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| FIRST PART INTRODUCTION TO THE GALOIS FIELD THEORY CHAPTER I.Definition and properties of finite fields CHAPTER II.Proof of the existence of the GF(pm)for every prime p and integer m. CHAPTER III.Classification and determination of irreducible quantics CHAPTER IV.Miscellaneous properties of Galois Fields CHAPTER V.Analytic representation of substitutions on the marks of a Galois Field SECOND PART.THEORY OF LINEAR GROUPS IN A GALOIS FIELD CHAPTER I.General linear homogeneous group CHAPTER II.The Abelian linear group CHAPTER III.A generalization of the Abelian linear group CHAPTER IV.The hyperabelian group CHAPTER V.The hyperorthogonal and related linear groups CHAPTER VI.The compounds of a linear homogeneous group CHAPTER VII.Linear homogeneous group in the GF(pn),p>2,defined by a quadratic invariant CHAPTER VIII.Linear homogeneous group in the GB(2n)defined by a quadratic invariant CHAPTER IX.Linear groups with certain invariants of degree q>2. CHAPTER X.Canonical form and classification of linear substitutions CHAPTER XI.Operators and cyclic subgroups of the simple group CHAPTER XII.Subgroups of the linear fractional group LF(2,pn) CHAPTER XIII.Auxiliary theorems on abst groups.Abstract forms of various linear groups. CHAPTER XIV.Group of the equation for the 27 straight lines on a general surface of the third order CHAPTER XV.Summary of the known systems of simple groups INDEX OF SUBJECTS |
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