Any strongly controllable group system or group shift or any linear block code is a linear system whose input is a generator group
Abstract
Consider any sequence of finite groups , where takes values in an integer index set . A group system is a set of sequences with components in that forms a group under componentwise addition in , for each . In the setting of group systems, a natural definition of a linear system is a homomorphism from a group of inputs to an output group system . We show that any group can be the input group of a linear system and some group system. In general the kernel of the homomorphism is nontrivial. We show that any -controllable complete group system is a linear system whose input group is a generator group , deduced from , and then the kernel is always trivial. The input set is a set of tensors, a double Cartesian product space of sets , with indices , for , and time , for . is a set of unique generator labels for the generators in with nontrivial span for the time interval . We show the generator group contains an elementary system, an infinite collection of elementary groups, one for each and , defined on small subsets of , in the shape of triangles, which form a tile like structure over . There is a homomorphism from each elementary group to any elementary group defined on smaller tiles of the former group. Any elementary system is sufficient to define a unique generator group up to isomorphism, and therefore is sufficient to construct a linear system and group system as well. Any linear block code is a strongly controllable group system. Then we can obtain new results on the structure of block codes using the generator group. There is a harmonic theory of group systems which we study using the generator group.
Cite
@article{arxiv.1709.08265,
title = {Any strongly controllable group system or group shift or any linear block code is a linear system whose input is a generator group},
author = {Kenneth M. Mackenthun},
journal= {arXiv preprint arXiv:1709.08265},
year = {2021}
}
Comments
Final editing