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Abstract
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| In this article, we introduce the sigma-resolvent sampling kernels associated with an unbounded symmetric operator with compact resolvent defined on a Hilbert space. We prove that any function obtained by duality through a generalized Lagrange-Kramer samplin kernel is uniformly approximated in compact sets of the complex plane by functions defined through sigma-resolvents sampling kernels. | |
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International
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Si |
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JCR
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No |
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Title
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FJMS |
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ISBN
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0972-0871 |
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Impact factor JCR
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0 |
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Impact info
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Volume
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26 |
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Journal number
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0 |
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From page
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60 |
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To page
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90 |
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Month
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SIN MES |
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Ranking
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