libranlip 1.0-4.2build1 source package in Ubuntu
Changelog
libranlip (1.0-4.2build1) focal; urgency=medium * No-change rebuild for libgcc-s1 package name change. -- Matthias Klose <email address hidden> Sun, 22 Mar 2020 16:46:35 +0100
Upload details
- Uploaded by:
- Matthias Klose
- Uploaded to:
- Focal
- Original maintainer:
- Juan Esteban Monsalve Tobon
- Architectures:
- any
- Section:
- math
- Urgency:
- Medium Urgency
See full publishing history Publishing
Series | Published | Component | Section | |
---|---|---|---|---|
Focal | release | universe | math |
Downloads
File | Size | SHA-256 Checksum |
---|---|---|
libranlip_1.0.orig.tar.gz | 465.9 KiB | 885ad15711a6eddc2af4ded3a7bc4a3ca864e3b4ba2952f3e0c988961a05222a |
libranlip_1.0-4.2build1.diff.gz | 3.6 KiB | f67dc45a873ff7c7439fc12ef4d0420043611d47a92d470b88033f619604f216 |
libranlip_1.0-4.2build1.dsc | 1.8 KiB | 030d6f1eefe00294d734a7094fa8b3326648d20b9b11eb4030a2651d4ce64c19 |
Available diffs
- diff from 1.0-4.2 (in Debian) to 1.0-4.2build1 (282 bytes)
Binary packages built by this source
- libranlip-dev: generates random variates with multivariate Lipschitz density
RanLip generates random variates with an arbitrary multivariate
Lipschitz density.
.
While generation of random numbers from a variety of distributions is
implemented in many packages (like GSL library
http://www.gnu. org/software/ gsl/ and UNURAN library
http://statistik. wu-wien. ac.at/unuran/), generation of random variate
with an arbitrary distribution, especially in the multivariate case, is
a very challenging task. RanLip is a method of generation of random
variates with arbitrary Lipschitz-continuous densities, which works in
the univariate and multivariate cases, if the dimension is not very
large (say 3-10 variables).
.
Lipschitz condition implies that the rate of change of the function (in
this case, probability density p(x)) is bounded:
.
|p(x)-p(y)|<M| |x-y||.
.
From this condition, we can build an overestimate of the density, so
called hat function h(x)>=p(x), using a number of values of p(x) at some
points. The more values we use, the better is the hat function. The
method of acceptance/rejection then works as follows: generatea random
variate X with density h(x); generate an independent uniform on (0,1)
random number Z; if p(X)<=Z h(X), then return X, otherwise repeat all
the above steps.
.
RanLip constructs a piecewise constant hat function of the required
density p(x) by subdividing the domain of p (an n-dimensional rectangle)
into many smaller rectangles, and computes the upper bound on p(x)
within each of these rectangles, and uses this upper bound as the value
of the hat function.
- libranlip1c2: No summary available for libranlip1c2 in ubuntu groovy.
No description available for libranlip1c2 in ubuntu groovy.