bijective |
nonbijective |
As adjectives the difference between bijective and nonbijective
is that
bijective is (mathematics|of a map) both injective and surjective while
nonbijective is not bijective.
bijective |
antiunitary |
As adjectives the difference between bijective and antiunitary
is that
bijective is both injective and surjective while
antiunitary is describing a bijective antilinear mapping.
As a noun antiunitary is
any antiunitary operator.
bijective |
biholomorphism |
As an adjective bijective
is (mathematics|of a map) both injective and surjective.
As a noun biholomorphism is
(mathematics) a bijective holomorphism whose inverse is also holomorphic.
bijective |
bijectivity |
As an adjective bijective
is both injective and surjective.
As a noun bijectivity is
the state or quality of being bijective.
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