نبذة مختصرة : Funding Information: Open access funding provided by FCT|FCCN (b-on). Publisher Copyright: © The Author(s) 2024. ; Let X be a rearrangement-invariant space on [0, 1]. It is known that its Zippin indices β̲X,β¯X and its inclusion indices γX,δX are related as follows: 0≤β̲X≤1/γX≤1/δX≤β¯X≤1. We show that given β̲,β¯∈[0,1] and γ,δ∈[1,∞] satisfying β̲≤1/γ≤1/δ≤β¯, there exists a rearrangement-invariant space X such that β̲X=β̲, β¯X=β¯ and γX=γ, δX=δ. ; publishersversion ; published
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