octave-interval 3.2.1-5build1 source package in Ubuntu
Changelog
octave-interval (3.2.1-5build1) mantic; urgency=medium * No-change rebuild against octave-abi-58 -- Graham Inggs <email address hidden> Mon, 14 Aug 2023 17:29:22 +0000
Upload details
- Uploaded by:
- Graham Inggs
- Uploaded to:
- Mantic
- Original maintainer:
- Debian Octave Group
- Architectures:
- any all
- Section:
- misc
- Urgency:
- Medium Urgency
See full publishing history Publishing
| Series | Published | Component | Section |
|---|
Downloads
| File | Size | SHA-256 Checksum |
|---|---|---|
| octave-interval_3.2.1.orig.tar.gz | 2.4 MiB | 38e526427375713229ab3d86a5fe3f5a08550747d8420541706fdea9093fdce8 |
| octave-interval_3.2.1-5build1.debian.tar.xz | 10.1 KiB | 10997db660eba9255c26144e93590c9fbf6290cf955e8e477cc835e0f31c2700 |
| octave-interval_3.2.1-5build1.dsc | 2.2 KiB | c5804faede930b5e58ad5825b59e3d423c3ccdc9855d0b7438bdd5923b743260 |
Available diffs
- diff from 3.2.1-5 (in Debian) to 3.2.1-5build1 (406 bytes)
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.
