Costas_array

Costas array

Set of marks on a 2d square grid such that no two pairs of marks are the same distance apart

In mathematics, a Costas array can be regarded geometrically as a set of n points, each at the center of a square in an n×n square tiling such that each row or column contains only one point, and all of the n(n − 1)/2 displacement vectors between each pair of dots are distinct. This results in an ideal "thumbtack" auto-ambiguity function, making the arrays useful in applications such as sonar and radar. Costas arrays can be regarded as two-dimensional cousins of the one-dimensional Golomb ruler construction, and, as well as being of mathematical interest, have similar applications in experimental design and phased array radar engineering.

Costas arrays are named after John P. Costas, who first wrote about them in a 1965 technical report. Independently, Edgar Gilbert also wrote about them in the same year, publishing what is now known as the logarithmic Welch method of constructing Costas arrays.^[1] The general enumeration of Costas arrays is an open problem in computer science and finding an algorithm that can solve it in polynomial time is an open research question.

Numerical representation

A Costas array may be represented numerically as an n×n array of numbers, where each entry is either 1, for a point, or 0, for the absence of a point. When interpreted as binary matrices, these arrays of numbers have the property that, since each row and column has the constraint that it only has one point on it, they are therefore also permutation matrices. Thus, the Costas arrays for any given n are a subset of the permutation matrices of order n.

Arrays are usually described as a series of indices specifying the column for any row. Since it is given that any column has only one point, it is possible to represent an array one-dimensionally. For instance, the following is a valid Costas array of order N = 4:

{\begin{array}{|c|c|c|c|}\hline 0&0&0&1\\\hline 0&0&1&0\\\hline 1&0&0&0\\\hline 0&1&0&0\\\hline \end{array}}

or simply

{\begin{array}{|c|c|c|c|}\hline &&&\bullet \\\hline &&\bullet &\\\hline \bullet &&&\\\hline &\bullet &&\\\hline \end{array}}

There are dots at coordinates: (1,2), (2,1), (3,3), (4,4)

Since the x-coordinate increases linearly, we can write this in shorthand as the set of all y-coordinates. The position in the set would then be the x-coordinate. Observe: {2,1,3,4} would describe the aforementioned array. This defines a permutation. This makes it easy to communicate the arrays for a given order of N.

Known arrays

Costas array counts are known for orders 1 through 29^[2] (sequence A008404 in the OEIS):

More information Order, Number ...

Here are some known arrays: N = 1 {1}

N = 2 {1,2} {2,1}

N = 3 {1,3,2} {2,1,3} {2,3,1} {3,1,2}

N = 4 {1,2,4,3} {1,3,4,2} {1,4,2,3} {2,1,3,4} {2,3,1,4} {2,4,3,1} {3,1,2,4} {3,2,4,1} {3,4,2,1} {4,1,3,2} {4,2,1,3} {4,3,1,2}

N = 5 {1,3,4,2,5} {1,4,2,3,5} {1,4,3,5,2} {1,4,5,3,2} {1,5,3,2,4} {1,5,4,2,3} {2,1,4,5,3} {2,1,5,3,4} {2,3,1,5,4} {2,3,5,1,4} {2,3,5,4,1} {2,4,1,5,3} {2,4,3,1,5} {2,5,1,3,4} {2,5,3,4,1} {2,5,4,1,3} {3,1,2,5,4} {3,1,4,5,2} {3,1,5,2,4} {3,2,4,5,1} {3,4,2,1,5} {3,5,1,4,2} {3,5,2,1,4} {3,5,4,1,2} {4,1,2,5,3} {4,1,3,2,5} {4,1,5,3,2} {4,2,3,5,1} {4,2,5,1,3} {4,3,1,2,5} {4,3,1,5,2} {4,3,5,1,2} {4,5,1,3,2} {4,5,2,1,3} {5,1,2,4,3} {5,1,3,4,2} {5,2,1,3,4} {5,2,3,1,4} {5,2,4,3,1} {5,3,2,4,1}

