Show that if Y is compact, then the projection 11 : X Y → X is a closed map. Theorem. Let f :X + Y; let Y be compact Hau

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Show That If Y Is Compact Then The Projection 11 X Y X Is A Closed Map Theorem Let F X Y Let Y Be Compact Hau 1 (60.14 KiB) Viewed 21 times

Show that if Y is compact, then the projection 11 : X Y → X is a closed map. Theorem. Let f :X + Y; let Y be compact Hausdorff. Then f is continuous if and only if the graph of f, Gf = {x x f(x) | X e X}, is closed in X x Y. (Hint: If Gf is closed and V is a neighborhood of f(xo), then the intersection of G f and X ~ (Y – V) is closed. Apply the previous exercise.]