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References
V.F. Apeltzin, A.G. Kürktchan, Analytic Propeties of Wave Fields, MGU, Moscow, 1990.
J. Bony, P. Shapira, Existence et prolongement des solution holomorphes des equations aux dérivés partielles, Indent.Math. 17 (1972), 95–105.
D. Colton, On the Inverse Scattering Problems for Axially Symmetric Solutions of the Helmholtz Equation, Quart. J. Math. Oxford (2) 22 (1971), 125–130.
D. Colton, Integral Operators and Inverse Problems in Scattering Theory, Function Theoretic Method for Partial Differential Equations, Marmstadt, 1976, Springer Verlag Berlin/Heidelberg/New York, 1976, pp. 17–28.
R.Courant, D.Hilbert, Methoden der mathematischen Phisik, vol. 2, Berlin, 1937; Methods of Mathematical Phisics Interscience, New York, 1962.
Ph.Davis, The Schwarz Functions and its Applications, Carus Mathematical Monographs, MAA, 1979.
P. Garabedian, Partial Differential Equations with More Than Two Independent Variables in the Complex Domain, J.Math. Mech. 9 no. 2 (1960), 241–271.
P.Garabedian, Lectures on Function Theory and PDE, Rice University Studies 49 no. 4 (1963).
P. Garabedian, Partial differential equations, John Wiley and Sons Inc., New York-London-Sidney, 1964.
D.-A. Grave, Sur le problème de Dirichlet, Assoc. Francaise pour l'Avancement des Sciences 24 (1895), 111–136, Completes Rendus (Bordeaux).
J.Hadamard, Le problème de Cauchy et les équations aux dérivées partielles linéaires hyperboliques, Paris, 1932.
Y. Hamada, J. Leray, A. Takeuchi, Prolongements analytiques de la solution du problème de Cauchy linéaire, J.Math. Pures Appl. 64 (1985), 257–319.
P. Henrici, A Survey of I.N. Vekua's Theory of Elliptic Partial Differential Equations with Analytic Coefficeints, Z. Anegew. Math. Phys. 8 (1957), 169–203.
G.Herglotz, Über die analytishe Forsetzung des Potentials ins Innere der anziehenden Massen, Gekrönte Preisschr. der Jablonwskischen Gesellsch zu Leipzig, 1914, pp. 56.
J.Jeans, The Mathematicial Theory of Electricity and Magnetism, fifth ed., Reprinted 1966 by Cambrige Univ. Press, 1925.
F. John, The Fundamental Solution of Linear Elliptic Differential Equations with Analytic Coefficients, Comm. pure and appl. Math. 2 (1950), 213–304.
F. John, Plane Waves and Spherical Means Applied to Partial Differential Equations, Interscience Publishers Inc., New York, Interscience Publishers, Ltd., London, 1955.
G. Johnsson, Global Existence Results for Linear Analytic Partial Differential Equations, research report TRITA-MAT 1989-12, Royal Institute of Technology, Stockholm, 1989.
D.Khavinson, On Reflection of Harmonic Functions in Surfaces of Revolution, Preprint.
D.Khavinson, Singularities of Harmonic Functions in Cn, Proceedings of Symposia of Pure Applied Math., (to be published).
D. Khavinson, H.S. Shapiro, The Vekua Hull of a Plane Domain, Research report TRITA-MAT 1989-20, Royal Institute of Technology, Stockholm, 1989.
D. Khavinson, H.S. Shapiro, The Schwartz Potential in Rn and Cauchy's Problem for the Laplace Equation, Preprint, 1988, research report TRITA-MAT-1989-36, Royal Institute of Technology, Stockholm, 1989.
D. Khavinson, H.S. Shapiro, Remarks on the Reflection Principle for Harmonic Functions, Research report TRITA-MAT-1989-13, Royal Institute of Technology, Stockholm, 1989, Journal d'analyse mathematique 54 (1990), 60–76.
A.G. Kürktchan, On a Method of Auxiliary Currents and Sources in Wave Differential Problems, Radiotekhnika i Elektronika 29 no. 1 (1984), 2129–2139.
A.G. Kürktchan, Representation of Diffractional Fields by Wave potentials and Method of Auxiliary Currents in Problem on Diffraction of Electromagnetic Wavws, Radiotekhnika i Elektronika 31 no. 1 (1986), 20–27.
J. Leray, Unifoamisation de la solution du problème linéaire analytique près de la variété qui porte les donneś de Cauchy, Bull Soc. Math. France 85 (1957), 389–429.
J. Leray, Le calcul différentiel et intégral sur une variété analytique complexe (Problème de Cauchy, III), Bull. Soc. Math. France 87 fasc.II (1959), 81–180.
