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ISAAC
2004
Springer
2004
Springer
A Generalization of Magic Squares with Applications to Digital Halftoning
A semimagic square of order n is an n ¢n matrix containing the integers 0 n2 1 arranged in such a way that each row and column add up to the same value. We generalize this notion to that of a zero k ¢kdiscrepancy matrix by replacing the requirement that the sum of each row and each column be the same by that of requiring that the sum of the entries in each k¢k square contiguous submatrix be the same. We show that such matrices exist if k and n are both even, and do not if k and n are are relatively prime. Further, the existence is also guaranteed whenever n km, for some integers k m 2. We present a space-efficient algorithm for constructing such a matrix. Another class that we call constant-gap matrices arises in this construction. We give a characterization of such matrices. An application to digital halftoning is also mentioned.
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| Added | 02 Jul 2010 |
| Updated | 02 Jul 2010 |
| Type | Conference |
| Year | 2004 |
| Where | ISAAC |
| Authors | Boris Aronov, Tetsuo Asano, Yosuke Kikuchi, Subhas C. Nandy, Shinji Sasahara, Takeaki Uno |
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