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Eurasian Mathematical Journal, 2010, Volume 1, Number 1, Pages 137–146
(Mi emj11)
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This article is cited in 7 scientific papers (total in 7 papers)
Equiconvergence theorems for Sturm–Lioville operators with singular potentials (rate of equiconvergence in $W_2^\theta$-norm)
I. V. Sadovnichaya Faculty of Computational Mathematics and Cybernetics, M. V. Lomonosov Moscow State University, Moscow, Russia
Abstract:
We study the Sturm–Liouville operator $Ly=l(y)=-\dfrac{d^2y}{dx^2}+q(x)y$ with Dirichlet boundary conditions $y(0)=y(\pi)=0$ in the space $L_2[0,\pi]$. We assume that the potential has the form $q(x)=u'(x)$, where $u\in W_2^{\theta}[0,\pi]$ with $0<\theta<1/2$. Here $W_2^{\theta}[0,\pi]=[L_2,W_2^1]_\theta$ is the Sobolev space. We consider the problem of equiconvergence in $W_2^\theta[0,\pi]$-norm of two expansions of a function $f\in L_2[0,\pi]$. The first one is constructed using the system of the eigenfunctions and associated functions of the operator $L$. The second one is the Fourier expansion in the series of sines. We show that the equiconvergence holds for any function $f$ in the space $L_2[0,\pi]$.
Keywords and phrases:
equiconvergence, Sturm–Lioville operators, singular potential.
Received: 14.10.2009
Citation:
I. V. Sadovnichaya, “Equiconvergence theorems for Sturm–Lioville operators with singular potentials (rate of equiconvergence in $W_2^\theta$-norm)”, Eurasian Math. J., 1:1 (2010), 137–146
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https://www.mathnet.ru/eng/emj11 https://www.mathnet.ru/eng/emj/v1/i1/p137
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