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In mathematics, specifically in order theo … In mathematics, specifically in order theory and functional analysis, two elements x and y of a vector lattice X are lattice disjoint or simply disjoint if , in which case we write , where the absolute value of x is defined to be . We say that two sets A and B are lattice disjoint or disjoint if a and b are disjoint for all a in A and all b in B, in which case we write . If A is the singleton set then we will write in place of . For any set A, we define the disjoint complement to be the set .ne the disjoint complement to be the set .
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rdfs:comment |
In mathematics, specifically in order theo … In mathematics, specifically in order theory and functional analysis, two elements x and y of a vector lattice X are lattice disjoint or simply disjoint if , in which case we write , where the absolute value of x is defined to be . We say that two sets A and B are lattice disjoint or disjoint if a and b are disjoint for all a in A and all b in B, in which case we write . If A is the singleton set then we will write in place of . For any set A, we define the disjoint complement to be the set .ne the disjoint complement to be the set .
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rdfs:label |
Lattice disjoint
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