We prove that a local version of Khintchine inequality holds for arbitrary rearrangement invariant (r.i.) spaces on an non-empty open set $$E\subset [0,1]$$E⊂[0,1]. For this, we give a definition of… Click to show full abstract
We prove that a local version of Khintchine inequality holds for arbitrary rearrangement invariant (r.i.) spaces on an non-empty open set $$E\subset [0,1]$$E⊂[0,1]. For this, we give a definition of local r.i. space which is compatible with the notion of systems equivalent in distribution and prove that the Rademacher system $$(r_{k+N})_{k=1}^\infty $$(rk+N)k=1∞ on an non-empty open set E is equivalent in distribution to $$(r_k)_{k=1}^\infty $$(rk)k=1∞ on [0, 1], with N depending on E. The result can be generalized to a wider class of sets.
               
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