Bibliography for Taylor Series

unabridged

 

  1. Computationally efficient, numerically exact design space derivatives via the complex Taylor's series expansion method
    Burg C.O.E.; Newman III J.C.
    Computers and Fluids, March 2003, vol. 32, no. 3, pp. 373-383(11), Ingenta.  
  2. Improved validated bounds for Taylor coefficients and for Taylor remainder series
    Neher M.
    Journal of Computational and Applied Mathematics, 1 March 2003, vol. 152, no. 1, pp. 393-404(12), Ingenta.  
  3. On Taylor series expansion for chaotic nonlinear systems
    Richter H.; Stein G.
    Chaos, Solitons and Fractals, July 2002, vol. 13, no. 9, pp. 1783-1789(7), Ingenta.  
  4. A universal Taylor series in the doubly connected domain C1.  
    Vlachou, V.
    Complex Var. Theory Appl.  47  (2002),  no. 2, 123--129, MathSciNet.  
  5. Taylor's Formula via Determinants  
    Sarkaria, K. S.
    College Mathematics Journal, 2001, vol. 32, no. 1, pp. 54, Ingenta.  
  6. The Euler-Maclaurin and Taylor Formulas: Twin, Elementary Derivations  
    Vito Lampret  
    Mathematics Magazine: Volume 74, Number 2, (2001), Pages: 109-122.  
  7. On Taylor-series expansions of residual stress
    Pruett, C. D.; Sochacki, J. S.; Adams, N. A.
    Physics of Fluids, 2001, vol. 13, no. 9, pp. 2578-2589, Ingenta.  
  8. Universality of Taylor Series as a Generic Property of Holomorphic Functions
    Melas A.; Nestoridis V.
    Advances in Mathematics, February 2001, vol. 157, no. 2, pp. 138-176(39), Ingenta.  
  9. Teaching power series along with the history of mathematics. Taylor expansion and related topics. (Japanese)
    Nagaoka, Kouichi
    J. Asahikawa Nat. College Tech. No. 38 (2001), 51--63, MathSciNet.  
  10. Taylor series and orthogonality of the octonion analytic functions.  
    Li, Xingmin; Peng, Lizhong
    Acta Math. Sci. Ser. B Engl. Ed.  21  (2001),  no. 3, 323--330, MathSciNet.  
  11. On various types of universal Taylor series.  
    Melas, Antonios; Nestoridis, Vassili
    Complex Variables Theory Appl.  44  (2001),  no. 3, 245--258, MathSciNet.  
  12. A note on Taylor's formula, II
    Hikida, M.
    Mathematica Japonica, 2000, vol. 52, no. 1, pp. 89-94, Ingenta.  
  13. Generalization of Taylor's theorem and Newton's method via a new family of determinantal interpolation formulas and its applications.
    Kalantari, Bahman
    J. Comput. Appl. Math. 126 (2000), no. 1-2, 287--318, MathSciNet.  
  14. Some remarks on universal functions and Taylor series.
    Costakis, G.
    Math. Proc. Cambridge Philos. Soc. 128 (2000), no. 1, 157--175, MathSciNet.  
  15. Approximation by Taylor polynomials in two-dimensional case  
    Tachev, G.  
    God. Univ. Arkhit. Stroit. Geod. Sofiya Svitdprime k II Mat. Mekh. 39 (1996/97), 81--86 (1999), Math. Sci. Net.  
  16. An extension of the notion of universal Taylor series.
    Nestoridis, Vassili
    Computational methods and function theory 1997 (Nicosia), 421--430, Ser. Approx. Decompos., 11, World Sci. Publishing, River Edge, NJ, 1999, MathSciNet.  
  17. Taylor Polynomials for Rational Functions  
    Mike O'Leary  
    College Math Journal: Volume 29, Number 3, (1998), Pages: 226-228.  
  18. Taylor Series Expansion of the Failure Surface.
    Progress in astronautics and aeronautics, 1998, vol. 178, pp. 135, Ingenta.  
  19. The rate of convergence of the Taylor series for some classes of analytic functions. (Ukrainian)
    Savchuk, V. V.
