- libgf-complete1 (= 1.0.2+2017.04.10.git.ea75cdf-3+b1)
Galois Field arithmetic forms the backbone of erasure-coded storage systems,
most famously the Reed-Solomon erasure code. A Galois Field is defined over
w-bit words and is termed GF(2w). As such, the elements of a Galois Field are
the integers 0, 1, . . ., 2^w − 1. Galois Field arithmetic defines addition
and multiplication over these closed sets of integers in such a way that they
work as you would hope they would work. Specifically, every number has a
unique multiplicative inverse. Moreover, there is a value, typically the value
2, which has the property that you can enumerate all of the non-zero elements
of the field by taking that value to successively higher powers.
.
This package contains the development files needed to build against the shared
library.
Installed Size: 28.7 kB
Architectures: arm64 amd64