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Im kinda struggling to understand the concept of minimal cover so i want to know if i got it right, Is it true to say that :

Given a Relation R with attributes A1...An

if G is a minimal cover of FDs set F then for every subset X of attributes in R the closure of X in F, is the same as the closure of X in G.

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up vote 2 down vote accepted

In terms of closure you're right, you can see it as a semplification of a series of FDs: if you have F = {A->B, B->C, A->C} the FD A->C is redudant because it could be derived from the first two FDs. In this case the minimal cover G for F is {A->B, B->C}.

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