Bibliography for Pole and Singularity - unabridged

 

  1. Zero-Pole Interpolation for Matrix Meromorphic Functions on a Compact Riemann Surface and a Matrix Fay Trisecant Identity  
    Joseph A. Ball 1947-; Victor Vinnikov  
    American Journal of Mathematics, Vol. 121, No. 4. (Aug., 1999), pp. 841-888, Jstor.  
  2. On the poles of the local resolvent.
    Bermúdez, Teresa; González, Manuel; Martinón, Antonio
    Math. Nachr. 193 (1998), 19--26, MathSciNet.  
  3. Pôles une singularité presque isolée. (French) [Poles for an almost isolated singularity]
    Jeddi, A.; Mardhy, A.
    Manuscripta Math. 97 (1998), no. 4, 435--452, MathSciNet.  
  4. Approximation of Singularity Sets with Analytic Graphs Over the Ball in C2  
    Marshall A. Whittlesey  
    Proceedings of the American Mathematical Society, Vol. 125, No. 11. (Nov., 1997), pp. 3259-3265, Jstor.  
  5. On removable singularities for CR functions in higher codimension.
    Merker, J.
    Internat. Math. Res. Notices 1997, no. 1, 21--56, MathSciNet.  
  6. An extremal plurisubharmonic function associated to a convex pluricomplex Green function with pole at infinity.
    Momm, Siegfried
    J. Reine Angew. Math. 471 (1996), 139--163, MathSciNet.  
  7. On removable singularities for the analytic Zygmund class.
    Carmona, Joan Josep; Donaire, Juan Jesús
    Michigan Math. J. 43 (1996), no. 1, 51--65, MathSciNet.
  8. On the removable singularities for meromorphic mappings.
    Chirka, E. M.
    Publ. Mat. 40 (1996), no. 1, 229--232, MathSciNet.  
  9. Pôles et conjugaison complexe. (French) [Poles and complex conjugation]
    Jeddi, Ahmed
    C. R. Acad. Sci. Paris Sér. I Math. 320 (1995), no. 2, 165--168, MathSciNet.  
  10. Dynamics Near the Essential Singularity of a Class of Entire Vector Fields  
    Kevin Hockett; Sita Ramamurti  
    Transactions of the American Mathematical Society, Vol. 345, No. 2. (Oct., 1994), pp. 693-703, Jstor.  
  11. Removable singularities for Hardy spaces of analytic functions.
    Björn, Anders
    Linköping Studies in Science and Technology. Dissertations, 365. Linköping University, Department of Mathematics, Linköping, 1994. iv+72 pp. ISBN: 91-7871-474-5, MathSciNet.  
  12. Global method for the poles of analytic function by rational interpolant on the unit circle.
    Torii, Tatsuo; Sakurai, Tetsuya
    Contributions in numerical mathematics, 389--398, World Sci. Ser. Appl. Anal., 2, World Sci. Publishing, River Edge, NJ, 1993, MathSciNet.  
  13. Removable singularities for analytic functions.
    Koskela, Pekka
    Michigan Math. J. 40 (1993), no. 3, 459--466, MathSciNet.  
  14. Removable singularities and Liouville-type property of analytic multivalued functions.
    Tran Ngoc Giao
    Ann. Fac. Sci. Toulouse Math. (6) 1 (1992), no. 2, 261--268, MathSciNet.  
  15. On removable singularities of complex analytic sets.
    Sukhov, A. B.
    Indiana Univ. Math. J. 41 (1992), no. 3, 741--754, MathSciNet.  
  16. Removable singularities for analytic functions of Zygmund class.  
    Lord, Denise J.; O'Farrell, Anthony G.
    Proc. Roy. Irish Acad. Sect. A  91  (1991),  no. 2, 195--204, MathSciNet.  
  17. Zeros of successive derivatives of analytic functions having a single essential singularity. II.
    Clunie, J. G.; Edrei, A.
    J. Analyse Math. 56 (1991), 141--185, MathSciNet.  
  18. On the removable singularities of functions of several complex variables. (Italian)
    Lupacciolu, Guido
    Geometry Seminars, 1988--1991 (Italian) (Bologna, 1988--1991), 89--97, Univ. Stud. Bologna, Bologna, 1991, MathSciNet.  
  19. A note on removable singularities.
    Stout, Edgar Lee
    Boll. Un. Mat. Ital. A (7) 5 (1991), no. 2, 237--243, MathSciNet.  
  20. A proof of Rado's theorem. On removable singularities of analytic functions.
    Abian, Alexander
    Acta Math. Univ. Comenian. 58/59 (1990), 129--133 (1991), MathSciNet.
  21. Uniform Asymptotic Expansion of an Integral with a Saddle Point, a Pole and a Branch Point  
    A. Ciarkowski  
    Proceedings of the Royal Society of London. Series A, Mathematical and Physical Sciences, Vol. 426, No. 1871. (Dec. 8, 1989), pp. 273-286, Jstor.  
