{ "id": "1208.5186", "version": "v2", "published": "2012-08-26T02:13:16.000Z", "updated": "2012-09-23T00:43:23.000Z", "title": "Zeros of Sections of Some Power Series", "authors": [ "Antonio R. Vargas" ], "comment": "MSc thesis, Dalhousie University. 71+vi pages, 23 figures", "categories": [ "math.NT", "math.CA" ], "abstract": "For a power series which converges in some neighborhood of the origin in the complex plane, it turns out that the zeros of its partial sums---its sections---often behave in a controlled manner, producing intricate patterns as they converge and disperse. We open this thesis with an overview of some of the major results in the study of this phenomenon in the past century, focusing on recent developments which build on the theme of asymptotic analysis. Inspired by this work, we derive results concerning the asymptotic behavior of the zeros of partial sums of power series for entire functions defined by exponential integrals of a certain type. Most of the zeros of the n'th partial sum travel outwards from the origin at a rate comparable to n, so we rescale the variable by n and explicitly calculate the limit curves of these normalized zeros. We discover that the zeros' asymptotic behavior depends on the order of the critical points of the integrand in the aforementioned exponential integral. Special cases of the exponential integral functions we study include classes of confluent hypergeometric functions and Bessel functions. Prior to this thesis, the latter have not been specifically studied in this context.", "revisions": [ { "version": "v2", "updated": "2012-09-23T00:43:23.000Z" } ], "analyses": { "keywords": [ "power series", "exponential integral", "partial sums-its sections-often behave", "nth partial sum travel outwards", "asymptotic behavior depends" ], "tags": [ "dissertation" ], "note": { "typesetting": "TeX", "pages": 0, "language": "en", "license": "arXiv", "status": "editable", "adsabs": "2012arXiv1208.5186V" } } }