題目： n 2 n p (a) Find all extrema of f(x) = Σ x subject to the constraint Σ |x | = 1, k=1 k k=1 k where p > 1. (b) Prove that there exist constants a , b , depending on n, such that for any n n real vector x = (x , x ,..., x ) 1 2 n n p 1/p n 2 1/2 n p 1/p a (Σ |x | ) ≦(Σ x ) ≦b (Σ |x | ) , n k=1 k k=1 k n k=1 k where 1≦p≦2. Find optimal a and b . n n 比較有問題的是(b)小題，感覺和(a)小題有關，但我不知從何下手。請問要如何解？ 謝謝！ --

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