Presentation	1998/3/18 On Functions for Quadri-phase Complimentary Sequences of Length 2^n Shinya MATSUFUJI, Naoki SUEHIRO,
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Abstract(in English)	Complimentary sequences are defind as a pair of sequences with the same length characterized by the property that for the same phase-shift the sum of these aperiodic auto-correlations takes zero except the zero-shift. This paper presents a formal expression of a generating function for quadri-phase complimentary sequences of length 2^n. The expresion can show the number of the quadri-phase complimentary sequences, and relation between the quadri-phase complimentary sequences and the previously given two sequences, i.e., quadri-phase even-shift orthogonal sequence and the quadri-phase sequence whose aperidic auto-correlation function takes pure imaginary values for non zero-shifts.
Keyword(in Japanese)	(See Japanese page)
Keyword(in English)	Pseudo-random sequence / complimentary sequences / even-shift orthogonal sequence
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Conference Information
Committee	ISEC
Conference Date	1998/3/18(1days)
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Paper Information
Registration To	Information Security (ISEC)
Language	JPN
Title (in Japanese)	(See Japanese page)
Sub Title (in Japanese)	(See Japanese page)
Title (in English)	On Functions for Quadri-phase Complimentary Sequences of Length 2^n
Sub Title (in English)
Keyword(1)	Pseudo-random sequence
Keyword(2)	complimentary sequences
Keyword(3)	even-shift orthogonal sequence
1st Author's Name	Shinya MATSUFUJI
1st Author's Affiliation	Department of Information Science, Saga University()
2nd Author's Name	Naoki SUEHIRO
2nd Author's Affiliation	Institute Applied Physics, University of Tsukuba
Date	1998/3/18
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Volume (vol)	vol.97
Number (no)	611
Page	pp.pp.-
#Pages	5
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