Quantum causal inference in the presence of hidden common causes: An entropic approach
APA
Javidian, M.A. (2023). Quantum causal inference in the presence of hidden common causes: An entropic approach. Perimeter Institute. https://pirsa.org/23040133
MLA
Javidian, Mohammad Ali. Quantum causal inference in the presence of hidden common causes: An entropic approach. Perimeter Institute, Apr. 18, 2023, https://pirsa.org/23040133
BibTex
@misc{ pirsa_PIRSA:23040133, doi = {10.48660/23040133}, url = {https://pirsa.org/23040133}, author = {Javidian, Mohammad Ali}, keywords = {Quantum Foundations}, language = {en}, title = {Quantum causal inference in the presence of hidden common causes: An entropic approach}, publisher = {Perimeter Institute}, year = {2023}, month = {apr}, note = {PIRSA:23040133 see, \url{https://pirsa.org}} }
Appalachian State University
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Abstract
Quantum causality is an emerging field of study which has the potential to greatly advance our understanding of quantum systems. In this paper, we put forth a theoretical framework for merging quantum information science and causal inference by exploiting entropic principles. For this purpose, we leverage the tradeoff between the entropy of hidden cause and the conditional mutual information of observed variables to develop a scalable algorithmic approach for inferring causality in the presence of latent confounders (common causes) in quantum systems. As an application, we consider a system of three entangled qubits and transmit the second and third qubits over separate noisy quantum channels. In this model, we validate that the first qubit is a latent confounder and the common cause of the second and third qubits. In contrast, when two entangled qubits are prepared and one of them is sent over a noisy channel, there is no common confounder. We also demonstrate that the proposed approach outperforms the results of classical causal inference for the Tubingen database when the variables are classical by exploiting quantum dependence between variables through density matrices rather than joint probability distributions.