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Что (кто) такое purely inseparable expansion - определение
Purely inseparable field extension; Purely inseparable; Radicial extension; Purely inseparable extensions; Modular extension
Purely inseparable extension
In algebra, a purely inseparable extension of fields is an extension k ⊆ K of fields of characteristic p > 0 such that every element of K is a root of an equation of the form xq = a, with q a power of p and a in k. Purely inseparable extensions are sometimes called radicial extensions, which should not be confused with the similar-sounding but more general notion of radical extensions.
Computably inseparable
IN COMPUTABILITY THEORY, PAIRS OF SETS OF NATURAL NUMBERS THAT CANNOT BE "SEPARATED" WITH A RECURSIVE SET
Effectively separable; Effectively separable set; Effectively separable sets; Effectively inseparable; Effectively inseparable sets; Recursively separable sets; Recursively separable; Recursively inseparable; Recursive inseparability; Recursively inseparable sets
In computability theory, two disjoint sets of natural numbers are called computably inseparable or recursively inseparable if they cannot be "separated" with a computable set.Monk 1976, p.
Laplace expansion
N×N DETERMINANT AS SUM OF N MINORS WEIGHTED BY COFACTOR FROM ROW AND COLUMN NOT IN MINOR
Determinant expansion; Expansion by minors; Cofactor expansion
In linear algebra, the Laplace expansion, named after Pierre-Simon Laplace, also called cofactor expansion, is an expression of the determinant of an matrix as a weighted sum of minors, which are the determinants of some submatrices of . Specifically, for every ,
Википедия
Purely inseparable extension
In algebra, a purely inseparable extension of fields is an extension k ⊆ K of fields of characteristic p > 0 such that every element of K is a root of an equation of the form xq = a, with q a power of p and a in k. Purely inseparable extensions are sometimes called radicial extensions, which should not be confused with the similar-sounding but more general notion of radical extensions.
