Most Power Series have Radius of Convergence 0 or 1*
Canadian mathematical bulletin, Tome 18 (1975) no. 1, pp. 39-40
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Consider a random power series Σ0 ∞ cn zn, that is, with coefficients {cn}0 ∞ chosen independently at random from the complex plane. What is the radius of convergence of such a series likely to be?One approach to this question is to let the {cn}0 ∞ be independent random variables on some probability space. It turns out that, with probability one, the radius of convergence is constant. Moreover, if the cn are symmetric and have the same distribution, then the circle of convergence is almost surely a natural boundary for the analytic function given by the power series (See [1, Ch. IV, Section 3]). Our treatment of the question will be elementary and will not use these facts.
Fournier, J. J. F.; Gauthier, P. M. Most Power Series have Radius of Convergence 0 or 1*. Canadian mathematical bulletin, Tome 18 (1975) no. 1, pp. 39-40. doi: 10.4153/CMB-1975-007-3
@article{10_4153_CMB_1975_007_3,
author = {Fournier, J. J. F. and Gauthier, P. M.},
title = {Most {Power} {Series} have {Radius} of {Convergence} 0 or 1*},
journal = {Canadian mathematical bulletin},
pages = {39--40},
year = {1975},
volume = {18},
number = {1},
doi = {10.4153/CMB-1975-007-3},
url = {http://geodesic.mathdoc.fr/articles/10.4153/CMB-1975-007-3/}
}
TY - JOUR AU - Fournier, J. J. F. AU - Gauthier, P. M. TI - Most Power Series have Radius of Convergence 0 or 1* JO - Canadian mathematical bulletin PY - 1975 SP - 39 EP - 40 VL - 18 IS - 1 UR - http://geodesic.mathdoc.fr/articles/10.4153/CMB-1975-007-3/ DO - 10.4153/CMB-1975-007-3 ID - 10_4153_CMB_1975_007_3 ER -
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