Author
Listed:
- Weihs Luca
(Statistics, University of Washington, Box 354322, Seattle, USA)
- Robinson Bill
(Mathematics, Denison University, Granville, Ohio, USA)
- Dufresne Emilie
(University of Nottingham, Nottingham, UK)
- Kenkel Jennifer
(Mathematics, University of Utah, Salt Lake City, USA)
- Kubjas Reginald McGee II Kaie
(Mathematics and Systems Analysis, Aalto University, Espoo, Finland)
- Reginald McGee II
(Mathematical Biosciences Institute, Columbus, USA)
- Nguyen Nhan
(Department of Mathematics, University of Montana, Missoula, USA)
- Robeva Elina
(Department of Mathematics, Massachusetts Institute of Technology, Cambridge, USA)
- Drton Mathias
(Statistics, University of Washington, Seattle, USA)
Abstract
Linear structural equation models relate the components of a random vector using linear interdependencies and Gaussian noise. Each such model can be naturally associated with a mixed graph whose vertices correspond to the components of the random vector. The graph contains directed edges that represent the linear relationships between components, and bidirected edges that encode unobserved confounding. We study the problem of generic identifiability, that is, whether a generic choice of linear and confounding effects can be uniquely recovered from the joint covariance matrix of the observed random vector. An existing combinatorial criterion for establishing generic identifiability is the half-trek criterion (HTC), which uses the existence of trek systems in the mixed graph to iteratively discover generically invertible linear equation systems in polynomial time. By focusing on edges one at a time, we establish new sufficient and new necessary conditions for generic identifiability of edge effects extending those of the HTC. In particular, we show how edge coefficients can be recovered as quotients of subdeterminants of the covariance matrix, which constitutes a determinantal generalization of formulas obtained when using instrumental variables for identification. While our results do not completely close the gap between existing sufficient and necessary conditions we find, empirically, that our results allow us to prove the generic identifiability of many more mixed graphs than the prior state-of-the-art.
Suggested Citation
Weihs Luca & Robinson Bill & Dufresne Emilie & Kenkel Jennifer & Kubjas Reginald McGee II Kaie & Reginald McGee II & Nguyen Nhan & Robeva Elina & Drton Mathias, 2018.
"Determinantal Generalizations of Instrumental Variables,"
Journal of Causal Inference, De Gruyter, vol. 6(1), pages 1-21, March.
Handle:
RePEc:bpj:causin:v:6:y:2018:i:1:p:21:n:1
DOI: 10.1515/jci-2017-0009
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