Associative idempotent nondecreasing functions are reducible
classification
🧮 math.RA
keywords
associativefunctionnondecreasingreduciblefunctionsidempotentbinarycalled
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An $n$-ary associative function is called reducible if it can be written as a composition of a binary associative function. We summarize known results when the function is defined on a chain and is nondecreasing. Our main result shows that associative idempotent and nondecreasing functions are uniquely reducible.
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