On the logarithmic summability $(L,1)$ of integrals on $[1,\infty)$
DOI:
https://doi.org/10.5269/bspm.50824Resumen
Moricz [Analysis (Munich) 18(1) (1998), 1-8] characterized summability (C,1) of integrals by convergence of another integral. In this work, we extend this result to logarithmic summability (L,1) of integrals.
Referencias
1. Hardy, G. H., A theorem concerning summable series, Proc. Cambridge Philosoph. Soc. 20, 304-307, (1920-21).
2. Moricz, F., Summability (C, 1) of integrals on R+, Analysis (Munich). 18(1), 1-8, (1998).
3. Moricz, F., Necessary and sufficient Tauberian conditions for the logarithmic summability of functions and sequences, Studia Math. 219(2), 109-121, (2013).
2. Moricz, F., Summability (C, 1) of integrals on R+, Analysis (Munich). 18(1), 1-8, (1998).
3. Moricz, F., Necessary and sufficient Tauberian conditions for the logarithmic summability of functions and sequences, Studia Math. 219(2), 109-121, (2013).
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Publicado
2022-12-24
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Research Articles
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