a more accurate half-discrete hardy-hilbert-type inequality with the best possible constant factor related to the extended riemann-zeta function

نویسندگان

michael th. rassias

bicheng yang

چکیده

by the method of weight coefficients, techniques of real analysis andhermite-hadamard's inequality, a half-discrete hardy-hilbert-type inequalityrelated to the kernel of the hyperbolic cosecant function with the best possibleconstant factor expressed in terms of the extended riemann-zeta function is proved.the more accurate equivalent forms, the operator expressions with the norm,the reverses and some particular cases are also considered.

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A more accurate half-discrete Hardy-Hilbert-type inequality with the best possible constant factor related to the extended Riemann-Zeta function

By the method of weight coefficients, techniques of real analysis and Hermite-Hadamard's inequality, a half-discrete Hardy-Hilbert-type inequality related to the kernel of the hyperbolic cosecant function with the best possible constant factor expressed in terms of the extended Riemann-zeta function is proved. The more accurate equivalent forms, the operator expressions with the norm, the rever...

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عنوان ژورنال:
international journal of nonlinear analysis and applications

ناشر: semnan university

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شماره Articles in Press 2016

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