Ces\`aro summability of Taylor series in higher order weighted Dirichlet type spaces
Abstract
For a positive integer m and a finite non-negative Borel measure μ on the unit circle, we study the Hadamard multipliers of higher order weighted Dirichlet-type spaces Hμ, m. We show that if α>12, then for any f in Hμ, m, the sequence of generalized Ces\`aro sums \σnα[f]\ converges to f. We further show that if α=12 then for the Dirac delta measure supported at any point on the unit circle, the previous statement breaks down for every positive integer m.
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