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Abstract

The algebraic structure, linear algebra happens to be one of the subjects
which yields itself to applications to several fields like coding or
communication theory, Markov chains, representation of groups and graphs,
Leontief economic models and so on. This book has for the first time,
introduced a new algebraic structure called linear bialgebra, which is also a
very powerful algebraic tool that can yield itself to applications. With the
recent introduction of bimatrices (2005)we have ventured in this book to
introduce new concepts like linear bialgebra and Smarandache neutrosophic
linear bialgebra and also give the applications of these algebraic structures.
It is important to mention here it is a matter of simple exercise to extend
these to linear n-algebra for any n greater than 2; for n = 2 we get the linear
bialgebra. This book has five chapters. In the first chapter we just introduce
some basic notions of linear algebra and Slinear algebra and their
applications. Chapter two introduces some new algebraic bistructures. In
chapter three we introduce the notion of linear bialgebra and discuss several
interesting properties about them. Also, application of linear bialgebra to
bicodes is given. A remarkable part of our research in this book is the
introduction of the notion of birepresentation of bigroups. The fourth chapter
introduces several neutrosophic algebraic structures since they help in
defining the new concept of neutrosophic linear bialgebra, neutrosophic
bivector spaces, Smarandache neutrosophic linear bialgebra and Smarandache
neutrosophic bivector spaces. Theirprobable applications to real-world models
are discussed.