Geometrical aspects of quantum computing are reviewed elementarily for nonexperts and/or graduate students who are interested in both geometry and quantum computation. We show how to treat Grassmann manifolds which are very important examples of manifolds in mathematics and physics. Some of their applications to quantum computation and its efficiency problems are shown. An interesting current topic of holonomic quantum computation is also covered. Also, some related advanced topics are discussed
A new model in topological quantum computing, named Gravitational Topological Quantum Computing (GTQ...
In this brief review we describe the idea of holonomic quantum computation. The idea of geometric ph...
We survey the growing field of Quantum Hamiltonian Complexity, which includes the study of Quantum C...
Abstract. An introduction is given to some recent developments in the dif-ferential geometry of quan...
Contemporary quantum mechanics meets an explosion of different types of quantization. Some of these ...
Abstract. This paper introduces, in a preliminary way, the beginnings of a Quantum Computational Geo...
This book collects independent contributions on current developments in quantum information theory, ...
Cette thèse a pour première vocation d’être un état de l’art sur le calcul quantique, sinon exhausti...
AbstractThe main purpose of this paper is to examine some (potential) applications of quantum comput...
Although ideas from quantum physics play an important role in many parts of modern mathematics, ther...
Research on polyhedral manifolds often points to unexpected connections between very distinct aspect...
"Combining physics, mathematics and computer science, topological quantum computation is a rapidly e...
Abstract This tutorial is the first part of a series of two articles on quantum computation. In this...
Research on polyhedral manifolds often points to unexpected connections between very distinct aspect...
Quantum computing is a system of computation that exploits the quantum-mechanical nature of reality ...
A new model in topological quantum computing, named Gravitational Topological Quantum Computing (GTQ...
In this brief review we describe the idea of holonomic quantum computation. The idea of geometric ph...
We survey the growing field of Quantum Hamiltonian Complexity, which includes the study of Quantum C...
Abstract. An introduction is given to some recent developments in the dif-ferential geometry of quan...
Contemporary quantum mechanics meets an explosion of different types of quantization. Some of these ...
Abstract. This paper introduces, in a preliminary way, the beginnings of a Quantum Computational Geo...
This book collects independent contributions on current developments in quantum information theory, ...
Cette thèse a pour première vocation d’être un état de l’art sur le calcul quantique, sinon exhausti...
AbstractThe main purpose of this paper is to examine some (potential) applications of quantum comput...
Although ideas from quantum physics play an important role in many parts of modern mathematics, ther...
Research on polyhedral manifolds often points to unexpected connections between very distinct aspect...
"Combining physics, mathematics and computer science, topological quantum computation is a rapidly e...
Abstract This tutorial is the first part of a series of two articles on quantum computation. In this...
Research on polyhedral manifolds often points to unexpected connections between very distinct aspect...
Quantum computing is a system of computation that exploits the quantum-mechanical nature of reality ...
A new model in topological quantum computing, named Gravitational Topological Quantum Computing (GTQ...
In this brief review we describe the idea of holonomic quantum computation. The idea of geometric ph...
We survey the growing field of Quantum Hamiltonian Complexity, which includes the study of Quantum C...