Dini's theorem mathematical field of analysis , Dini's theorem says that if a monotone sequence of continuous functions converges pointwise on a compact space and if the limit function is also continuous , then the convergence is uniform .Formal statement If X is a compact topological space , and is a monotonically increasing sequence of continuous real-valued functions on X which converges pointwise to a continuous function f , then the convergence is uniform. The same conclusion holds if is monotonically decreasing instead of increasing. The theorem is named after Ulisse Dini .one of the few situations in mathematics where pointwise convergence implies uniform convergence ; the key is the greater control implied by the monotonicity. The limit function must be continuous, since a uniform limit of continuous functions is necessarily continuous.Proof Let ε > 0 be given. For each n , let g n f − f n E n x ∈ X such that g n g n E n open . Since is monotonically increasing , is monotonically decreasing, it follows that the sequence E n ascending . Since f n f , it follows that the collection is an open cover of X . By compactness, there is a finite subcover , and since E n positive integer N such that E N X . That is, if n > N and x is a point in X , then |f − f n
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