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Complete Metric Spaces Definition: Let (X,d) be a metric space. A sequence (x_n) is called Cauchy if A sequence (x_n) is called convergent if there exists an x in X such that Definition: A metric space is caled complete if every Cauchy is convergent. Definition: A subset D in topological space is dense it the X=D, the closure of D. Recall that the closure of a set is the smallest closed set containing it. Definition: In a metric space X a point x belongs to the interior of a set V if B(x,r) is contained in V for some r>0. Definition: A set D in a metric space is called nowhere dense if The closure has non-empty interior. Theorem(Baire): In a complete metric space the countable union of nowhere dense sets is again nowhere dense.
