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PRE A?-ALGEBRA AS A SEMILATTICE 1.B. PRAROOPA,cheap louis vuitton handbags, Helper Professor of Mathematics,louis vuitton outlet, Andhra Loyola Start of Engineering&Technology, Vijayawada -8.A.P.Indian. Email : , 2. Doctor.J.Venkateswara Rao, Teacher of Math, Mekelle University Primary University, P.O.Container No: 231,louis vuitton outlet online, Mekelle,Tigrai , Ethiopia . E-mails: , Abstract : This paper is a study algebraic structure of Pre A?-algebra. First we determine partial purchasing on Pre A?-geometry. We prove if your is really a Pre A*-geometry then (A, ) is really a poset. We determine a semilattice on Before A*-geometry.We prove Before A--algebra as a semilattice.Next we show some theorems on semilattice over a Pre A*-geometry.We define distributive and lift-up semilattices on Pre A--geometry We determine enhance,She or he exercises,family member enhance of an element in Pre A--geometry. We define complemented semilattice,relatively complemented semilattices in Before A--algebra, We give a few examples of those semilattices in Pre A--algebra We determine weakly complemented,partially-complemented,distinctively complemented semilattices in Before A--algebra, We prove some theorems on these semilattices in Before A*-geometry Keywords: PreA--Geometry,Semilattice,accompanied semilattice,
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