octave-interval 3.2.0-5build1 source package in Ubuntu

Changelog

octave-interval (3.2.0-5build1) focal; urgency=medium

  * No-change rebuild for libgcc-s1 package name change.

 -- Matthias Klose <email address hidden>  Mon, 23 Mar 2020 19:16:53 +0100

Upload details

Uploaded by:
Matthias Klose on 2020-03-23
Uploaded to:
Focal
Original maintainer:
Debian Octave Group
Architectures:
any all
Section:
misc
Urgency:
Medium Urgency

See full publishing history Publishing

Series Pocket Published Component Section
Groovy release on 2020-04-24 universe misc
Focal release on 2020-03-27 universe misc

Downloads

File Size SHA-256 Checksum
octave-interval_3.2.0.orig.tar.gz 2.5 MiB 40dca588e32167484a3e9d1c77858db11f4eacb5ea92dcc37c78144fd6f91a28
octave-interval_3.2.0-5build1.debian.tar.xz 7.6 KiB 37c5225bf46634e17c6eea52c7423cd877a23c1c7c09b28410c912cfe11332da
octave-interval_3.2.0-5build1.dsc 2.2 KiB c2533b261ca5bf164ee767c660c0d08b5b1303703b76329ad7284d8ed5dfa13c

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Binary packages built by this source

octave-interval: real-valued interval arithmetic for Octave

 The interval package for real-valued interval arithmetic allows
 one to evaluate functions over subsets of their domain. All results are
 verified, because interval computations automatically keep track of any
 errors.
 .
 These concepts can be used to handle uncertainties, estimate arithmetic errors
 and produce reliable results. Also it can be applied to computer-assisted
 proofs, constraint programming, and verified computing.
 .
 The implementation is based on interval boundaries represented by binary64
 numbers and is conforming to IEEE Std 1788-2015, IEEE standard for interval
 arithmetic.
 .
 This Octave add-on package is part of the Octave-Forge project.

octave-interval-dbgsym: debug symbols for octave-interval
octave-interval-doc: real-valued interval arithmetic for Octave (arch-indep files)

 The interval package for real-valued interval arithmetic allows
 one to evaluate functions over subsets of their domain. All results are
 verified, because interval computations automatically keep track of any
 errors.
 .
 These concepts can be used to handle uncertainties, estimate arithmetic errors
 and produce reliable results. Also it can be applied to computer-assisted
 proofs, constraint programming, and verified computing.
 .
 The implementation is based on interval boundaries represented by binary64
 numbers and is conforming to IEEE Std 1788-2015, IEEE standard for interval
 arithmetic.
 .
 This Octave add-on package is part of the Octave-Forge project.
 .
 This package provides documentation in HTML format for the octave-interval
 package.