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Literatur
Agnew, R. P.: Equivalence of methods for evaluation of sequences. Proc. American Math. Soc.3, 550–556 (1952).
Chandrasekharan, K., and S. Minakshisundaram: Typical means. London: Oxford University Press 1952.
Cooke, R. G.: Infinite matrices and sequence spaces. London: MacMillan & Co. 1950.
Dikshit, G. D.: A note on absolute Riesz summability of infinite series. Proc. Nat. Inst. Sc. India26 A, No. 5, 541–544 (1960).
Hardy, G. H., and M. Riesz: The general theory of Dirichlet's series. Cambridge 1915/1952.
Jurkat, W.: Über Rieszsche Mittel mit unstetigem Parameter. Math. Z.55, 8–12 (1951).
Körle, H.-H.: Über unstetige absolute Riesz-Summierung. II. Math. Ann.177, 230–234 (1968).
Kuttner, B.: The high indices theorem for discontinuous Riesz means. J. London Math. Soc.39, 635–642 (1964).
Maddox, I. J.: Note on Riesz means. Quart. J. Math. Oxford (2)17, 263–268 (1966).
Mazur, S., and W. Orlicz: On linear methods of summability. Studia Math.14, 129–160 (1954).
Parameswaran, M. R.: On some Mercerian theorems in summability. Proc. Amer. Math. Soc.8, 968–974 (1957).
Pati, T.: On absolute summability by discrete Riesz means of type exp(n) and order 2. J. Indian Math. Soc. (N.S.)25, 27–32 (1961).
Peyerimhoff, A.: On the equivalence of continuous and discontinuous Riesz means. Proc. London Math. Soc. (3)18, 349–366 (1968).
Rado, R.: Some elementary Tauberian theorems (I). Quart. J. Math. Oxford (1)9, 274–282 (1938).
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Körle, H.H. Mercersätze für Riesz-Summierung. Math. Ann. 181, 181–188 (1969). https://doi.org/10.1007/BF01350693
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DOI: https://doi.org/10.1007/BF01350693