![[Back]](/images/prevpage.gif)
![[Index]](/images/index.gif)
![[Help]](/images/help.gif)
![[MSI]](/images/msi.gif)
![[ANU Online]](/images/online.gif)
Research Report SRR01-002
Joint response graphs and separation induced by triangular systems
Nanny Wermuth and D.R. Cox
Abstract:
Probability distributions generated over a directed acyclic graph are
considered here as what we call triangular systems. The graph captures
the independence structure of the system. In econometrics, linear
triangular systems have been called univariate recursive equations
with uncorrelated residuals. Separation results provide criteria for
deciding whether any chosen conditional independence statement is
implied by a given independence graph. We state and prove separation in
triangular systems as block-diagonality of a part of the edge matrix
of the generating graph, having been transformed in a particular
way. For the proof we derive a matrix result for orthogonalising
weighted sums of variables. We apply the result also to orthogonalise
blocks of vector variables defined for linear triangular systems to
obtain corresponding edge matrices of what we call joint response
graphs. The results for transforming the edge matrix in a linear
triangular system hold for all Gaussian distributions generated over
the given directed acyclic graph and imply factorizations of densities
in marginal and conditional distributions. As a consequence of such
factorization properties the results are shown to apply in unchanged
form to any joint probability distribution generated over the same
directed acyclic graph. There is thus an essential equivalence between
various matrix transformations and graphical properties. Use of the
former may be considerably more direct for complex graphs.
This service is maintained by the
Mathematical Sciences Institute (MSI)
Comments to
webmaster@maths.anu.edu.au
URL: http://wwwmaths.anu.edu.au/