In the paper is presented existence of an increasing sequence of natural numbers Mν,ν=0,1,..., such that for any ε>0 there exists a measurable set E with a measure μE>1−ε, such that for any function f∈L1[0,1] one can find a function g∈L1[0,1], which coincides with the function f on E, and for any α≠−1,−2,... the Cesaro means σMνα(x,f~), ν=0,1,..., converges to g(x) almost everywhere on [0,1].
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Physics
, 2025, Issue 1, pp. 1–10
ISSN Online: 0000-0000
DOI:
10.xxxx/example-doi