Authors in this book construct interval bistructures using only interval groups, interval loops, interval semigroups and interval groupoids. Several results enjoyed by these interval bistructures are described. By this method, we obtain interval bistructures which are associative or non associative or quasi associative. The term quasi is used mainly in the interval bistructure B = B1 ∪ B2 (or in n-interval structure) if one of B1 (or B2) enjoys an algebraic property and the other does not enjoy that property (one section of interval structure satisfies an algebraic property and the remaining section does not satisfy that particular property). The term quasi and semi are used in a synonymous way. This book has four chapters. In the first chapter interval bistructures (biinterval structures) such as interval bisemigroup, interval bigroupoid, interval bigroup and interval biloops are introduced.
THE EDUCATIONAL PUBLISHER INC, Ohio
interval bistructures, interval groups, interval loops
W.B. Vasantha Kandasamy & F. Smarandache. INTERVAL ALGEBRAIC BISTRUCTURES. Ohio: THE EDUCATIONAL PUBLISHER INC, 2011.
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