E.E. Levi, Sulle equazioni lineari totalmente elittiche alle derivate parziali, Rend. Circ. Mat. Palermo 24 (1907), 275–317.
H. Lewy, On the Reflection Laws of Second Order Differential Equations in Two Independant Variables, Bull. Amer.Math.Soc. 65 (1959), 37–58.
H. Lewy, Neuer Bewies des analytishen Charakters der Loesungen elliptisher Differentialgleichungen, Math.Ann. 101 (1929), 609–619.
J.-L. Lions, E. Magenes, Problèmes aux limites non homogènes et applications, vol. 1, Dunod, Paris, 1968.
R.F. Millar, On the Rayleigh Assumption in Scattering by a Periodic Surface, Proceedings of the Cambridge philosophical society 65 no. 3 (1969), 773–792.
R.F. Millar, Rayleigh Hypothesis in Scattering Problems, Electron Letters 5 (1969), 416–418.
R.F. Millar, The Location of Singularities of Two-dimensional Harmonic Functions, I, Theory, SIAM J.Math.Anal. 1 (1970), 333–344; II, Applications, 345–353.
R.F. Millar, On the Rayleigh Assumption in Scattering by a Periodic Surface, Proceedings of the Cambridge Philosophical Society 69 no. 1 (1971), 217–225.
R.F. Millar, Singularities of Solutions to Linear Second Order Analytic Elliptic Equations in Two Independant Variables, I, Applicable Anal. 1 (1971), 101–121.
R.F. Millar, Singularities of Two-dimensional Exterior Solutions of the Helmholtz Equation, Proceedings of the Cambridge philosophical Society 69 no. 1 (1971), 175–188.
R.F. Millar, Singularities of Solutions to Linear Second Order Analytic Equations in Two Independant Variables, II, Applicable Anal. 2 (1973), 301–320.
R.F.Millar, The singularities of solutions to analytic elliptic boundary value problems, Lecture Notes in Math no. 561 (1976), Function Theoretic Methods for Partial Differential Equations, Darmstadt, 1976, Springer-Verlag, Berlin/Heidelberg/New York.
R.F. Millar, Singularities of Solutions to Exterior Analytic Boundary Value Problems for Helmholtz Equation in Three Independant Variables, I. The plain boundary, SIAM J. on Math. Anal. 7 no. 1 (1976), 131–156.
R.F. Millar, Singularities of Solutions to Exterior Analytic Boundary Value Problems for Helmholtz Equation in Three Independant Variables, II. The axisymmetric boundary, SIAM J. Math. Anal. 10 no. 4 (1979), 682–694.
R.F. Millar, The Analytic Continuation of Solutions to Elliptic Boundary Value Problems in Two Independant Variables, J.Math. Anal. and Appl. 76 no. 2 (1980), 498–515.
R.F. Millar, The Analytic Continuation of Solutions of the Generalized Axially Symmetric Helmholtz Equations, Archive for Rat. Mech.Anal 81 no. 4 (1983), 349–372.
R.F. Millar, The Analytic Cauchy Problem for Fourth Order Elliptic Equations in Two Independent Variables, SIAM J.Math. Anal. 15 no. 5 (1984), 964–978.
R.F.Millar, Integral Representations for Solutions to Some Differential Equations That Arise in Wave Theory, Wave phenomena: Modern theory and applications (Toronto, 1983), North-Holland Math. Stud. 97, North-Holland Amsterdam-New York, 1984, pp. 391–408.
R.F. Millar, Singularities and the Rayleigh Hypothesis for Solutions to the Helmholtz Equation, IMA J.Appl. Math. 37 no. 2 (1986), 155–171.
R.F. Millar, Application of the Schwarz Function to Boundary Problems for Laplace's Equation, MAth. Methods Appl. Sci. 10 no. 1 (1988), 67–86.
M. Miyake, Global and Local Goursat Problems in a Class of Holomorphic or Partially Holomorphic Functions, J. Diff Eq. 39 (1981), 445–463.
F. Pham, Introduction à l'étude topologique des singularitś de Landau, Mém. Sci. Math. fasc. 164, Gauthier-Villars, Paris, 1967.
H.A.Schwarz, Ueber die Integration der partiellen Differentialglerchung \(\frac{{\partial ^2 u}}{{\partial x^2 }} + \frac{{\partial ^2 u}}{{\partial y^2 }} = 0\) unter vorgeschriebonen Grenz-und Unstetigkeitsbedingungen, Monatsber. der Königl Akad. der Wiss. zu Berlin (1870), 767–795.
