Timeline for Padé Approximants of Power Series with Natural Boundaries
Current License: CC BY-SA 4.0
13 events
| when toggle format | what | by | license | comment | |
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| May 29, 2019 at 19:19 | history | edited | MCS | CC BY-SA 4.0 |
edited body
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| May 28, 2019 at 0:28 | comment | added | Ira Gessel | The easiest way is to copy and paste. Search for "Gabor Szego" and the first hit is the Wikipedia page with the correct diacritics. (Or just copy from my comment.) | |
| May 27, 2019 at 2:25 | comment | added | Ira Gessel | A minor point, but it's a long umlaut on the o: ő, not ö. | |
| May 26, 2019 at 22:13 | history | edited | MCS | CC BY-SA 4.0 |
added 390 characters in body
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| May 26, 2019 at 20:17 | comment | added | MCS | I have fixed it. | |
| May 26, 2019 at 20:16 | history | edited | MCS | CC BY-SA 4.0 |
edited body
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| May 26, 2019 at 4:04 | comment | added | Ira Gessel | It's Gábor Szegő. | |
| May 25, 2019 at 19:52 | history | edited | MCS | CC BY-SA 4.0 |
Attributed a theorem to the wrong Hungarian!
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| May 25, 2019 at 19:52 | comment | added | MCS | Oh my! I guess I've been getting his name wrong! It is Gabor Szëgo. The reference is page 260 of Reinhold Remmert's "ClassicalTopics in Complex Function Theory" (1998). The theorem states that for a power series centered at zero whose coefficients take on only finitely many distinct values, then either the unit disk is a natural boundary for the power series, or the power series defines a rational function whose poles are roots of unity. | |
| May 24, 2019 at 19:18 | history | edited | MCS | CC BY-SA 4.0 |
edited title
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| S May 24, 2019 at 9:56 | history | suggested | user64494 | CC BY-SA 4.0 |
Typos in the title are corrected.
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| May 24, 2019 at 9:22 | review | Suggested edits | |||
| S May 24, 2019 at 9:56 | |||||
| May 23, 2019 at 21:53 | history | asked | MCS | CC BY-SA 4.0 |