Interpolation of Ces\`aro sequence and function spaces
Abstract
The interpolation property of Ces\`aro sequence and function spaces is investigated. It is shown that Cesp(I) is an interpolation space between Cesp0(I) and Cesp1(I) for 1 < p0 < p1 ≤ ∞ and 1/p = (1 - θ)/p0 + θ /p1 with 0 < θ < 1, where I = [0, ∞) or [0, 1]. The same result is true for Ces\`aro sequence spaces. On the other hand, Cesp[0, 1] is not an interpolation space between Ces1[0, 1] and Ces∞[0, 1].
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