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This means that for any non-negative measurable $f: { {\\mathbb R}}\\to [0,+ {\\infty})$ either the convergence set $C(f, {\\Lambda})=\\{x: s(x)<+ {\\infty} \\}= { {\\mathbb R}}$ modulo sets of Lebesgue zero, or its complement the divergence set $D(f, {\\Lambda})=\\{x: s(x)=+ {\\infty} \\}= { {\\mathbb R}}$ modulo sets of measure zero. If $ {\\Lambda}$ is not of type 1 we say that $ {\\Lambda}$ is of type 2. 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