papers
Publications (5)
math-ph2009
Deformed squeezed states in noncommutative phase space
Bing-Sheng Lin, Si-Cong Jing
math-ph2009
A new kind of representations on noncommutative phase space
Si-Cong Jing, Bing-Sheng Lin
math-ph2013
A diagrammatic categorification of the fermion algebra
Bing-Sheng Lin, Zhi-Xi Wang, Ke Wu +1
math-ph2019
Induced entanglement entropy of harmonic oscillators in noncommutative phase space
Bing-Sheng Lin, Jian Xu, Tai-Hua Heng
The paper defines a quantum Rényi entropy using Wigner functions in a noncommutative phase space and computes the entanglement entropy of the ground state of two‑dimensional isotro…
#noncommutative geometry#entanglement entropy#harmonic oscillator#rényi entropy
math-ph2009
Deformation quantization for coupled harmonic oscillators on a general noncommutative space
Bing-Sheng Lin, Si-Cong Jing, Tai-Hua Heng