A closed-form convergence criterion for the weak greedy algorithm
Abstract
In 2002, V. N. Temlyakov established a criterion for the convergence of the weak greedy algorithm in a Hilbert space for a given weakness sequence τ= \t1,t2,…\ . The criterion requires verifying a certain limiting relation for every nonnegative square-summable sequence. We give an equivalent closed-form criterion: the weak greedy algorithm converges if and only if Σn=1∞(1+ nΣk=1ntk2 )-1/2tn2=+∞ .
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