### Abstract

Original language | Danish |
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Title of host publication | Proceedings of the IEEE ICASSP 2003, Hong Kong, April 6-10 |

Number of pages | 4 |

Publisher | IEEE |

Publication date | 2003 |

Pages | 397-400 |

ISBN (Print) | 0-7803-7663-3 |

Publication status | Published - 2003 |

Event | The Symmetric Rudin-Shapiro Transform - Duration: 19 May 2010 → … |

### Conference

Conference | The Symmetric Rudin-Shapiro Transform |
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Period | 19/05/2010 → … |

### Cite this

*Proceedings of the IEEE ICASSP 2003, Hong Kong, April 6-10*(pp. 397-400). IEEE.

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*Proceedings of the IEEE ICASSP 2003, Hong Kong, April 6-10.*IEEE, pp. 397-400, The Symmetric Rudin-Shapiro Transform, 19/05/2010.

**The Symmetric Rudin-Shapiro Transform : An Easy, Stable, And Fast Construction Of Multiple Orthogonal Spread Spectrum Signals.** / Harbo, Anders La-Cour.

Research output: Contribution to book/anthology/report/conference proceeding › Article in proceeding › Research › peer-review

TY - GEN

T1 - The Symmetric Rudin-Shapiro Transform

T2 - An Easy, Stable, And Fast Construction Of Multiple Orthogonal Spread Spectrum Signals

AU - Harbo, Anders La-Cour

PY - 2003

Y1 - 2003

N2 - A method for constructing spread spectrum sequences is presented. The method is based on a linear, orthogonal, symmetric transform, the Rudin-Shapiro transform (RST), which is in many respects quite similar to the Haar wavelet packet transform. The RST provides the means for generating large sets of spread spectrum signals. This presentation provides a simple definition of the symmetric RST that leads to a fast $N\log(N)$ and numerically stable implementation of the transform.

AB - A method for constructing spread spectrum sequences is presented. The method is based on a linear, orthogonal, symmetric transform, the Rudin-Shapiro transform (RST), which is in many respects quite similar to the Haar wavelet packet transform. The RST provides the means for generating large sets of spread spectrum signals. This presentation provides a simple definition of the symmetric RST that leads to a fast $N\log(N)$ and numerically stable implementation of the transform.

M3 - Konferenceartikel i proceeding

SN - 0-7803-7663-3

SP - 397

EP - 400

BT - Proceedings of the IEEE ICASSP 2003, Hong Kong, April 6-10

PB - IEEE

ER -