    Ukraïn. Mat. Zh. 50 (1998), no. 7, 1001--1003; translation in Ukrainian Math. J. 50 (1998), no. 7, 1141--1144 (1999), MathSciNet.  
  20. On random Taylor series.
    Ding, Xiaoqing
    Wuhan Univ. J. Nat. Sci. 3 (1998), no. 3, 257--260, MathSciNet.  
  21. Elliptic Integrals and the Schwarz-Christoffel Transformation
    Hassenpflug W.C.
    Computers and Mathematics with Applications, June 1997, vol. 33, no. 12, pp. 15-114(100), Ingenta.  
  22. Growth of coefficients of universal Taylor series and comparison of two classes of functions.
    Melas, A.; Nestoridis, V.; Papadoperakis, I.
    J. Anal. Math. 73 (1997), 187--202, MathSciNet.  
  23. A century of interplay between Taylor series, Fourier series and Brownian motion.
    Kahane, Jean-Pierre
    Bull. London Math. Soc. 29 (1997), no. 3, 257--279, MathSciNet.  
  24. Nonlinear Filters Based on Taylor Series Expansions.
    Tanizaki, H.; Mariano, R.S.
    Communications in statistics, 1996, vol. 25, no. 6, pp. 1261, Ingenta.  
  25. Universal Taylor series.
    Nestoridis, Vassili
    Ann. Inst. Fourier (Grenoble) 46 (1996), no. 5, 1293--1306, MathSciNet.  
  26. Summability transforms of the Taylor series.
    Daras, Nicholas J.
    Math. Japon. 43 (1996), no. 3, 497--503, MathSciNet.  
  27. Some general random Taylor series.
    Sun, Daochun; Yu, Jiarong
    Sci. China Ser. A 39 (1996), no. 12, 1233--1241, MathSciNet.  
  28. Taylor's theorem with several centers and its applications. (Chinese)
    Gui, Zu Hua
    J. Shanghai Jiaotong Univ. 29 (1995), no. 2, 110--118, MathSciNet.  
  29. Approximate solution of linear systems with point delays using Taylor series. (Spanish)
    Alastruey, Carlos F.; González de Mendívil, José R.
    Rev. Internac. Métod. Numér. Cálc. Diseñ. Ingr. 11 (1995), no. 3, 323--343, MathSciNet.  
  30. Analytic expansion of tensor fields along geodesics by means of covariant Taylor series. (Russian)
    Tsirulev, A. N.
    Teoret. Mat. Fiz. 102 (1995), no. 3, 337--344; translation in Theoret. and Math. Phys. 102 (1995), no. 3, 245--250, MathSciNet.  
  31. The Empirical Nature of Taylor-Series Approximations to Expected Utility  
    Walter Hlawitschka  
    The American Economic Review, Vol. 84, No. 3. (Jun., 1994), pp. 713-719, Jstor.  
  32. Taylor series expansions for eigenvalues and eigenfunctions of parametrized composition operators.
    Thron, Chris
    J. Math. Phys. 35 (1994), no. 4, 2024--2035, MathSciNet.  
  33. A probabilistic generalization of Taylor's theorem.
    Massey, William A.; Whitt, Ward
    Statist. Probab. Lett. 16 (1993), no. 1, 51--54, MathSciNet.  
  34. On the Determination of the Intermediate Point in Taylor's Theorem  
    Ruben Mera  
    American Mathematical Monthly, Vol. 99, No. 1. (Jan., 1992), pp. 56-58, Jstor.
  35. Taylor series solution of a class of diffusion problem in physiology.
    Asaithambi, N.S.; Garner, J.B.
    Mathematics and computers in simulation, 1992, vol. 34, no. 6, pp. 563, Ingenta.  
  36. Prolongement analytique des series de Taylor spheriques. (French) [Analytic extension of spherical Taylor series]
    Faraut, Jacques
    Hypergeometric functions on domains of positivity, Jack polynomials, and applications (Tampa, FL, 1991), 139--149, Contemp. Math., 138, Amer. Math. Soc., Providence, RI, 1992, MathSciNet.  
