TY - JOUR
T1 - A functional analytic approach to Cesàro mean
AU - Kunisada, Ryoichi
PY - 2019/1/1
Y1 - 2019/1/1
N2 - We study the class P of positive linear functionals φ on L∞([1,∞)) for which φ(f)=α if [Formula presented]. The semigroup of translations f(x)↦f(rx) on L∞([1,∞)), where r∈[1,∞), plays a crucial role in the study of P. In particular, we give three different expressions of their extremal values, which can be considered main results of this paper. We also study linear functionals on l∞, the set of all real-valued bounded functions on natural numbers N, which extend Cesàro mean and give similar results about their extremal values, including a functional analytic proof of the classical result of Pólya.
AB - We study the class P of positive linear functionals φ on L∞([1,∞)) for which φ(f)=α if [Formula presented]. The semigroup of translations f(x)↦f(rx) on L∞([1,∞)), where r∈[1,∞), plays a crucial role in the study of P. In particular, we give three different expressions of their extremal values, which can be considered main results of this paper. We also study linear functionals on l∞, the set of all real-valued bounded functions on natural numbers N, which extend Cesàro mean and give similar results about their extremal values, including a functional analytic proof of the classical result of Pólya.
KW - Cesàro mean
KW - Density measures
KW - Pólya density
KW - Stone–Čech compactification
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U2 - 10.1016/j.indag.2019.05.005
DO - 10.1016/j.indag.2019.05.005
M3 - Article
AN - SCOPUS:85066327084
SN - 0019-3577
JO - Indagationes Mathematicae
JF - Indagationes Mathematicae
ER -