Lipschitz spaces and M-ideals
Abstract
For a metric space (K,d) the Banach space (K) consists of all scalar-valued bounded Lipschitz functions on K with the norm \|f\|L=(\|f\|∞,L(f)), where L(f) is the Lipschitz constant of f. The closed subspace (K) of (K) contains all elements of (K) satisfying the -condition 0<d(x,y) 0|f(x)-f(y)|/d(x,y)=0. For K=([0,1],| · |α), 0<α<1, we prove that (K) is a proper M-ideal in a certain subspace of (K) containing a copy of ∞.
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