Published 1959
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Asymptotic Forms of Hermite Polynomials
- Creators
- Skovgaard, H.
Abstract
The asymptotic behavior of Hermite polynomials, H_n, (z), as n → ∞ has been investigated by several authors. The results previous to 1939, among which probably the best known are those of Plancherel and Rotach [8], are summarized in G. Szegö: Orthogonal Polynomials [10]. Some of the newer results are due to J. C. P. Miller [7], L. O. Heflinger [4] and M. Wyman. Since Hermite polynomials are special parabolic cylinder functions, attention should also be called to the results obtained in the complex plane by A. Erdélyi, M. Kennedy and J. L. McGregor [2] and by N. D. Kazarinoff [5].
Additional Information
Prepared under contract Nonr-220(11), for the Office of Naval Research. Reference no. NR 043-121.Attached Files
Published - Skovgaard_1959.pdf
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Additional details
- Eprint ID
- 29907
- Resolver ID
- CaltechAUTHORS:20120330-081915835
- Nonr-220 (11)
- Office of Naval Research
- Created
-
2012-06-18Created from EPrint's datestamp field
- Updated
-
2019-10-03Created from EPrint's last_modified field
- Other Numbering System Name
- Office of Naval Research. Reference
- Other Numbering System Identifier
- NR 043- 121