Absorbing element mathematics , an absorbing element is a special type of element of a set with respect to a binary operation on that set. The result of combining an absorbing element with any element of the set is the absorbing element itself. In semigroup theory , the absorbing element is called a zero element confusion with other notions of zero , with the notable exception: under additive notation zero may, quite naturally, denote the neutral element of a monoid . In this article "zero element" and "absorbing element" are synonymous.Definition Formally, let be a set S with a closed binary operation • on it. A zero element is an element z such that for all s in S ,. A refinement are the notions of left zero , where one requires only that, and right zero semigroup of a semiring . In the case of a semiring with 0, the definition of an absorbing element is sometimes relaxed so that it is not required to absorb 0; otherwise, 0 would be the only absorbing element.Properties If a magma has both a left zero z and a right zero z ′ , then it has a zero, since. A magma can have at most one zero element.Examples The most well known example of an absorbing element comes from elementary algebra , where any number multiplied by zero equals zero. Zero is thus an absorbing element. The zero of any ring is also an absorbing element. For an element r of a ring R , r=r=r+r0 , so r0=0 , as zero is the unique element a for which r+a=r for any r in the ring R . Floating point arithmetics as defined in IEEE-754 standard contains a special value called Not-a-Number. It is an absorbing element for every operation; i.e.,,, etc . The set of binary relations over a set X , together with the composition of relations forms a monoid with zero, where the zero element is the empty relation . The closed interval with is also a monoid with zero, and the zero element is 0. More examples:
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