Error of Tikhonov's regularization for integral convolution equations
Abstract
Let ϕ be a nontrivial function of L1(). For each s≥ 0 we put eqnarray* p(s)=- ∫|t|≥ s|ϕ(t)|dt. eqnarray* If ϕ satisfies equation s ∞p(s)s=∞ ,170506.1 equation we obtain asymptotic estimates of the size of small-valued sets Bε=\x∈ : |ϕ(x)|≤ ε, |x|≤ Rε\ of Fourier transform eqnarray* ϕ(x)=∫-∞∞e-ixtϕ(t)dt, x∈ , eqnarray* in terms of p(s) or in terms of its Young dual function eqnarray* p*(t)=s≥ 0[st-p(s)], t≥ 0. eqnarray* Applying these results, we give an explicit estimate for the error of Tikhonov's regularization for the solution f of the integral convolution equation eqnarray* ∫-∞∞f(t-s)ϕ(s)ds =g(t), eqnarray* where f,g ∈ L2() and ϕ is a nontrivial function of L1() satisfying condition (170506.1), and g,ϕ are known non-exactly. Also, our results extend some results of tld and tqd.
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