N = 6 {1,2,5,4,6,3} {1,2,6,4,3,5} {1,3,2,5,6,4} {1,3,2,6,4,5} {1,3,6,4,5,2} {1,4,3,5,6,2} {1,4,5,3,2,6} {1,4,6,5,2,3} {1,5,3,4,6,2} {1,5,3,6,2,4} {1,5,4,2,3,6} {1,5,4,6,2,3} {1,5,6,2,4,3} {1,5,6,3,2,4} {1,6,2,4,5,3} {1,6,3,2,4,5} {1,6,3,4,2,5} {1,6,3,5,4,2} {1,6,4,3,5,2} {2,3,1,5,4,6} {2,3,5,4,1,6} {2,3,6,1,5,4} {2,4,1,6,5,3} {2,4,3,1,5,6} {2,4,3,6,1,5} {2,4,5,1,6,3} {2,4,5,3,6,1} {2,5,1,6,3,4} {2,5,1,6,4,3} {2,5,3,4,1,6} {2,5,3,4,6,1} {2,5,4,6,3,1} {2,6,1,4,3,5} {2,6,4,3,5,1} {2,6,4,5,1,3} {2,6,5,3,4,1} {3,1,2,5,4,6} {3,1,5,4,6,2} {3,1,5,6,2,4} {3,1,6,2,5,4} {3,1,6,5,2,4} {3,2,5,1,6,4} {3,2,5,6,4,1} {3,2,6,1,4,5} {3,2,6,4,5,1} {3,4,1,6,2,5} {3,4,2,6,5,1} {3,4,6,1,5,2} {3,5,1,2,6,4} {3,5,1,4,2,6} {3,5,2,1,6,4} {3,5,4,1,2,6} {3,5,4,2,6,1} {3,5,6,1,4,2} {3,5,6,2,1,4} {3,6,1,5,4,2} {3,6,4,5,2,1} {3,6,5,1,2,4} {4,1,2,6,5,3} {4,1,3,2,5,6} {4,1,6,2,3,5} {4,2,1,5,6,3} {4,2,1,6,3,5} {4,2,3,5,1,6} {4,2,3,6,5,1} {4,2,5,6,1,3} {4,2,6,3,5,1} {4,2,6,5,1,3} {4,3,1,6,2,5} {4,3,5,1,2,6} {4,3,6,1,5,2} {4,5,1,3,2,6} {4,5,1,6,3,2} {4,5,2,1,3,6} {4,5,2,6,1,3} {4,6,1,2,5,3} {4,6,1,5,2,3} {4,6,2,1,5,3} {4,6,2,3,1,5} {4,6,5,2,3,1} {5,1,2,4,3,6} {5,1,3,2,6,4} {5,1,3,4,2,6} {5,1,6,3,4,2} {5,2,3,1,4,6} {5,2,4,3,1,6} {5,2,4,3,6,1} {5,2,6,1,3,4} {5,2,6,1,4,3} {5,3,2,4,1,6} {5,3,2,6,1,4} {5,3,4,1,6,2} {5,3,4,6,2,1} {5,3,6,1,2,4} {5,4,1,6,2,3} {5,4,2,3,6,1} {5,4,6,2,3,1} {6,1,3,4,2,5} {6,1,4,2,3,5} {6,1,4,3,5,2} {6,1,4,5,3,2} {6,1,5,3,2,4} {6,2,1,4,5,3} {6,2,1,5,3,4} {6,2,3,1,5,4} {6,2,3,5,4,1} {6,2,4,1,5,3} {6,2,4,3,1,5} {6,3,1,2,5,4} {6,3,2,4,5,1} {6,3,4,2,1,5} {6,4,1,3,2,5} {6,4,5,1,3,2} {6,4,5,2,1,3} {6,5,1,3,4,2} {6,5,2,3,1,4}

Enumeration of known Costas arrays to order 200,^[3] order 500^[4] and to order 1030^[5] are available. Although these lists and databases of these Costas arrays are likely near complete, other Costas arrays with orders above 29 that are not in these lists may exist.

Constructions

Welch

A Welch–Costas array, or just Welch array, is a Costas array generated using the following method, first discovered by Edgar Gilbert in 1965 and rediscovered in 1982 by Lloyd R. Welch. The Welch–Costas array is constructed by taking a primitive root g of a prime number p and defining the array A by $A_{i,j}=1$ if $j\equiv g^{i}{\bmod {p}}$ , otherwise 0. The result is a Costas array of size p − 1.

Example:

3 is a primitive element modulo 5.

3¹ = 3 ≡ 3 (mod 5)

3² = 9 ≡ 4 (mod 5)

3³ = 27 ≡ 2 (mod 5)

3⁴ = 81 ≡ 1 (mod 5)

Therefore, [3 4 2 1] is a Costas permutation. More specifically, this is an exponential Welch array. The transposition of the array is a logarithmic Welch array.

The number of Welch–Costas arrays which exist for a given size depends on the totient function.

Lempel–Golomb

The Lempel–Golomb construction takes α and β to be primitive elements of the finite field GF(q) and similarly defines $A_{i,j}=1$ if $\alpha ^{i}+\beta ^{j}=1$ , otherwise 0. The result is a Costas array of size q − 2. If α + β = 1 then the first row and column may be deleted to form another Costas array of size q − 3: such a pair of primitive elements exists for every prime power q>2.

