Ordered ring abstract algebra , an ordered ring is a ring R with a total order ≤ such that for all a , b , and c in R : if a ≤ b then a + c ≤ b + c . if 0 ≤ a and 0 ≤ b then 0 ≤ ab .Examples arithmetic . Examples include the integers, the rationals and the real numbers . The complex numbers , in contrast, do not form an ordered ring or field, because there is no inherent order relationship between the elements 1 and i .In analogy with the real numbers, we call an element c of an ordered ring R positive if 0 < c , and negative if c < 0. 0 is considered to be neither positive nor negative.R is often denoted by R + . An alternative notation, favored in some disciplines, is to use R + for the set of nonnegative elements, and R ++ for the set of positive elements.Absolute value If is an element of an ordered ring R , then the absolute value of, denoted, is defined thus:additive inverse of and 0 is the additive identity element.A discrete ordered ringdiscretely ordered ring is an ordered ring in which there is no element between 0 and 1. The integers are a discrete ordered ring, but the rational numbers are not.Basic properties For all a , b and c in R :If a ≤ b and 0 ≤ c , then ac ≤ bc . This property is sometimes used to define ordered rings instead of the second property in the definition above. |ab | = |a ||b |. An ordered ring that is not trivial is infinite. Exactly one of the following is true: a is positive, -a is positive, or a = 0. This property follows from the fact that ordered rings are abelian , linearly ordered groups with respect to addition. In an ordered ring, no negative element is a square. This is because if a ≠ 0 and a = b 2 then b ≠ 0 and a = 2 ; as either b or -b is positive, a must be nonnegative.
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