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Additive Macaulay Posets

Order, 1997
For finite sequences \(a=(a_1,\dots, a_j)\) and \(b=(b_1,\dots, b_p)\) the juxtaposition of \(a\) and \(b\) is defined to be the sequence \((a_1,\dots, a_j,b_1,\dots, b_p)\). The sequences \(a\) and \(b\) are said to be overlapping if, for some \(s\leq\min\{j, p\}\), the inequalities \(a_{j-s+i}\geq b_i\) hold for all \(i=1,\dots, s\).
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Poset

2023
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Posets

2011
Sherenaz W. Al-Haj Baddar   +1 more
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Poset

2014
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Posets

2017
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Posets

2004
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mathematics
06a06
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