The theory of algebraic varieties gives an algebraic interpretation of differential geometry, thus of our physical world. To treat, among other physical properties, the theory of entanglement, we need to generalize the space parametrizing the objects of physics. We do this by introducing noncommutative varieties
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
This book presents four lectures on recent research in commutative algebra and its applications to a...
We construct the elliptic Painlevé equation and its higher dimensional analogs as the action of line...
Ordinary commutative algebraic geometry is based on commutative polynomial algebras over an algebrai...
This is the author’s final, accepted and refereed manuscript to the articleThere has been several at...
There has been several attempts to generalize commutative algebraic geometry to the noncommutative s...
We investigate three topics that are motivated by the study of polynomial equations in noncommutativ...
Several classes of *-algebras associated to the action of an affine transformation are considered, a...
In this article, we define a non-commutative deformation of the "symplectic invariants" of an algebr...
One of the leading ideas of noncommutative geometry is to consider noncommutative algebras as algebr...
This book aims at giving an account with complete proofs of the results and techniques which are ne...
This book aims at giving an account with complete proofs of the results and techniques which are ne...
We develop noncommutative field theory, starting from a very basic background and explore recent and...
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
This book presents four lectures on recent research in commutative algebra and its applications to a...
We construct the elliptic Painlevé equation and its higher dimensional analogs as the action of line...
Ordinary commutative algebraic geometry is based on commutative polynomial algebras over an algebrai...
This is the author’s final, accepted and refereed manuscript to the articleThere has been several at...
There has been several attempts to generalize commutative algebraic geometry to the noncommutative s...
We investigate three topics that are motivated by the study of polynomial equations in noncommutativ...
Several classes of *-algebras associated to the action of an affine transformation are considered, a...
In this article, we define a non-commutative deformation of the "symplectic invariants" of an algebr...
One of the leading ideas of noncommutative geometry is to consider noncommutative algebras as algebr...
This book aims at giving an account with complete proofs of the results and techniques which are ne...
This book aims at giving an account with complete proofs of the results and techniques which are ne...
We develop noncommutative field theory, starting from a very basic background and explore recent and...
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
Noncommutative geometry extends the traditional connections between algebra and geometry beyond the ...
This book presents four lectures on recent research in commutative algebra and its applications to a...
We construct the elliptic Painlevé equation and its higher dimensional analogs as the action of line...
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