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In mathematics, a complete set of invariants for a classification problem is a collection of maps more...

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$\"f_i :$

(where X is the collection of objects being classified, up to some equivalence relation, and the $Y i$ are some sets), such that $x$ ∼ $x'$ if and only if $f i (x) = f i (x')$ for all i. In words, such that two objects are equivalent if and only if all invariants are equal.

Symbolically, a complete set of invariants is a collection of maps such that

$\"\prod$

is injective.

Examples

In the classification of two-dimensional closed manifolds, Euler characteristic (or genus) and orientability are a complete set of invariants.; Jordan normal form of a matrix is a complete invariant for matrices up to conjugation, but eigenvalues (with multiplicities) are not.;

Realizability of invariants

A complete set of invariants does not immediately yield a classification theorem: not all combinations of invariants may be realized. Symbolically, one must also determine the image of

$\"\prod$

Read more at Wikipedia.org


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