n-Linear Algebra of type II

TL;DR

This book introduces n-linear algebra of type II, expanding the properties and applications of n-vector spaces, including defining linear functionals, different coding theory applications, and multiple eigenvalues across distinct fields.

Contribution

It develops the theory of n-linear algebra of type II, enabling new definitions and applications not possible in type I, such as linear functionals and diverse coding structures.

Findings

Defined linear functionals for n-vector spaces of type II

Extended applications of n-linear algebra to coding theory

Allowed n-eigenvalues from distinct fields

Abstract

This book is a continuation of the book n-linear algebra of type I and its applications. Most of the properties that could not be derived or defined for n-linear algebra of type I is made possible in this new structure: n-linear algebra of type II which is introduced in this book. In case of n-linear algebra of type II we are in a position to define linear functionals which is one of the marked difference between the n-vector spaces of type I and II. However all the applications mentioned in n-linear algebras of type I can be appropriately extended to n-linear algebras of type II. Another use of n-linear algebra (n-vector spaces) of type II is that when this structure is used in coding theory we can have different types of codes built over different finite fields whereas this is not possible in the case of n-vector spaces of type I. Finally in the case of n-vector spaces of type II, we can obtain n-eigen values from distinct fields; hence, the n-characteristic polynomials formed in them are in distinct different fields. An attractive feature of this book is that the authors have suggested 120 problems for the reader to pursue in order to understand this new notion. This book has three chapters. In the first chapter the notion of n-vector spaces of type II are introduced. This chapter gives over 50 theorems. Chapter two introduces the notion of n-inner product vector spaces of type II, n-bilinear forms and n-linear functionals. The final chapter suggests over a hundred problems. It is important that the reader is well-versed not only with linear algebra but also n-linear algebra of type I.