Some inclusion theorems
Glasgow mathematical journal, Tome 6 (1964) no. 4, pp. 161-168

Voir la notice de l'article provenant de la source Cambridge University Press

1. A number of inclusion theorems have been given in connection with methods of summation which include the Riesz method (R, λ, κ). Lorentz [4, Theorem 10] gives necessary and sufficient conditions for a sequence to sequence regular matrix A = (an, v) to be such that A ⊃ (R, λ, 1)†. He imposes restrictions on the sequence { λn}, so that A does not include all Riesz methods of order 1. In Theorem 1 below, we generalize the Lorentz theorem by giving a condition without restriction on λn, If the matrix A is a series to sequence or series to function regular matrix, there do not appear to be any results concerning the general inclusionA ⊃ (R, λ, κ).However, when A is the Riemann method (R, λ, μ), Russell [7], generalizing earlier results, has given sufficient conditions for (R, λ, μ) ⊃ (R, λ, κ). Our Theorem 2 gives necessary and sufficient conditions for A ⊃ (R, λ, 1), where A satisfies the condition an, v → 1 (n →co, ν fixed). Thus Theorem 2 applies to any series to sequence regular matrix A. In Theorem 3 we give a further representation for matrices A which include (R, λ, 1), and finally make some remarks on the problem of characterizing matrices which include Riesz methods of any positive order κ.
Maddox, I. J. Some inclusion theorems. Glasgow mathematical journal, Tome 6 (1964) no. 4, pp. 161-168. doi: 10.1017/S204061850003495X
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