Whitney Conditions
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High Quality Content by WIKIPEDIA articles! In differential topology, a branch of mathematics, the Whitney conditions are conditions on a pair of submanifolds of a manifold introduced by Hassler Whitney in 1965. A finite filtration by closed subsets Fi of a smooth manifold such that the difference between successive members Fi and F(i 1) of the filtration is either empty or a smooth submanifold of dimension i, is called a stratification. The connected components of the difference Fi F(i 1) are the strata of dimension i. A stratification is called a Whitney stratification if all pairs of strata...
High Quality Content by WIKIPEDIA articles! In differential topology, a branch of mathematics, the Whitney conditions are conditions on a pair of submanifolds of a manifold introduced by Hassler Whitney in 1965. A finite filtration by closed subsets Fi of a smooth manifold such that the difference between successive members Fi and F(i 1) of the filtration is either empty or a smooth submanifold of dimension i, is called a stratification. The connected components of the difference Fi F(i 1) are the strata of dimension i. A stratification is called a Whitney stratification if all pairs of strata satisfy the Whitney conditions A and B, as defined below.
