Need to find a functor T : Set &#x2192;<!-- → --> Set such that Alg(T) is concretely

Wisniewool

Wisniewool

Answered question

2022-07-09

Need to find a functor T : Set Set such that Alg(T) is concretely isomorphic to the category of commutative binary algebras.
The first idea is that the functor is likely to map object X O b ( to the X × X because then we have to get a binary algebra, i.e., the operation X × X X, which have to be commutative.
So the question (if these thoughts are right) is: how to map X to X × X to get later a commutative binary algebra?

Answer & Explanation

talhekh

talhekh

Beginner2022-07-10Added 15 answers

Hint: Giving a function f : A / ε B from a quotient set A / ε is the same as giving a function f ¯ : A B that satisfies a ε a 1     f ( a ) = f ( a 1 ).
Apply this for A = X × X and a suitable equivalence relation ε on it.

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