equivalence relations การใช้

• This equivalence relation is a semigroup congruence, as defined above.
• The affine concept of parallelism forms an equivalence relation on lines.
• Binary relations that are both reflexive and Euclidean are equivalence relations.
• This defines an equivalence relation on the set of almost homomorphisms.
• Since x \ sim _ j y is an equivalence relation.
• For example, an equivalence relation possesses cycles but is transitive.
• Any homomorphism defines an equivalence relation on by if and only if.
• Like any equivalence relation, a semigroup congruence \ sim induces congruence classes
• In the next step, one imposes a set of equivalence relations.
• This equivalence relation is an abstraction of the germ equivalence described above.
• Similarity is an equivalence relation, but it is coarser than bisimilarity.
• Reparametrization defines an equivalence relation on the set of all parametric curves.
• In particular being isogenous is an equivalence relation between tori.
• This relation is an equivalence relation on the set of functions of.
• This gives a natural equivalence relation on the set of smooth atlases.
• An equivalence relation is a binary relation that is transitive.
• Two equivalence relations between geometric figures were used : similarity.
• You might like to read the article on equivalence relations.
• Then the dualities are equivalence relations within the parameter space.
• The homeomorphisms form an equivalence relation on the class of all topological spaces.