  22. A note on the closed-form determination of zeros and poles of generalized analytic functions.
    Ioakimidis, N. I.
    Stud. Appl. Math. 81 (1989), no. 3, 265--269, MathSciNet.  
  23. Pole- and Zero-Free Regions for Analytic Continued Fractions  
    Hans-J. Runckel  
    Proceedings of the American Mathematical Society, Vol. 97, No. 1. (May, 1986), pp. 114-120, Jstor.  
  24. A Heuristic Principle for a Nonessential Isolated Singularity  
    David Minda  
    Proceedings of the American Mathematical Society, Vol. 93, No. 3. (Mar., 1985), pp. 443-447, Jstor.  
  25. Some algebro-geometric formulae for poles.
    Lichtin, Ben
    Amer. J. Math. 107 (1985), no. 1, 139--162, MathSciNet.  
  26. On the existence of essential singularities.
    Straus, E. G.; Cayford, A. H.
    Analysis of one complex variable (Laramie, Wyo., 1985), 205--213, World Sci. Publishing, Singapore, 1987, MathSciNet.  
  27. Zeros of successive derivatives of analytic functions having a single essential singularity.
    Edrei, Albert
    Analysis of one complex variable (Laramie, Wyo., 1985), 64--98, World Sci. Publishing, Singapore, 1987, MathSciNet.  
  28. Bloch Constants for Meromorphic Functions Near an Isolated Singularity  
    David Minda  
    Proceedings of the American Mathematical Society, Vol. 91, No. 1. (May, 1984), pp. 69-72, Jstor.  
  29. Two simple proofs of the theorem for the maximal domain of univalence of the class of rational functions with simple poles and positive residues.  
    Todorov, P. G.
    C. R. Acad. Bulgare Sci.  37  (1984),  no. 4, 429--432, MathSciNet.  
  30. Removable Singularity Sets for Analytic Functions Having Modulus with Bounded Laplace Mass  
    Urban Cegrell  
    Proceedings of the American Mathematical Society, Vol. 88, No. 2. (Jun., 1983), pp. 283-286, Jstor.  
  31. Zero-Free Parabolic Regions for Polynomials with Complex Coefficients  
    Hans-J. Runckel  
    Proceedings of the American Mathematical Society, Vol. 88, No. 2. (Jun., 1983), pp. 299-304, Jstor.  
  32. Essential singularities of rigid analytic functions.
    van der Put, Marius
    Nederl. Akad. Wetensch. Indag. Math. 43 (1981), no. 4, 423--429, MathSciNet.  
  33. Integrating ODE's in the Complex Plane-Pole Vaulting  
    George F. Corliss  
    Mathematics of Computation, Vol. 35, No. 152. (Oct., 1980), pp. 1181-1189, Jstor.  
  34. Removable singularities for analytic or subharmonic functions.
    Kaufman, Robert; Wu, Jang Mei
    Ark. Mat. 18 (1980), no. 1, 107--116, MathSciNet.  
  35. The Numerical Solution of Boundary Value Problems with an Essential Singularity  
    Frank R. de Hoog; Richard Weiss  
    SIAM Journal on Numerical Analysis, Vol. 16, No. 4. (Aug., 1979), pp. 637-669, Jstor.  
  36. The behavior of a holomorphic function near an essential singularity. (Russian)
    Gavrilov, V. I.
    Dokl. Akad. Nauk SSSR 162 1965 491--494, MathSciNet.  
  37. On the Pole and Zero Locations of Rational Laplace Transformations of Non-Negative Functions. II  
    A. H. Zemanian  
    Proceedings of the American Mathematical Society, Vol. 12, No. 6. (Dec., 1961), pp. 870-874, Jstor.  
  38. On the Pole and Zero Locations of Rational Laplace Transformation of Non-Negative Functions  
    Armen H. Zemanian  
    Proceedings of the American Mathematical Society, Vol. 10, No. 6. (Dec., 1959), pp. 868-872, Jstor.  
  39. Singularity and Near Singularity in Numerical Analysis  
    George E. Forsythe  
    The American Mathematical Monthly, Vol. 65, No. 4. (Apr., 1958), pp. 229-240, Jstor.  
  40. On the set of values assumed by holomorphic functions near essential singularities.
    Bagemihl, F.
    Math. Z. 67 (1957), 49--50, MathSciNet.  
  41. On Zero and Pole Surfaces of Functions of Two Complex Variables  
    Stefan Bergman  
    Transactions of the American Mathematical Society, Vol. 77, No. 3. (Nov., 1954), pp. 413-454, Jstor.  
  42. Existence of Minimal Surfaces with a Simple Pole at Infinity and Condition of Transversality on the Surface of a Cylinder  
    Yu Why Chen  
    Transactions of the American Mathematical Society, Vol. 65, No. 3. (May, 1949), pp. 331-347, Jstor.  

 

 

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