We have studied particle motion in generalized forms of noncommutative phase space, that simulate monopole and other forms of Berry curvature, that can be identified as effective internal magnetic fields, in coordinate and momentum space. The Ahranov-Bohm effect has been considered in this form of phase space, with operatorial structures of noncommutativity. The physical significance of our results is also discussed
AbstractThe Aharonov–Bohm effect on the noncommutative plane is considered. Developing the path inte...
This book provides an introduction to noncommutative geometry and presents a number of its recent ap...
Noncommutative geometry is a domain of Mathematics whose ideas have been inspired by quantum mechani...
We have studied particle motion in generalized forms of noncommutative phase space, that simulate ef...
In this paper we have studied a new Non-Commutative (NC) space with an operatorial form of noncommut...
We consider electrons in uniform external magnetic and electric fields which move on a plane whose c...
Presented at the 3rd Feynman Festival (Collage Park, Maryland, U.S.A., August 2006)International aud...
Presented at the 3rd Feynman Festival (Collage Park, Maryland, U.S.A., August 2006)International aud...
The development of Noncommutative Geometry is creating a reworking and new possibilities in physics....
The dynamics of a spin-(1/2) neutral particle possessing electric- and magnetic-dipole moments inte...
Restricting the states of a charged particle to the lowest Landau level introduces a noncommutativit...
We consider an electrically charged particle simultaneously interacting with a magnetic monopole and...
Dedicated to the memory of Julius Wess. Work presented by F. Gieres at the conference "Non-commutati...
Dedicated to the memory of Julius Wess. Work presented by F. Gieres at the conference "Non-commutati...
Dedicated to the memory of Julius Wess. Work presented by F. Gieres at the conference "Non-commutati...
AbstractThe Aharonov–Bohm effect on the noncommutative plane is considered. Developing the path inte...
This book provides an introduction to noncommutative geometry and presents a number of its recent ap...
Noncommutative geometry is a domain of Mathematics whose ideas have been inspired by quantum mechani...
We have studied particle motion in generalized forms of noncommutative phase space, that simulate ef...
In this paper we have studied a new Non-Commutative (NC) space with an operatorial form of noncommut...
We consider electrons in uniform external magnetic and electric fields which move on a plane whose c...
Presented at the 3rd Feynman Festival (Collage Park, Maryland, U.S.A., August 2006)International aud...
Presented at the 3rd Feynman Festival (Collage Park, Maryland, U.S.A., August 2006)International aud...
The development of Noncommutative Geometry is creating a reworking and new possibilities in physics....
The dynamics of a spin-(1/2) neutral particle possessing electric- and magnetic-dipole moments inte...
Restricting the states of a charged particle to the lowest Landau level introduces a noncommutativit...
We consider an electrically charged particle simultaneously interacting with a magnetic monopole and...
Dedicated to the memory of Julius Wess. Work presented by F. Gieres at the conference "Non-commutati...
Dedicated to the memory of Julius Wess. Work presented by F. Gieres at the conference "Non-commutati...
Dedicated to the memory of Julius Wess. Work presented by F. Gieres at the conference "Non-commutati...
AbstractThe Aharonov–Bohm effect on the noncommutative plane is considered. Developing the path inte...
This book provides an introduction to noncommutative geometry and presents a number of its recent ap...
Noncommutative geometry is a domain of Mathematics whose ideas have been inspired by quantum mechani...
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