Bibliography for Morera's Theorem

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  1. Stability in the Cauchy and Morera Theorems for Holomorphic Functions and Their Spatial Analogs  
    Kopylov A.P.; Korobkov M.V.; Ponomarev S.P.  
    Siberian Mathematical Journal, January 2003, vol. 44, no. 1, pp. 99-108(10), Ingenta.  
  2. A New Morera-Type Theorem on a Unit Disk  
    Silenko V.E.  
    Ukrainian Mathematical Journal, February 2001, vol. 53, no. 2, pp. 317-322(6), Ingenta.  
  3. Morera type problems in Clifford analysis.
    Marmolejo Olea, Emilio
    Rev. Mat. Iberoamericana 17 (2001), no. 3, 559--585, MathSciNet.  
  4. Discs and the Morera property.
    Globevnik, Josip; Stout, Edgar Lee
    Pacific J. Math. 192 (2000), no. 1, 65--91, MathSciNet.  
  5. On functions with one-dimensional property of holomorphic continuation and boundary analogues of the Morera theorem.
    Kytmanov, Alexandr M.; Myslivets, Simona G.
    J. Nat. Geom. 16 (1999), no. 1-2, 29--48, MathSciNet.  
  6. On the boundary Morera theorem for classical symmetric domains.
    Kosbergenov, S.; Kytmanov, A.
    Aspects of complex analysis, differential geometry, mathematical physics and applications (St. Konstantin, 1998), 77--83, World Sci. Publishing, River Edge, NJ, 1999, MathSciNet.  
  7. Morera theorems for spheres through a point in C^N.
    Grinberg, Eric Liviu; Quinto, Eric Todd
    Recent developments in complex analysis and computer algebra (Newark DE, 1997), 267--275, Int. Soc. Anal. Appl. Comput., 4, Kluwer Acad. Publ., Dordrecht, 1999, MathSciNet.   
  8. Thin discs and a Morera theorem for CR functions.
    Tumanov, Alexander
    Math. Z. 226 (1997), no. 2, 327--334, MathSciNet.  
  9. Analytic Functions, Ideal Fluid Flow, and Bernoulli's Equation (in Classroom Notes)  
    J. G. Simmonds  
    SIAM Review, Vol. 38, No. 4. (Dec., 1996), pp. 666-667, Jstor.   
  10. Morera theorems via microlocal analysis.
    Globevnik, Josip; Quinto, Eric Todd
    J. Geom. Anal. 6 (1996), no. 1, 19--30, MathSciNet.  
  11. On Morera's theorem. (Spanish)
    Berenstein, C. A.
    Volume in homage to Dr. Rodolfo A. Ricabarra (Spanish), 53--59, Vol. Homenaje, 1, Univ. Nac. del Sur, Bahía Blanca, 1995, MathSciNet.  
  12. Morera type theorems on the unit disc.
    Volchkov, V. V.
    Anal. Math. 20 (1994), no. 1, 49--63, MathSciNet.  
  13. A boundary Morera theorem.
    Globevnik, Josip
    J. Geom. Anal. 3 (1993), no. 3, 269--277, MathSciNet.  
  14. Variations on the theorem of Morera.
    Berenstein, Carlos; Chang, Der-Chen; Pascuas, Daniel; Zalcman, Lawrence  
    The Madison Symposium on Complex Analysis (Madison, WI, 1991), 63--78, Contemp. Math., 137, Amer. Math. Soc., Providence, RI, 1992, MathSciNet.  
  15. Boundary Morera theorems for holomorphic functions of several complex variables.
    Globevnik, Josip; Stout, Edgar Lee
    Duke Math. J. 64 (1991), no. 3, 571--615, MathSciNet.  
  16. Zero Integrals on Circles and Characterizations of Harmonic and Analytic Functions  
    Josip Globevnik  
    Transactions of the American Mathematical Society, Vol. 317, No. 1. (Jan., 1990), pp. 313-330, Jstor.   
  17. A Boundary Analogue of Morera's Theorem in the Unit Ball of C^n  
    Eric L. Grinberg  
    Proceedings of the American Mathematical Society, Vol. 102, No. 1. (Jan., 1988), pp. 114-116, Jstor.   
  18. A Test for Holomorphy in the Unit Ball of C^n  
    Carlos A. Berenstein  
    Proceedings of the American Mathematical Society, Vol. 90, No. 1. (Jan., 1984), pp. 88-90, Jstor.   
  19. Characteristic functional equation of polynomials and the Morera-Carleman theorem.
    Rubinstein, Zalman
    Aequationes Math. 23 (1981), no. 1, 108--117, MathSciNet.  
  20. Morera's theorem for functions with values in a Clifford algebra.
    Delanghe, Richard
    Simon Stevin 43 1969/1970 129--140, MathSciNet.  
  21. A generalization of Morera's theorem.
    Royden, H. L.
    Ann. Polon. Math. 12 1962 199--202, MathSciNet.  
  22. On Morera's Theorem  
    George Springer  
    American Mathematical Monthly, Vol. 64, No. 5. (May, 1957), pp. 323-331, Jstor.   
  23. A direct proof of Morera's theorem.
    Macintyre, A. J.
    Arch. Math. 8 (1957), 374--375, MathSciNet.  
  24. Ornstein, Wilhelm
    Stress functions of Maxwell and Morera.
    Quart. Appl. Math. 12, (1954). 198--201, MathSciNet.  
  25. The theorem of Morera in several variables.
    Bochner, Salomon
    Ann. Mat. Pura Appl. (4) 34, (1953). 27--39, MathSciNet.  
  26. On Maxwell's and Morera's formulae in the theory of elasticity.
    Kuzmin, R. O.
    C. R. (Doklady) Acad. Sci. URSS (N. S.) 49, (1945). 326--328, MathSciNet.  
  27. Vector analogues of Morera's theorem.
    Beckenbach, E. F.
    Bull. Amer. Math. Soc. 48, (1942). 937--941, MathSciNet.  
  28. Generalizations to Space of the Cauchy and Morera Theorems  
    Maxwell Reade; E. F. Beckenbach  
    Transactions of the American Mathematical Society, Vol. 49, No. 3. (May, 1941), pp. 354-377, Jstor.   

 

 

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