, Operator Theory: Advances and Appl. 25, (Birkhauser Verlag, Basel–Boston, 1987).
Deift, P. Orthogonal Polynomials and Random Matrices: a Riemann–Hilbert Approach (Courant Lect. Notes, Vol. 3, New York Univ., 1999).
Aptekarev, A. I. “Matrix Riemann–Hilbert Analysis for the Case of Higher Genus—Asymptotics of Polynomials Orthogonal on a System of Intervals”, Keldysh Inst. preprints, No. 28 (2008).
Aptekarev, A. I. and Van Assche, W. “Scalar and Matrix Riemann–Hilbert Approach to the Strong Asymptotics of PadéApproximants and Complex Orthogonal Polynomials with Varying Weight”, J. Approxim. Theory 129, 129–166 (2004).
Kats, B. A. “The Cauchy Transform of Certain Distributions with Application”, Compl. Anal. and Oper. Theor. 6, No. 6, 1147–1156 (2012).
Abreu-Blaya, R., Bory-Reyes, J., Kats, B. A. “Integration overNonrectifiable Curves and Riemann Boundary Value Problems”, J.Math. Anal. and Appl. 380, No. 1, 177–187 (2011).
Kats, B. A., Katz, D. B. “The SzegöFunction on Non-Rectifiable Arc”, Russian Mathematics 56, No. 4, 9–18 (2012).
Hörmander, L. The Analysis of Linear PartialDifferentialOperators. I.Distribution Theory and Fourier Analysis (Springer-Verlag, Berlin Helderberg New York Tokyo 1983;Mir,Moscow, 1986).
Kolmogorov, A. N., Tikhomirov, V. M. “e-Entropy and Capacity of Sets in Functional Spaces”, Usp.Mat. Nauk 14, No. 2, 3–86 (1959).
Falconer, K. J. Fractal Geometry. 3rd Ed. (Wiley and Sons, 2014).
Gakhov, F. D. Boundary Value Problems (Nauka, Moscow, 1977) [in Russian].
Muskhelishvili, N. I. Singular Integral Equations (Nauka, Moscow, 1962) [in Russian].
Kats, B. A. “Riemann Boundary Value Problem on Non-Smooth Arcs and Fractal Dimensions”, St. Petersbg.Math. J. 6, No. 1, 147–171 (1995).
Kats, B. A. “The Riemann Boundary Value Problem on Non-Rectifiable Curves and Related Questions”, Complex Variables and Elliptic Equat.: An International J. 59, No. 8, 1053–1069 (2014).
Dolzhenko E.P. “Über die ‘Aufhebung’ von Singularitä ten analytischer Funktionen”, UspekhiMat. Nauk 18, No. 4, 135–142 (1963) [in Russian].
Nikishin, E. M., Sorokin, V. N. Rational Approximations and Orthogonality (Nauka, Moscow, 1988) [in Russian].
Zverovich, È. I. “Boundary value problems in the theory of analytic functions in Hölder classes on Riemann surfaces”, Usp.Mat. Nauk 26, No. 1, 113–179 (1971) [in Russian].
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Original Russian Text ©B.A. Kats, 2017, published in Izvestiya Vysshikh Uchebnykh Zavedenii. Matematika, 2017, No. 2, pp. 22–33.
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Kats, B.A. Riemann boundary-value problem for holomorphic matrices on non-rectifiable curve. Russ Math. 61, 17–27 (2017). https://doi.org/10.3103/S1066369X17020037
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DOI: https://doi.org/10.3103/S1066369X17020037