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Statements

Subject Item
dbr:Reed–Muller_expansion
rdfs:label
Reed–Muller expansion
rdfs:comment
In Boolean logic, a Reed–Muller expansion (or Davio expansion) is a decomposition of a Boolean function. For a Boolean function we call the positive and negative cofactors of with respect to , and the boolean derivation of with respect to , where denotes the XOR operator. Then we have for the Reed–Muller or positive Davio expansion:
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dbc:Boolean_algebra
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9608295
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1121168998
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dbp:cs1Dates
y
dbp:date
March 2021
dbo:abstract
In Boolean logic, a Reed–Muller expansion (or Davio expansion) is a decomposition of a Boolean function. For a Boolean function we call the positive and negative cofactors of with respect to , and the boolean derivation of with respect to , where denotes the XOR operator. Then we have for the Reed–Muller or positive Davio expansion:
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wikipedia-en:Reed–Muller_expansion?oldid=1121168998&ns=0
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11093
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wikipedia-en:Reed–Muller_expansion