  37. On Taylor's formula, II.
    Hikida, M.
    Mathematica Japonicae, 1991, vol. 36, no. 5, pp. 961, Ingenta.  
  38. On Taylor's formula.
    Hikida, M.
    Mathematica Japonicae, 1991, vol. 36, no. 2, pp. 335, Ingenta.  
  39. Remainder Estimates in Taylor's Theorem (in The Teaching of Mathematics)  
    G. B. Folland  
    American Mathematical Monthly, Vol. 97, No. 3. (Mar., 1990), pp. 233-235, Jstor.
  40. The Remainder in Taylor's Formula  
    Esteban I. Poffald  
    American Mathematical Monthly, Vol. 97, No. 3. (Mar., 1990), pp. 205-213, Jstor.
  41. Representation of non-quasi-analytic functions by generalized Taylor series. (Russian)
    Ivanov, Yu. A.
    Dokl. Akad. Nauk Ukrain. SSR Ser. A 1990, no. 7, 11--14, 87, MathSciNet.  
  42. A new form of the Hensel factorization for Taylor series with analytic coefficients.
    Escassut, Alain
    Indag. Math. (N.S.) 1 (1990), no. 1, 27--37, MathSciNet.  
  43. Estimation of the remainder of a Taylor series for analytic functions. (Russian)
    Komarov, A. A.
    Application of functional analysis in approximation theory (Russian), 73--83, Tver. Gos. Univ., Tver, 1990, MathSciNet.  
  44. Taylor polynomial interlineation of functions of two variables on several straight lines. (Russian)   
    Litvin, O. N.  
    Izv. Vyssh. Uchebn. Zaved. Mat. 1989, no. 12,19--27 translation in Soviet Math. (Iz. VUZ) 33 (1989), no. 12, 21--30, Math. Sci. Net.  
  45. Solving stiff systems by Taylor series.
    Chang, Y. F.
    Numerical ordinary differential equations (Albuquerque, NM, 1986). Appl. Math. Comput. 31 (1989), 251--269, MathSciNet.  
  46. A Comparison of Some Taylor and Chebyshev Series  
    R. E. Scraton  
    Mathematics of Computation, Vol. 50, No. 181. (Jan., 1988), pp. 207-213, Jstor.  
  47. A Simplification of Taylor's Theorem (in The Teaching of Mathematics)  
    Fred Brauer  
    American Mathematical Monthly, Vol. 94, No. 5. (May, 1987), pp. 453-455, Jstor.
  48. Best Rational Approximations of Entire Functions Whose Maclaurin Series Coefficients Decrease Rapidly and Smoothly  
    A. L. Levin; D. S. Lubinsky  
    Transactions of the American Mathematical Society, Vol. 293, No. 2. (Feb., 1986), pp.  533-545, Jstor.  
  49. Séries de Taylor sphériques sur une algèbre de Jordan. (French) [Spherical Taylor series on a Jordan algebra]
    Faraut, Jacques
    Représentations des groupes et analyse complexe (Luminy, 1986), 35--46, Journées SMF, 24, Univ. Poitiers, Poitiers, 1986, MathSciNet.  
  50. Rediscovering Taylor's Theorem  
    Dan Kalman  
    College Math Journal: Volume 16, Number 2, (1985), Pages: 103-107.    
  51. On the singular points of analytic functions defined by their Taylor series expansions. (Bulgarian)
    Yankov, P.
    Plovdiv. Univ. Nauchn. Trud. 22 (1984), no. 1, 97--104 (1985), MathSciNet.  
  52. A summability approximation theorem for Taylor series of meromorphic functions.
    Tomm, Ludwig
    J. Reine Angew. Math. 339 (1983), 133--146, MathSciNet.  
  53. Sur la structure circulaire des ensembles de points limites des sommes partielles d'une série de Taylor. (French) [On the circular structure of the limit point sets of the partial sums of a Taylor series]  
    Kahane, Jean-Pierre
    Acta Sci. Math. (Szeged)  45  (1983),  no. 1-4, 247--251, MathSciNet.  
