Unpublished Paper
Making Nöther Matrics
(2022)
Abstract
An arrow, a[I, j], in an m-polygon goes from vertex I, its source, to vertex j, its destination. It is not two dimensional in a Noether algebra. It is a non-zero term in an sXs matrix whose terms are zero with this one exception, the term in row I, column j equals 1. In my work arrows always belong to circuits. A circuit with s arrows has a given relative order such that the destination of a[I,j] is the source of the next arrow a[j,k]. The source of a[j,k] is the destination of its predecessor a[I,j]. Arrows in a circuit describe a round trip. Every arrow in an m-polygon belongs to at least one circuit. They never are alone. To show this the symbol for an arrow uses a special notation. Arrow a[I,j] in an s-circuit has the special symbol G[I,j,s].
Keywords
- Nother matric,
- circuit,
- arrow,
- Mathematical Methods
Disciplines
Publication Date
Winter February 3, 2022
Citation Information
Lester G Telser. "Making Nöther Matrics" (2022) Available at: http://works.bepress.com/lester_telser/145/