- nonassociative
- nonassociative onassociative adj. not associative. Opposite of {associative}. [WordNet 1.5]

*The Collaborative International Dictionary of English.
2000.*

- nonassociative
- nonassociative onassociative adj. not associative. Opposite of {associative}. [WordNet 1.5]

*The Collaborative International Dictionary of English.
2000.*

**nonassociative**— [spelling only] … English World dictionary**nonassociative**— adj.; nonassociatively, adv. * * * … Universalium**nonassociative**— adjective Not having associativity of all elements under its operation … Wiktionary**nonassociative**— non·as·so·cia·tive ə sō s(h)ē .āt iv, shət iv adj not associative esp relating to or being learning (as habituation and sensitization) that is not associative learning … Medical dictionary**nonassociative**— adjective not associative • Ant: ↑associative * * * adj.; nonassociatively, adv … Useful english dictionary**Nonassociative ring**— In abstract algebra, a nonassociative ring is a generalization of the concept of ring. A nonassociative ring is a set R with two operations, addition and multiplication, such that: R is an abelian group under addition: a + b = b + a (a + b) + c … Wikipedia**Problems in loop theory and quasigroup theory**— In mathematics, especially abstract algebra, loop theory and quasigroup theory are active research areas with many open problems. As in other areas of mathematics, such problems are often made public at professional conferences and meetings. Many … Wikipedia**animal learning**— ▪ zoology Introduction the alternation of behaviour as a result of individual experience. When an organism can perceive and change its behaviour, it is said to learn. That animals can learn seems to go without saying. The cat that… … Universalium**Moufang loop**— In mathematics, a Moufang loop is a special kind of algebraic structure. It is similar to a group in many ways but need not be associative. Moufang loops were introduced by Ruth Moufang. Contents 1 Definition 2 Examples 3 Properties … Wikipedia**Ring (mathematics)**— This article is about algebraic structures. For geometric rings, see Annulus (mathematics). For the set theory concept, see Ring of sets. Polynomials, represented here by curves, form a ring under addition and multiplication. In mathematics, a… … Wikipedia