The approximation numbers of Hardy--type operators on trees

Abstract

The Hardy operator Ta on a tree is defined by \[(Taf)(x):=v(x) ∫xa u(t)f(t) dt for a, x∈ . \] Properties of Ta as a map from Lp() into itself are established for 1 p ∞. The main result is that, with appropriate assumptions on u and v, the approximation numbers an(Ta) of Ta satisfy \[ (*) n ∞ nan(Ta) = αp∫ |uv|dt \] for a specified constant αp and 1<p<∞. This extends results of Naimark, Newman and Solomyak for p=2. Hitherto, for p≠ 2, (*) was unknown even when is an interval. Also, upper and lower estimates for the lq and weak-lq norms of \an(Ta)\ are determined.

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