References
- Guenther BD. Modern optics. 2nd ed. New York: Oxford University Press; 2015.
- Poincaré H. Sur les équations de la physique mathématique. Rend Palermo. 1894;8:57–155. doi: 10.1007/BF03012493
- Sommerfeld A. Partial differential equations in physics. New York: Academic Press Inc.; 1949.
- Chung KL. Notes on the inhomogeneous Schrödinger equation. In: Cinlar E, Chung KL, Getoor RK, editors. Seminar on stochastic processes, 1984. Boston: Birkhäuser; 1986. p. 55–62.
- Gunning RC. Introduction to holomorphic functions of several variables. Vol.II: Function theory. Belmont, California: Wadsworth; 1990.
- Schwartz L. Théorie des distributions, I, II (1950–1951). Paris: Hermann.
- Tao T. The Schrödinger equation. Available from: www.math.ucla.edu/tao/preprints/schrodinger.pdf.
- Tung C. On Wirtinger derivations, the adjoint of the operator ∂¯, and applications. Izv RAN Ser Mat. 2018;82(6):172–199. Izv Math 2018;82(6):1239–1264. doi: 10.4213/im8625
- Tung C. The first main theorem of value distribution on complex spaces. Atti Accad Naz Lincei Mem Cl Sci Fis Mat Natur Sez Ia (8). 1979;15(4):91–263.
- Grauert H, Remmert R. Theory of Stein spaces. Berlin-Heidelberg-New York: Springer; 1979. (Grundl. Math. Wiss.; 236).
- Tung C. On generalized integral means and Euler type vector fields. Complex Anal Oper Theory. 2011;5(3):701–730. doi: 10.1007/s11785-010-0086-1
- King J. The currents defined by analytic varieties. Acta Math. 1971;127:185–220. doi: 10.1007/BF02392053
- Stoll W. The multiplicity of a holomorphic map. Invent Math. 1966;2:15–58. doi: 10.1007/BF01403389
- Chung KL, Zhao ZX. From Brownian motion to Schrödinger's equation. Berlin: Springer-Verlag; 1995. (Grundlehren der Mathematischen Wissenschaften [Fundamental principles of mathematical sciences]; 312).
- Tung C. On the weak solvability of Schrödinger type equations with boundary conditions. Mathematical Reports, Selected papers from the International Conference on Complex Analysis and Related Topics, and the 13th Romanian-Finnish Seminar (26–30 June 2012), Vol. 15 (65), No. 4. 2013. p. 497–510.
- Grauert H, Remmert R. Coherent analytic sheaves. Berlin-Heidelberg-New York: Springer; 1984. (Grundl. Math. Wiss.; 265).
- Stoll W. The continuity of the fiber integral. Math Zeit. 1967;95:87–138. doi: 10.1007/BF01111553
- Andreotti A, Stoll W. Analytic and algebraic dependence of meromorphic functions. Berlin-Heidelberg-New York: Springer; 1971. (Lecture notes mathematics; 234).
- Gunning RC. Introduction to holomorphic functions of several variables. Vol. II: Local theory. Belmont, California: Wadsworth; 1990.
- Lanza de Cristoforis M, Rossi L. Real analytic dependence of simple and double layer potentials for the Helmholtz equation upon perturbation of the support and of the density. In: Kilbas AA, Rogosin SV, editors. Analytic methods of analysis and differential equations, AMADE 2006. Cambridge: Cambridge Scientific Publishers; 2008. p. 193–220.
- Lanza de Cristoforis M. Simple Neumann eigenvalues for the Laplace operator in a domain with a small hole. Rev Mat Complut. 2012;25:369–412. doi: 10.1007/s13163-011-0081-8
- Hörmander L. Linear partial differential operators. Berlin-Heidelberg-New York: Springer; 1969.
- Green CD. Integral equation methods. 2nd ed. New York: Barns Noble Inc.; 1969.
- Guillemin V, Sternberg S. Geometric asymptotics. Revised ed.. Providence, Rhode Island: American Mathematical Society; 1990.
- Sneddon IN. Elements of partial differential equations. New York: McGraw-Hill; 1957.
- Tung C. Semi-harmonicity, integral means and Euler type vector fields. Adv Appl Clifford Algebras. 2007;17:555–573. doi: 10.1007/s00006-007-0036-9
- Tung C. Semi-harmonicity, integral means and Euler type vector fields. arXiv:1507.02675 [math.CV] doi:10.1007/s00006-007-0036-9.
- Stein EM. Singular integrals and differentiability properties of functions. Princeton, NJ: Princeton University Press; 1970. (Princeton Mathematical Series; 30).
- Barlet D. Cycles analytiques complexes. I. Théorèmes de préparation des cycles. [Complex analytic cycles. I. Preparation theorems for cycles]. Cours Spécialisés. Vol. 22. Paris: Société Mathématique de France; 2014. 525 pp.
- Chung KL, Rao KM. Feyman-Kac functional and the Schrödinger equation. In: Cinlar E, Chung KL, Getoor RK, editors. Seminar on stochastic processes, 1981. Boston: Birkhäuser; 1981. p. 1–29.
- Colton DL, Kress R. Integral equation methods in scattering theory. New York: John Wiley & Sons; 1983.
- Lyubich YI. Linear functional analysis. In: Nikol'skij, NK, editor. Functional analysis I. (Encyc. Math. Sci.; 10). Berlin, Heidelberg: Springer-Verlag; 1992.
- Mizohata S. The theory of partial differential equations. London: Cambridge University Press; 1973.
- Penrose, R. Mathematical physics of the 20th and 21st centuries. In: Arnold V, Atiyah M, Lax P, Mazur B, editors. Mathematics: frontiers and perspectives. Providence, RI: American Mathematical Society; 2000. p. 219–234.
- Edwards RE. Functional analysis. Chicago, Toronto, London: Holt, Rinehart and Winston; 1965.
- Mitrea D. Distributions, partial differential equations, and harmonic analysis. Berlin-Heidelberg-NewYork: Springer; 2013.
- Trèves F. Linear partial differential equations with constant coefficients. New York: Gordon and Beach; 1966.
- Courant R, Hilbert D. Methods of mathematical physics. Vol. II. New York-London: Interscience Publishers Co.; 1962.
- Wienholtz E, Kalf H, Kriecherbauer T. Elliptische differentialgleichungen zweiter ordnung. Berlin-Heidelberg-New York: Springer; 2009.
- Aizenberg LA, Berenstein CA, Wertheim L. Mean-value characterization of pluriharmonic and separately harmonic functions. Pacific J Math. 1996;175(2):295–306. doi: 10.2140/pjm.1996.175.295
- Lieb EH, Loss M. Analysis. 2nd ed. Providence, RI: American Mathematical Society; 2001. (Graduate studies in mathematics; Vol. 14).