Abstract. We consider the summability of orthogonal series (OS) $\sum c_nf_n(x)$, $f_n\in L^2[0,1]$, $\{c_n\} \in l^2$, by the generalized methods of the summatorial function $(SF^*,\varphi,\lambda )$. We prove a theorem on a condition sufficient for the absolute summability of OS a.e. by these methods. This theorem is an analogue of the theorem on Ces?ro methods in \cite8 and also a generalization of one of the author's theorems in [11]. Applications to the particular methods of the form $(SF^*,\varphi,\lambda )$ are indicated, including the Riesz and the Bernstein--Rogosinski methods.
AMS Subject Classification
(1991): 42C15
Received May 23, 1998. (Registered under 3309/2009.)
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