On negative results concerning weak-Hardy means
Abstract
We establish the test which allows to show that a mean does not admit a weak-Hardy property. As a result we prove that Hardy and weak-Hardy properties are equivalent in the class of homogeneous, symmetric, repetition invariant, and Jensen concave mean on R+. More precisely, for every mean M n=1∞ R+n R as above, the inequality M(a1)+M(a1,a2)+…<∞ holds for all a ∈ 1(R+) if and only if there exists a positive, real constant C (depending only on M) such that M(a1)+M(a1,a2)+…<C · (a1+a2+·s) for every sequence a ∈ 1(R+).
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