References

Barker, L.; Drakakis, K.; Rickard, S. (2009), "On the complexity of the verification of the Costas property" (PDF), Proceedings of the IEEE, 97 (3): 586–593, doi:10.1109/JPROC.2008.2011947, S2CID 29776660, archived from the original (PDF) on 2012-04-25, retrieved 2011-10-10.
Beard, James (March 2006), "Generating Costas Arrays to Order 200", 2006 40th Annual Conference on Information Sciences and Systems, IEEE, doi:10.1109/ciss.2006.286635, S2CID 2241386.
Beard, James K. (March 2008), "Costas array generator polynomials in finite fields", 2008 42nd Annual Conference on Information Sciences and Systems, IEEE, doi:10.1109/ciss.2008.4558709, S2CID 614347.
Beard, James K. (2017), Costas arrays and enumeration to order 1030, IEEE Dataport, doi:10.21227/H21P42.
Beard, J.; Russo, J.; Erickson, K.; Monteleone, M.; Wright, M. (2004), "Combinatoric collaboration on Costas arrays and radar applications", IEEE Radar Conference, Philadelphia, Pennsylvania (PDF), pp. 260–265, doi:10.1109/NRC.2004.1316432, S2CID 7733481, archived from the original (PDF) on 2012-04-25, retrieved 2011-10-10.
Beard, James; Russo, Jon; Erickson, Keith; Monteleone, Michael; Wright, Michael (April 2007), "Costas array generation and search methodology", IEEE Transactions on Aerospace and Electronic Systems, 43 (2): 522–538, doi:10.1109/taes.2007.4285351, S2CID 32271456.
Costas, J. P. (1965), Medium constraints on sonar design and performance, Class 1 Report R65EMH33, G.E. Corporation
Costas, J. P. (1984), "A study of a class of detection waveforms having nearly ideal range-Doppler ambiguity properties" (PDF), Proceedings of the IEEE, 72 (8): 996–1009, doi:10.1109/PROC.1984.12967, S2CID 2742217, archived from the original (PDF) on 2011-09-30, retrieved 2011-10-10.
Drakakis, Konstantinos; Rickard, Scott; Beard, James K.; Caballero, Rodrigo; Iorio, Francesco; O'Brien, Gareth; Walsh, John (October 2008), "Results of the Enumeration of Costas Arrays of Order 27", IEEE Transactions on Information Theory, 54 (10): 4684–4687, doi:10.1109/tit.2008.928979, hdl:2262/59260.
Drakakis, Konstantinos; Iorio, Francesco; Rickard, Scott (2011), "The enumeration of Costas arrays of order 28 and its consequences", Advances in Mathematics of Communications
Drakakis, Konstantinos; Iorio, Francesco; Rickard, Scott; Walsh, John (August 2011), "Results of the enumeration of Costas arrays of order 29", Advances in Mathematics of Communications, 5 (3): 547–553, doi:10.3934/amc.2011.5.547, hdl:2262/59260.
Gilbert, E. N. (1965), "Latin squares which contain no repeated digrams", SIAM Review, 7 (2): 189–198, doi:10.1137/1007035, MR 0179095.
Golomb, Solomon W. (1984), "Algebraic constructions for Costas arrays", Journal of Combinatorial Theory, Series A, 37 (1): 13–21, doi:10.1016/0097-3165(84)90015-3, MR 0749508.
Golomb, Solomon W. (1992), "The $T_{4}$ and $G_{4}$ constructions for Costas arrays", IEEE Transactions on Information Theory, 38 (4): 1404–1406, doi:10.1109/18.144726, MR 1168761
Golomb, S. W.; Taylor, H. (1984), "Construction and properties of Costas arrays" (PDF), Proceedings of the IEEE, 72 (9): 1143–1163, doi:10.1109/PROC.1984.12994, S2CID 39718506, archived from the original (PDF) on 2011-09-30, retrieved 2011-10-10.
Guy, Richard K. (2004), "Sections C18 and F9", Unsolved Problems in Number Theory (3rd ed.), Springer Verlag, ISBN 0-387-20860-7.
Moreno, Oscar (1999), "Survey of results on signal patterns for locating one or multiple targets", in Pott, Alexander; Kumar, P. Vijay; Helleseth, Tor; et al. (eds.), Difference Sets, Sequences and Their Correlation Properties, NATO Advanced Science Institutes Series, vol. 542, Kluwer, p. 353, ISBN 0-7923-5958-5.
Rickard, Scott (2004), "Searching for Costas Arrays using Periodicity Properties", IMA International Conference on Mathematics in Signal Processing.

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Costas (1965); Gilbert (1965); An independent discovery of Costas arrays, Aaron Sterling, October 9, 2011.

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[FOOTNOTEBeardRussoEricksonMonteleone2007-10] [10]
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Blackburn, Simon R.; Panoui, Anastasia; Paterson, Maura B.; Stinson, Douglas R. (2010-12-10). "Honeycomb Arrays". The Electronic Journal of Combinatorics. 17: R172. doi:10.37236/444. ISSN 1077-8926.

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Costas_array

Costas array

Numerical representation

Known arrays

Constructions

Welch

Lempel–Golomb

Extensions by Taylor, Lempel, and Golomb

Other methods

Variants

See also

Notes

References

External links

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Order	Number
1	1
2	2
3	4
4	12
5	40
6	116
7	200
8	444
9	760
10	2160
11	4368
12	7852
13	12828
14	17252
15	19612
16	21104
17	18276
18	15096
19	10240
20	6464
21	3536
22	2052
23	872
24	200
25	88
26	56
27	204
28	712
29	164