Structure-preserving numerical schemes for Lindblad equations
Publication
, Journal Article
Cao, Y; Lu, J
March 1, 2021
We study a family of structure-preserving deterministic numerical schemes for Lindblad equations. This family of schemes has a simple form and can systemically achieve arbitrary high-order accuracy in theory. Moreover, these schemes can also overcome the non-physical issues that arise from many traditional numerical schemes. Due to their preservation of physical nature, these schemes can be straightforwardly used as backbones for further developing randomized and quantum algorithms in simulating Lindblad equations. In this work, we systematically study these methods and perform a detailed error analysis, which is validated through numerical examples.
Duke Scholars
Publication Date
March 1, 2021
Citation
APA
Chicago
ICMJE
MLA
NLM
Cao, Y., & Lu, J. (2021). Structure-preserving numerical schemes for Lindblad equations.
Cao, Yu, and Jianfeng Lu. “Structure-preserving numerical schemes for Lindblad equations,” March 1, 2021.
Cao Y, Lu J. Structure-preserving numerical schemes for Lindblad equations. 2021 Mar 1;
Cao, Yu, and Jianfeng Lu. Structure-preserving numerical schemes for Lindblad equations. Mar. 2021.
Cao Y, Lu J. Structure-preserving numerical schemes for Lindblad equations. 2021 Mar 1;
Publication Date
March 1, 2021