graphID.nonHtcID: Check for generic infinite-to-one via the half-trek...
In SEMID: Identifiability of Linear Structural Equation Models
graphID.nonHtcID R Documentation
Check for generic infinite-to-one via the half-trek criterion.
Description
Checks if a mixed graph is infinite-to-one using the half-trek criterion
presented by Foygel, Draisma, and Drton (2012).
Usage
graphID.nonHtcID(L, O)
Arguments
L
Adjacency matrix for the directed part of the path
diagram/mixed graph; an edge pointing from i to j is encoded as L[i,j]=1 and
the lack of an edge between i and j is encoded as L[i,j]=0. There should be
no directed self loops, i.e. no i such that L[i,i]=1.
O
Adjacency matrix for the bidirected part of the path diagram/mixed
graph. Edges are encoded as for the L parameter. Again there should be no
self loops. Also this matrix will be coerced to be symmetric so it is only
necessary to specify an edge once, i.e. if O[i,j]=1 you may, but are not
required to, also have O[j,i]=1.
Value
TRUE if the graph could be determined to be generically
non-identifiable, FALSE if this test was inconclusive.
References
Foygel, R., Draisma, J., and Drton, M. (2012) Half-trek criterion for
generic identifiability of linear structural equation models.
Ann. Statist. 40(3): 1682-1713.
SEMID documentation built on July 26, 2023, 5:40 p.m.
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| graphID.nonHtcID | R Documentation |
Check for generic infinite-to-one via the half-trek criterion.
Description
Checks if a mixed graph is infinite-to-one using the half-trek criterion presented by Foygel, Draisma, and Drton (2012).
Usage
graphID.nonHtcID(L, O)
Arguments
L |
Adjacency matrix for the directed part of the path diagram/mixed graph; an edge pointing from i to j is encoded as L[i,j]=1 and the lack of an edge between i and j is encoded as L[i,j]=0. There should be no directed self loops, i.e. no i such that L[i,i]=1. |
O |
Adjacency matrix for the bidirected part of the path diagram/mixed graph. Edges are encoded as for the L parameter. Again there should be no self loops. Also this matrix will be coerced to be symmetric so it is only necessary to specify an edge once, i.e. if O[i,j]=1 you may, but are not required to, also have O[j,i]=1. |
Value
TRUE if the graph could be determined to be generically non-identifiable, FALSE if this test was inconclusive.
References
Foygel, R., Draisma, J., and Drton, M. (2012) Half-trek criterion for generic identifiability of linear structural equation models. Ann. Statist. 40(3): 1682-1713.
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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