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- [[Hermite Gauss mode]] refers to the specific solution \(F=F(x,z)\) of equation The [[Hermite Gauss mode]] is expressed in terms of the [[Hermite polynomial]]8 KB (1,216 words) - 18:43, 30 July 2019
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File:Hermigaplot.jpg if(n>13) {printf("hermite number %2d is not yet implemented (max. is 13)\n consider to stop..",n); ge DB hermiten(int n,DB x){ if(n>13) {printf("hermite number %2d is not yet implemented (max. is 13)\n consider to stop..",n); ge(1,672 × 435 (160 KB)) - 08:37, 1 December 2018File:Hermiten6map.jpg [[Complex map]] of the normalised [[Hermite polynomial]] number 6: if(n>81) {printf("hermite number %2d is not yet implemented (max. is 81)\n consider to stop..",n); ge(1,307 × 880 (630 KB)) - 08:37, 1 December 2018- \(H_n\!=\)[[HermiteH]]\(_n\) is the \(nth\) [[Hermite polynomial]], This quantity is related also to the [[Hermite number]]; for real \(n\ge -1/2\),6 KB (883 words) - 18:44, 30 July 2019
- [[Hermite Gauss mode]] refers to the specific solution \(F=F(x,z)\) of equation The [[Hermite Gauss mode]] is expressed in terms of the [[Hermite polynomial]]8 KB (1,216 words) - 18:43, 30 July 2019
- [[File:Hermiten.jpg|300px|thumb| Normalised [[Hermite polynomial]]s, \(y=h_n(x)\) for \(n=2,3,4,5,6\)]] [[Hermite polynomial]] appears at the solution of the [[Stationary Schroedinger equat4 KB (628 words) - 18:47, 30 July 2019
- ...to be useful for the analysis of the asymptotic behaviour of the [[Hermite Gauss mode]]s, [[oscillator function]]s, and in particular, the [[Amplitude of os [[Hermite Gauss mode]],3 KB (478 words) - 18:43, 30 July 2019
- [[Gauss-Hermite quadrature]], [[Gauss-Legendre quadrature]] and6 KB (918 words) - 18:47, 30 July 2019
- through the [[Hermite polynomial]] ==[[Hermite number]]==6 KB (846 words) - 18:47, 30 July 2019