Add to ORKGTopological properties of quantum system is directly associated with the wave function. Based on the decomposition theory of gauge potential, a new comprehension of topological quantum mechanics is discussed. One shows that a topological invariant, the first Chern class, is inherent in the Schrödinger system, which is only associated with the Hopf index and Brouwer degree of the wave function. This relationship between the first Chern class and the wave function is the topological source of many topological effects in quantum system
Topological phenomena in physical systems are determined by topological structures and are thus univ...
Topological quantum phase transitions in superconductivity are discussed on two-dimensional lattices...
Motivated by the geometric character of spin Hall conductance, the topological invariants of generic...
The use of topological invariants to describe geometric phases of quantum matter has become an esse...
It is widely accepted that topological quantities are useful to describe quantum liquids in low dime...
Topological invariants, such as the Chern number, characterize topological phases of matter. Here we...
Based on the decomposition of U(1) gauge potential theory and the $\phi$-mapping topological current...
We study Chern numbers to characterize the ground state of strongly interacting systems on a lattice...
We present two modules that expand functionalities of the all-electron full-potential density functi...
One of the pillars of the scientific method is the fact that... Oh wait, it’s a different one. One o...
The origin of thermal and quantum entanglement in a class of three-dimensional spin models, at low m...
For generic time-reversal-invariant systems with spin-orbit couplings, we clarify a close relationsh...
This thesis contains work in three areas. The works are presented chronologically starting with my w...
A brief introduction to Topological Quantum Field Theory as well as a description of recent progress...
113 pagesThe concept of topology has been widely used to classify materials. Majority of works are f...
Topological phenomena in physical systems are determined by topological structures and are thus univ...
Topological quantum phase transitions in superconductivity are discussed on two-dimensional lattices...
Motivated by the geometric character of spin Hall conductance, the topological invariants of generic...
The use of topological invariants to describe geometric phases of quantum matter has become an esse...
It is widely accepted that topological quantities are useful to describe quantum liquids in low dime...
Topological invariants, such as the Chern number, characterize topological phases of matter. Here we...
Based on the decomposition of U(1) gauge potential theory and the $\phi$-mapping topological current...
We study Chern numbers to characterize the ground state of strongly interacting systems on a lattice...
We present two modules that expand functionalities of the all-electron full-potential density functi...
One of the pillars of the scientific method is the fact that... Oh wait, it’s a different one. One o...
The origin of thermal and quantum entanglement in a class of three-dimensional spin models, at low m...
For generic time-reversal-invariant systems with spin-orbit couplings, we clarify a close relationsh...
This thesis contains work in three areas. The works are presented chronologically starting with my w...
A brief introduction to Topological Quantum Field Theory as well as a description of recent progress...
113 pagesThe concept of topology has been widely used to classify materials. Majority of works are f...
Topological phenomena in physical systems are determined by topological structures and are thus univ...
Topological quantum phase transitions in superconductivity are discussed on two-dimensional lattices...
Motivated by the geometric character of spin Hall conductance, the topological invariants of generic...