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Fiedler, Frank; Jedwab, Jonathan; Parker, Matthew G.

A multi-dimensional approach to the construction and enumeration of Golay complementary sequences. (English) Zbl 1154.05012

J. Comb. Theory, Ser. A 115, No. 5, 753-776 (2008).
Summary: We argue that a Golay complementary sequence is naturally viewed as a projection of a multi-dimensional Golay array. We present a three-stage process for constructing and enumerating Golay array and sequence pairs:
1.
construct suitable Golay array pairs from lower-dimensional Golay array pairs;
2.
apply transformations to these Golay array pairs to generate a larger set of Golay array pairs; and
3.
take projections of the resulting Golay array pairs to lower dimensions.
This process greatly simplifies previous approaches, by separating the construction of Golay arrays from the enumeration of all possible projections of these arrays to lower dimensions.
We use this process to construct and enumerate all \(2^h\)-phase Golay sequences of length \(2^m\) obtainable under any known method, including all 4-phase Golay sequences obtainable from the length 16 examples given by Y. Li and W. B. Chu [”More Golay sequences”, IEEE Trans. Inf. Theory 51, 1141–1145 (2005)].
Reviewer: Ivan Landjev (Sofia)

Cited in 3 Reviews
Cited in 19 Documents

MSC:

05B20 Combinatorial aspects of matrices (incidence, Hadamard, etc.)

Keywords:

Golay array; Golay complementary sequence; construction; enumeration; projection
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Full Text: DOI

References:

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