  54. On the Lagrange Remainder of the Taylor Formula (in Notes)  
    Alfonso G. Azpeitia  
    American Mathematical Monthly, Vol. 89, No. 5. (May, 1982), pp. 311-312, Jstor.
  55. Solving ordinary differential equations using Taylor series.
    Corliss, George; Chang, Y. F.
    ACM Trans. Math. Software 8 (1982), no. 2, 114--144, MathSciNet.  
  56. Équations stochastiques à coefficients analytiques et séries de Taylor stochastiques. (French) [Stochastic equations with analytic coefficients and stochastic Taylor series]
    Ben Arous, G.
    Ann. Sci. Univ. Clermont-Ferrand II Math. No. 20 (1982), 55--69, MathSciNet.  
  57. Note on the Taylor series and growth of means.
    Berkson, Earl
    C. R. Math. Rep. Acad. Sci. Canada 4 (1982), no. 3, 149--154, MathSciNet.  
  58. Discrete analytic functions and Taylor series. (Russian)
    Mednykh, A. D.
    Theory of mappings, its generalizations and applications, 137--144, "Naukova Dumka", Kiev, 1982, MathSciNet.  
  59. Every Power Series is a Taylor Series (in Classroom Notes)  
    Mark D. Meyerson  
    American Mathematical Monthly, Vol. 88, No. 1. (Jan., 1981), pp. 51-52, Jstor.
  60. Modified Convergence of Taylor Series (in Classroom Notes)  
    Robert D. Small  
    American Mathematical Monthly, Vol. 88, No. 6. (Jun. - Jul., 1981), pp. 439-441, Jstor.  
  61. Partial sums of the Taylor series of a bounded analytic function. (Russian) Number theory, mathematical analysis and their applications.
    Oskolkov, K. I.
    Trudy Mat. Inst. Steklov. 157 (1981), 153--160, 236, MathSciNet.  
  62. Erratum: "Deducing the properties of singularities of functions from their Taylor series coefficients".
    Hunter, C.; Guerrieri, B.
    SIAM J. Appl. Math. 41 (1981), no. 1, 203, MathSciNet.   
  63. The value-distribution of random Taylor series in the unit disk.
    Murai, Takafumi
    J. London Math. Soc. (2) 24 (1981), no. 3, 480--494, MathSciNet.  
  64. Deducing the Properties of Singularities of Functions From Their Taylor Series Coefficients  
    C. Hunter; B. Guerrieri  
    SIAM Journal on Applied Mathematics, Vol. 39, No. 2. (Oct., 1980), pp. 248-263, Jstor.  
  65. Boundary Values of Absolutely Convergent Taylor Series  
    Aharon Atzmon  
    The Annals of Mathematics, 2nd Ser., Vol. 111, No. 2. (Mar., 1980), pp. 231-237, Jstor.  
  66. A Rudin-Carleson theorem for uniformly convergent Taylor series.
    Oberlin, Daniel M.
    Michigan Math. J. 27 (1980), no. 3, 309--313, MathSciNet.  
  67. Solution of a nonlinear Tricomi equation by Taylor series.
    Chang, Y. F.
    Information linkage between applied mathematics and industry (Proc. First Annual Workshop, Naval Postgraduate School, Monterey, Calif., 1978), pp. 283--292, Academic Press, New York-London, 1979, MathSciNet.  
  68. Convergence analysis of compound Taylor series.
    Chang, Y. F.; Fauss, John; Prieto, Manuel; Corliss, George
    Proceedings of the Eighth Manitoba Conference on Numerical Mathematics and Computing (Univ. Manitoba, Winnipeg, Man., 1978), pp. 129--152, Congress. Numer., XXII, Utilitas Math., Winnipeg, Man., 1979, MathSciNet.  
  69. Arithmetic properties of the values of analytic functions with algebraic irrational coefficients of Taylor series. (Russian)
    Cirskiui, V. G.
    Vestnik Moskov. Univ. Ser. I Mat. Mekh. 1978, no. 3, 29--34, MathSciNet.  
