Parallelogram substring scale: Difference between revisions
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This concept generalizes in the obvious way to arbitrary rank ''d'' (where each (''d'' - 1)-dimensional "hyperrow" is traversed lexicographically, and the first and last hyperrows must be a suffix resp. prefix of such a traversal). In this case the property is called the '''parallelotope substring property'''. | This concept generalizes in the obvious way to arbitrary rank ''d'' (where each (''d'' - 1)-dimensional "hyperrow" is traversed lexicographically, and the first and last hyperrows must be a suffix resp. prefix of such a traversal). In this case the property is called the '''parallelotope substring property'''. | ||
A parallelogram substring scale with full first and last rows is a '''parallelogram scale'''. | |||
== Ternary scales with this property == | == Ternary scales with this property == | ||