Poisson-ergmReference: Poisson-reference ERGM
In ergm.count: Fit, Simulate and Diagnose Exponential-Family Models for Networks with Count Edges
Poisson-ergmReference R Documentation
Poisson-reference ERGM
Description
Specifies each
dyad's baseline distribution to be Poisson with mean 1:
h(y)=∏_{i,j} 1/y_{i,j}! , with the support of
y_{i,j} being natural numbers (and 0 ). Using
valued ERGM terms that are
"generalized" from their binary counterparts, with form
"sum" (see previous link for the list) produces Poisson
regression. Using CMP induces a
Conway-Maxwell-Poisson distribution that is Poisson when its
coefficient is 0 and geometric when its coefficient is
1 .
@details Three proposal functions are currently implemented, two of them
designed to improve mixing for sparse networks. They can can be
selected via the MCMC.prop.weights= control parameter. The
sparse proposals work by proposing a jump to 0. Both of them take
an optional proposal argument p0 (i.e.,
MCMC.prop.args=list(p0=...) ) specifying the probability of
such a jump. However, the way in which they implement it are
different:
-
"random": Select a dyad (i,j) at random, and draw the
proposal y_{i,j}^\star \sim \mathrm{Poisson}_{\ne
y_{i,j}}(y_{i,j}+0.5) (a Poisson distribution with mean
slightly higher than the current value and conditional on not
proposing the current value).
-
"0inflated": As "random" but, with
probability p0 , propose a jump to 0 instead of a
Poisson jump (if not already at 0). If p0 is not given,
defaults to the "surplus" of 0s in the observed network,
relative to Poisson.
-
"TNT": (the default) As "0inflated" but
instead of selecting a dyad at random, select a tie with
probability p0 , and a random dyad otherwise, as with
the binary TNT. Currently, p0 defaults to 0.2.
Usage
# Poisson
See Also
ergmReference for index of reference distributions currently visible to the package.
ergm.count documentation built on May 25, 2022, 9:06 a.m.
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| Poisson-ergmReference | R Documentation |
Poisson-reference ERGM
Description
Specifies each
dyad's baseline distribution to be Poisson with mean 1:
h(y)=∏_{i,j} 1/y_{i,j}! , with the support of
y_{i,j} being natural numbers (and 0 ). Using
valued ERGM terms that are
"generalized" from their binary counterparts, with form
"sum" (see previous link for the list) produces Poisson
regression. Using CMP induces a
Conway-Maxwell-Poisson distribution that is Poisson when its
coefficient is 0 and geometric when its coefficient is
1 .
@details Three proposal functions are currently implemented, two of them
designed to improve mixing for sparse networks. They can can be
selected via the MCMC.prop.weights= control parameter. The
sparse proposals work by proposing a jump to 0. Both of them take
an optional proposal argument p0 (i.e.,
MCMC.prop.args=list(p0=...) ) specifying the probability of
such a jump. However, the way in which they implement it are
different:
-
"random": Select a dyad (i,j) at random, and draw the proposal y_{i,j}^\star \sim \mathrm{Poisson}_{\ne y_{i,j}}(y_{i,j}+0.5) (a Poisson distribution with mean slightly higher than the current value and conditional on not proposing the current value). -
"0inflated": As"random"but, with probabilityp0, propose a jump to 0 instead of a Poisson jump (if not already at 0). Ifp0is not given, defaults to the "surplus" of 0s in the observed network, relative to Poisson. -
"TNT": (the default) As"0inflated"but instead of selecting a dyad at random, select a tie with probabilityp0, and a random dyad otherwise, as with the binary TNT. Currently,p0defaults to 0.2.
Usage
# Poisson
See Also
ergmReference for index of reference distributions currently visible to the package.
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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