  70. Arithmetic properties of the values of analytic functions with algebraic coefficients of Taylor series. (Russian)
    Cirskiui, V. G.
    Vestnik Moskov. Univ. Ser. I Mat. Mekh. 1978, no. 2, 41--47, MathSciNet.  
  71. On the question of the basis property of the sequential remainders and partial sums of the Taylor series of an analytic function. (Russian)
    Lincuk, S. S.
    Ukrain. Mat. \v Z. 30 (1978), no. 3, 381--386, 430, MathSciNet.  
  72. Taylor series as an analytic tool for PDE solutions.
    Chang, Y. F.
    Proceedings of the Seventh Manitoba Conference on Numerical Mathematics and Computing (Univ. Manitoba, Winnipeg, Man., 1977), pp. 269--277. Congress. Numer., XX. Utilitas Math., Winnipeg, Man., 1978, MathSciNet.  
  73. Singular points of a meromorphic function that is given by its Taylor series. (Russian)
    Vavilov, V. V.
    Dokl. Akad. Nauk SSSR 231 (1976), no. 6, 1281--1284, MathSciNet.  
  74. On the recurrence property of Gaussian Taylor series.
    Hwang, J. S.
    Ann. Probability 4 (1976), no. 3, 453--455, MathSciNet.  
  75. Alternatives to Taylor's Theorem in Proving Analyticity (in Classroom Notes)  
    J. A. Eidswick  
    American Mathematical Monthly, Vol. 82, No. 9. (Nov., 1975), pp. 929-931, Jstor.  
  76. On Taylor series absolutely convergent on the circumference of the circle of convergence. III.
    Halász, G.
    Acta Math. Acad. Sci. Hungar. 25 (1974), 81--87, MathSciNet.  
  77. Formal Taylor series and complementary invariant subspaces.
    Herrero, Domingo A.
    Proc. Amer. Math. Soc. 45 (1974), 83--87, MathSciNet.  
  78. A contrast between complex and real-valued Taylor series.
    Abian, Alexander
    J. Austral. Math. Soc. 18 (1974), 458--460, MathSciNet.  
  79. Uniqueness theorems for analytic functions that are asymptotically representable by Dirichlet-Taylor series. (Russian)
    Dzrbasjan, M. M.
    Mat. Sb. (N.S.) 91(133) (1973), 580--626, 631, MathSciNet.  
  80. The behavior of Taylor series in spaces of summable analytic functions. (Russian)
    Plotkin, A. I.
    Vestnik Leningrad. Univ. 25 (1970), no. 1, 52--59, MathSciNet.  
  81. On arithmetic properties of the Taylor series of rational functions.
    Cantor, David G.
    Canad. J. Math. 21 1969 378--382, MathSciNet.  
  82. Taylor's Formula and the Existence of nth Derivatives (in Mathematical Notes)  
    P. R. Beesack  
    American Mathematical Monthly, Vol. 74, No. 8. (Oct., 1967), pp. 980-986, Jstor.
  83. On the Convergence of Taylor Series for Functions of n Variables  
    James Thomas Day  
    Mathematics Magazine, Vol. 40, No. 5. (Nov., 1967), pp. 258-260, Jstor.  
  84. Commutative semigroups in the space of lower triangular matrices and analytic continuation of Taylor series. (Russian)
    Melencov, A. A.
    Ural. Gos. Univ. Mat. Zap. 5 1966 tetrad4, 62--75 (1967), MathSciNet.  
  85. Taylor's Formula with Derivative Remainder (in Classroom Notes)  
    Alfred J. Maria  
    American Mathematical Monthly, Vol. 73, No. 1. (Jan., 1966), pp. 67-68, Jstor.
  86. A General Form of the Remainder in Taylor's Theorem (in Classroom Notes)  
    P. R. Beesack  
    American Mathematical Monthly, Vol. 73, No. 1. (Jan., 1966), pp. 64-67, Jstor.
  87. A connection between the growth of a function analytic in a disc and the moduli the coefficients of its Taylor series. (Ukrainian)
    Seremeta, M. M.