H.S.Shapiro, The Schwarz Function and its Generalization to Higer Dimensions, University of Arkansas-Fayetteville Lecture Notes (1987), John Wiley.
H.S. Shapiro, An Algebraic Theorem of E.Fisher and the Holomorphic Goursat Problem, Bull. London Math. Soc. 21 (1989), 513–537.
H.S. Shapiro, Global Geometric Aspects of Cauchy's Problem for the Laplace operator, Research report TRITA-MAT-1989-37, Royal Institute of Technology, Stockholm, 1989.
B.D. Sleeman, The Three-dimensional Inverse Scattering Problem for the Helmholtz Equation, Proc. Cambridge Phil. Soc. 73 (1973), 477–488.
B.Yu.Sternin, V.E.Shatalov, Characteristic Cauchy Problem on a Complex Analytic Manifold, Lecture Notes in Math. 1108 (1984).
B.Yu. Sternin, V.E. Shatalov, Notes on a Problem of Balayage, Preprint, Moscow, 1990, pp. 23.
B.Yu.Sternin, V.E.Shatalov, The Laplace. Radon Transformation in Complex Analysis and some its Applications, (to be published), Soviet Mathem. (1991).
B.Yu. Sternin, V.E. Shatalov, On an Integral Transform of Complex-analytic Functions, Doklady Akad. Nauk SSSR 280 no. 3 (1985), 553–556.
B.Yu. Sternin, V.E. Shatalov, On an Integral Transform of Complex-analytic Functions, Izvestiya Akad. Nauk SSSR (ser. matem.) 5 (1986), 1054–1076.
B.Yu. Sternin, V.E. Shatalov, Singularities of Differential Equations on Complex Manifolds, Doklady Akad. Nauk SSSR 292 no. 5 (1987), 1058–1062.
B.Yu. Sternin, V.E. Shatalov, Singularities of Solutions of Differential Equations on Complex Manifolds (Characteristic Case), Geometry and Theory of Singularities in Non-linear Equations, VGU, Voronezh, 1987.
B.Yu. Sternin, V.E. Shatalov, Laplace-Radon Integral Operators and Singularities of Solutions of Differential Equations on Complex Manifolds, Global Analysis and Mathematical Phisics, VGU, Voronezh, 1987.
B.Yu. Sternin, V.E. Shatalov, Asymptotic Expansions of Solutions of Differential Equations on Complex Manifolds, Doklady Akad. Nauk SSSR 295 no. 1 (1987), 38–41.
B.Yu. Sternin, V.E. Shatalov, On an Integral Representation and Connected Transform of Complex Analytic Functions, Doklady Akad. Nauk SSSR 298 no. 1 (1988), 44–48.
B.Yu. Sternin, V.E. Shatalov, Laplace-Radon Integral Transform and its Applications to Non-Homogeneous Cauchy Problem in Complex space, Differentzialnye Uravneniya 24 no. 1 (1988), 167–174.
B.Yu. Sternin, V.E. Shatalov, Differential Equations on Complex-analytic Manifolds and Maslov's Canonical Operstor, Uspekhi Maternaticheskikh Nauk 43(3) no. 261 (1988), 99–124.
B.Yu. Sternin, V.E. Shatalov, Maslov's Method in Analytic Theory of Differential Equations with partial derivatives, (to appear), Nauka, Moscow, 1991.
B.Yu. Sternin, V.E. Shatalov, Singularities of solutions of Differential Equations on Complex Analytic Manifolds and “Balayage” Problem, (to appear), Proceedings of 3d School “Geometry ana Analysis” (1991), KGU, Kemerovo.
B.Yu. Sternin, V.E. Shatalov, On Fourier-Maslov Transform in Space of Multiple-valued Analytic Functions, Matematicheskiye Zametki, Moscow.
E. Study, Einige elementare Bemerkungen über den Prozess der analytischen Fortsetzung, Math Ann. 63 (1907), 239–245.
I.N. Vekua, New Methods for Solving Elliptic Equations, North-Holland Publishing Co. (translated from Russian), Amsterdam, 1967.
V.H.Weston, J.J.Bowman, E.Ar, On the electromagnetic inverse scattering problems, Arch. Rational Mech. Anal. (1968/69), 199–213.
M. Zerner, Domaine d'holomorphie des fonctions vérifiant une équation aux dérivées partielles, C. R. Acad. Sci. Paris 272 (1971), 1646–1648.
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Sternin, B.Y., Shatalov, V.E. (1992). Continuation of solutions to elliptic equations and localization of singularities. In: Borisovich, Y.G., Gliklikh, Y.E., Vershik, A.M. (eds) Global Analysis - Studies and Applications V. Lecture Notes in Mathematics, vol 1520. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0084724
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