Multiplicative distance
In algebraic geometry, μ {\displaystyle \mu } is said to be a multiplicative distance function over a field if it satisfies μ ( A B ) > 1. {\displaystyle \mu (AB)>1.\,} AB is congruent to A'B' iff μ ( A B ) = μ ( A ′ B ′ ) .
In algebraic geometry, μ {\displaystyle \mu } is said to be a multiplicative distance function over a field if it satisfies μ ( A B ) > 1. {\displaystyle \mu (AB)>1.\,} AB is congruent to A'B' iff μ ( A B ) = μ ( A ′ B ′ ) .
In algebraic geometry, μ {\displaystyle \mu } is said to be a multiplicative distance function over a field if it satisfies μ ( A B ) > 1. {\displaystyle \mu (AB)>1.\,} AB is congruent to A'B' iff μ ( A B ) = μ ( A ′ B ′ ) .
Source: Wikipedia "Multiplicative distance" · CC BY-SA 4.0
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