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We study a Nikol’skii type inequality for even entire functions of given exponential type between the uniform norm on the half-line [0,∞) and the norm (∫0∞|f(x)|qx2α+1dx)1/q of the space Lq((0,∞),… Click to show full abstract
We study a Nikol’skii type inequality for even entire functions of given exponential type between the uniform norm on the half-line [0,∞) and the norm (∫0∞|f(x)|qx2α+1dx)1/q of the space Lq((0,∞), x2α+1) with the Bessel weight for 1 ≤ q < ∞ and α > −1/2. An extremal function is characterized. In particular, we prove that the uniform norm of an extremal function is attained only at the end point x = 0 of the half-line. To prove these results, we use the Bessel generalized translation.
Keywords:
half line;
nikol skii;
uniform norm;
norm
Journal Title: Analysis Mathematica
Year Published: 2018
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Journal Title: Analysis Mathematica
Year Published: 2018
Link to full text (if available)
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recommendations!