In this paper we provide a complete description of linear biseparating maps between spaces lip0(X^a, E) of Banach-valued little Lipschitz functions vanishing at infinity on locally com-pact HSlder metric spaces X^a=...In this paper we provide a complete description of linear biseparating maps between spaces lip0(X^a, E) of Banach-valued little Lipschitz functions vanishing at infinity on locally com-pact HSlder metric spaces X^a=(X,dx^a) with 0〈a〈1.Namely, it is proved that any linear bijection T : lip0(X^a,E)→lip0(Y^a,F)satisfying that ||Tf(y)||F||Tg(y)||F= 0 for all y ∈ Y if and only if ||f(x)||E||g(x)||E=0 for all x E X, is a weighted composition operator of the form Tf(y) = h(y)(f(φ(y))), where φ is a homeomorphism from Y onto X and h is a map from Y into the set of all linear bijections from E onto F. Moreover, T is continuous if and only if h(y) is continuous for all y ∈ Y. In this case, φ becomes a locally Lipschitz homeomorphism and h a locally Lipschitz map from Y^a into the space of all continuous linear bijections from E onto F with the metric induced by the operator canonical norm. This enables us to study the automatic continuity of T and the existence of discontinuous linear biseparating maps.展开更多
基金supported by Junta de Andalucia grants FQM-1438 and FQM-3737
文摘In this paper we provide a complete description of linear biseparating maps between spaces lip0(X^a, E) of Banach-valued little Lipschitz functions vanishing at infinity on locally com-pact HSlder metric spaces X^a=(X,dx^a) with 0〈a〈1.Namely, it is proved that any linear bijection T : lip0(X^a,E)→lip0(Y^a,F)satisfying that ||Tf(y)||F||Tg(y)||F= 0 for all y ∈ Y if and only if ||f(x)||E||g(x)||E=0 for all x E X, is a weighted composition operator of the form Tf(y) = h(y)(f(φ(y))), where φ is a homeomorphism from Y onto X and h is a map from Y into the set of all linear bijections from E onto F. Moreover, T is continuous if and only if h(y) is continuous for all y ∈ Y. In this case, φ becomes a locally Lipschitz homeomorphism and h a locally Lipschitz map from Y^a into the space of all continuous linear bijections from E onto F with the metric induced by the operator canonical norm. This enables us to study the automatic continuity of T and the existence of discontinuous linear biseparating maps.
