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Field theory is an area in physics with a deceptively compact notation. Although general purpose com...
Galois Theory, a wonderful part of mathematics with historical roots date back to the solution of cu...
Providing an accessible account of the theoretical foundations Covering topics not found in competin...
The study of “abstract algebra” grew out of an interest in knowing how attributes of sets of mathema...
This book is wholeheartedly recommended to every student or user of mathematics. Although the author...
Can we be – algebraically – exact about something approximate? We may, in the first instance, reject...
Abstract. Let A be a finite-dimensional division algebra containing a base field k in its center F. ...
An algebraic number field is a finite extension of Q; an algebraic number is an element of an algebr...
Abstract algebra enjoys a prestigious position in mathematics and the undergraduate mathematics curr...
Intended for graduate courses or for independent study, this book presents the basic theory of field...
In this article we further develop field theory in Mizar [1], [2], [3] towards splitting fields. We ...
These notes give an introduction to the basic notions of abstract algebra, groups, rings (so far as ...
20 pagesThe formal language of Clifford's algebras is attracting an increasingly large community of ...
This classic is one of the cornerstones of modern algebraic geometry. At the same time, it is entire...
This is a survey about connections between central simple algebras and Galois representations in the...
Field theory is an area in physics with a deceptively compact notation. Although general purpose com...
Galois Theory, a wonderful part of mathematics with historical roots date back to the solution of cu...
Providing an accessible account of the theoretical foundations Covering topics not found in competin...
The study of “abstract algebra” grew out of an interest in knowing how attributes of sets of mathema...
This book is wholeheartedly recommended to every student or user of mathematics. Although the author...
Can we be – algebraically – exact about something approximate? We may, in the first instance, reject...
Abstract. Let A be a finite-dimensional division algebra containing a base field k in its center F. ...
An algebraic number field is a finite extension of Q; an algebraic number is an element of an algebr...
Abstract algebra enjoys a prestigious position in mathematics and the undergraduate mathematics curr...
Intended for graduate courses or for independent study, this book presents the basic theory of field...
In this article we further develop field theory in Mizar [1], [2], [3] towards splitting fields. We ...
These notes give an introduction to the basic notions of abstract algebra, groups, rings (so far as ...
20 pagesThe formal language of Clifford's algebras is attracting an increasingly large community of ...
This classic is one of the cornerstones of modern algebraic geometry. At the same time, it is entire...
This is a survey about connections between central simple algebras and Galois representations in the...
Field theory is an area in physics with a deceptively compact notation. Although general purpose com...
Galois Theory, a wonderful part of mathematics with historical roots date back to the solution of cu...
Providing an accessible account of the theoretical foundations Covering topics not found in competin...