    Dopovidi Akad. Nauk Ukraïn. RSR 1966 729--732, MathSciNet.  
  88. Commutative semigroups in the space of lower triangular matrices and analytic continuation of Taylor series. (Russian)
    Melencov, A. A.
    Ural. Gos. Univ. Mat. Zap. 5 1966 tetrad4, 62--75 (1967), MathSciNet.  
  89. On Extensions of Taylor's Formula (in Mathematical Notes)  
    T. V. Lakshminarasimhan  
    American Mathematical Monthly, Vol. 72, No. 8. (Oct., 1965), pp. 877-881, Jstor.
  90. Expansion of Analytic Functions in Infinite Series and Infinite Products with Application to Multiple Valued Functions  
    Alexander Arcache  
    American Mathematical Monthly, Vol. 72, No. 8. (Oct., 1965), pp. 861-864, Jstor.  
  91. Generalized Taylor Series and Orders and Types of Entire Functions of Several Complex Variables  
    Fred Gross  
    Transactions of the American Mathematical Society, Vol. 120, No. 1. (Oct., 1965), pp. 124-144, Jstor.  
  92. Connection between the growth of a function analytic in a disc and the moduli of the coefficients of its Taylor series. (Ukrainian)
    Seremeta, M. M.
    Vsnik L. Derz. Univ. Ser. Meh.-Mat. 1965 1965 vyp. 2, 101--110, MathSciNet.  
  93. An Extension of Taylor's Formula (in Mathematical Notes)  
    Dwight B. Goodner  
    American Mathematical Monthly, Vol. 70, No. 3. (Mar., 1963), pp. 303-306, Jstor.
  94. A Variant of Taylor's Theorem (in Classroom Notes)  
    W. R. Ballard, A. E. Livingston, W. M. Myers, Jr.  
    American Mathematical Monthly, Vol. 70, No. 8. (Oct., 1963), pp. 865-868, Jstor.
  95. On the successive remainders of a Taylor's series. (Russian)
    Kaz'min, Ju. A.
    Vestnik Moskov. Univ. Ser. I Mat. Meh. 1963 1963 no. 5, 35--46, MathSciNet.  
  96. An Algorithm of J. Schur and the Taylor Series  
    E. H. Connell; P. Porcelli  
    Proceedings of the American Mathematical Society, Vol. 13, No. 2. (Apr., 1962), pp. 232-235, Jstor.  
  97. Remainder Formulae in Taylor's Theorem (in Classroom Notes)  
    William J. Firey  
    American Mathematical Monthly, Vol. 67, No. 9. (Nov., 1960), pp. 903-905, Jstor.
  98. Estimate of the remainder in a Taylor series for analytic functions with bounded r-th derivative. (Russian)
    Mordasova, G. M.
    Uspehi Mat. Nauk 14 1959 no. 4 (88), 187--194, MathSciNet.  
  99. On Taylor's Theorem With Remainder (in Mathematical Notes)  
    P. H. Diananda  
    American Mathematical Monthly, Vol. 64, No. 7. (Aug. - Sep., 1957), pp. 492-495, Jstor.
  100. Mean Value Theorems and Taylor Series (in Teaching of Mathematics)  
    M. R. Spiegel  
    Mathematics Magazine, Vol. 29, No. 5. (May - Jun., 1956), pp. 263-266, Jstor.  
  101. Expansion of an analytic function into a "Taylor" series with variable center. (Czech)  
    Stépánek, Jirí
    Casopis P\v est. Mat. 81 (1956), 38--42, MathSciNet.  
  102. A Theorem of the Taylor Expansion (in Classroom Notes)  
    C. S. Ogilvy  
    American Mathematical Monthly, Vol. 62, No. 9. (Nov., 1955), p. 654, Jstor.
  103. A Proof of Taylor's Formula (in Classroom Notes)  
    James Wolfe  
    American Mathematical Monthly, Vol. 60, No. 6. (Jun. - Jul., 1953), p. 415, Jstor.
