Add to ORKGGalois cohomology is an important tool in algebra that can be used to classify isomorphism classes of algebraic objects over a field. In this thesis, we show that many objects of interest in algebra can be described in cohomological terms. Some objects that we discuss include quadratic forms, Pfister forms, G-crossed product algebras, and tuples of central simple algebras. We also provide cohomological interpretation to some induced maps that naturally occur in short exact sequences.Science, Faculty ofMathematics, Department ofGraduat
Throughout number theory and arithmetic-algebraic geometry one encounters objects endowed with a nat...
AbstractWe compute the motivic cohomology groups of the simplicial motive Xθ of a Rost variety for a...
AbstractLet k be a commutative ring, let H be a k-Hopf algebra, and let A be a right H-comodule alge...
Galois cohomology is an important tool in algebra that can be used to classify isomorphism classes o...
This volume is concerned with algebraic invariants, such as the Stiefel-Whitney classes of quadratic...
AbstractGalois comodules of a coring are studied. The conditions for a simple comodule to be a Galoi...
This Thesis is brought to you for free and open access by BYU ScholarsArchive. It has been accepted ...
Galois cohomology in its current form took shape during the 1950s as a way of formulating class fiel...
Let A be an abelian category, I the full subcategory of A consisting of injective objects of A, and ...
Let A be an abelian category, I the full subcategory of A consisting of injective objects of A, and ...
Some conditions for the Galois map to be injective are given in the groupoid acting on a noncommutat...
We investigate the first two Galois cohomology groups of p-extensions over a base field which does n...
AbstractThere is a standard correspondence between elements of the cohomology group H1(F,μn) (with t...
Abstract. We study toric varieties over a field k that split in a Galois extension K/k using Galois ...
Abstract. There is a standard correspondence between elements of the cohomology group H 1 (F, µn) (w...
Throughout number theory and arithmetic-algebraic geometry one encounters objects endowed with a nat...
AbstractWe compute the motivic cohomology groups of the simplicial motive Xθ of a Rost variety for a...
AbstractLet k be a commutative ring, let H be a k-Hopf algebra, and let A be a right H-comodule alge...
Galois cohomology is an important tool in algebra that can be used to classify isomorphism classes o...
This volume is concerned with algebraic invariants, such as the Stiefel-Whitney classes of quadratic...
AbstractGalois comodules of a coring are studied. The conditions for a simple comodule to be a Galoi...
This Thesis is brought to you for free and open access by BYU ScholarsArchive. It has been accepted ...
Galois cohomology in its current form took shape during the 1950s as a way of formulating class fiel...
Let A be an abelian category, I the full subcategory of A consisting of injective objects of A, and ...
Let A be an abelian category, I the full subcategory of A consisting of injective objects of A, and ...
Some conditions for the Galois map to be injective are given in the groupoid acting on a noncommutat...
We investigate the first two Galois cohomology groups of p-extensions over a base field which does n...
AbstractThere is a standard correspondence between elements of the cohomology group H1(F,μn) (with t...
Abstract. We study toric varieties over a field k that split in a Galois extension K/k using Galois ...
Abstract. There is a standard correspondence between elements of the cohomology group H 1 (F, µn) (w...
Throughout number theory and arithmetic-algebraic geometry one encounters objects endowed with a nat...
AbstractWe compute the motivic cohomology groups of the simplicial motive Xθ of a Rost variety for a...
AbstractLet k be a commutative ring, let H be a k-Hopf algebra, and let A be a right H-comodule alge...