  104. Generalization of Taylor's series and some questions of the theory of analytic and quasi-analytic functions. (Russian)
    Badalyan, G. V.
    Akad. Nauk Armyan. SSR. Izv. Fiz.-Mat. Estest. Nauk 6, (1953) no. 5-6, 1--63; 7, no. 1, 3--33 (1954), MathSciNet.  
  105. Estimate of the remainder of a Taylor series for certain classes of analytic functions. (Russian)  
    Steckin, S. B.
    Izvestiya Akad. Nauk SSSR. Ser. Mat.  17,  (1953). 461--472, MathSciNet.  
  106. A Theorem on the Remainder of a Taylor Series (in Classroom Notes)  
    G. Rudinger  
    American Mathematical Monthly, Vol. 57, No. 6. (Jun. - Jul., 1950), pp. 411-412, Jstor.  
  107. A Generalization of Taylor's Expansion  
    P. M. Hummel, C. L. Seebeck, Jr.  
    American Mathematical Monthly, Vol. 56, No. 4. (Apr., 1949), pp. 243-247, Jstor.
  108. On the probability that a Taylor series admits an analytic continuation. (Spanish)
    Ríos, Sixto
    Revista Mat. Hisp.-Amer. (4) 6, (1946). 174--176, MathSciNet.  
  109. Taylor's series and approximation to analytic functions.
    Walsh, J. L.
    Bull. Amer. Math. Soc. 52, (1946). 572--579, MathSciNet.  
  110. On Taylor series with, or without, analytic continuation.
    Vigil, Luis
    The present state of Borel's theorem. (Spanish) Revista Mat. Hisp.-Amer. (4) 3, (1943). 208--218, MathSciNet.  
  111. On Taylor series with, or without, analytic continuation.
    Vigil, Luis
    The present state of Borel's theorem. (Spanish) Revista Mat. Hisp.-Amer. (4) 3, (1943). 137--144, MathSciNet.  
  112. Researches on the singularities of analytic functions represented by multi-Taylor series. (Hebrew)
    Netanyahu, Elisha
    Summary of a thesis, Hebrew University, Jerusalem, 1942. 10+2 pp., MathSciNet.  
  113. Expansions of Analytic Functions  
    R. P. Boas, Jr  
    Transactions of the American Mathematical Society, Vol. 48, No. 3. (Nov., 1940), pp. 467-487, Jstor.  
  114. On Simultaneous Expansions of Analytic Functions in Composite Power Series  
    A. C. Burdette  
    American Journal of Mathematics, Vol. 61, No. 2. (Apr., 1939), pp. 295-302, Jstor.  
  115. Expansion of Analytic Functions into Infinite Products  
    S. Borofsky  
    The Annals of Mathematics, 2nd Ser., Vol. 32, No. 1. (Jan., 1931), pp. 23-36, Jstor.  
  116. Note on the Expansion of Analytic Functions in Series of Polynomials and in Series of Other Analytic Functions  
    J. L. Walsh  
    Transactions of the American Mathematical Society, Vol. 31, No. 1. (Jan., 1929), pp. 53-57, Jstor.  
  117. On the Expansion of Analytic Functions of the Complex Variable in Generalized Taylor's Series
    D. V. Widder
    Transactions of the American Mathematical Society, Vol. 31, No. 1. (Jan., 1929), pp. 43-52, Jstor.  
  118. On Taylor's Series Admitting the Circle of Convergence as a Singular Curve  
    J. J. Gergen; D. V. Widder  
    American Journal of Mathematics, Vol. 50, No. 1. (Jan., 1928), pp. 139-146, Jstor.  
  119. A Generalization of Taylor's Series  
    D. V. Widder  
    Transactions of the American Mathematical Society, Vol. 30, No. 1. (Jan., 1928), pp. 126-154, Jstor.
  120. On a Criterion of Pringsheim's for Expansibility in Taylor's Series  
    M. B. Porter  
    The Annals of Mathematics, 2nd Ser., Vol. 8, No. 1. (Oct., 1906), pp. 45-48, Jstor.  

 

 

 

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