Approximating the finite Hilbert transform via a companion of Ostrowski's inequality for function of bounded variation and applications

The finite Hilbert transform plays an important role in scientific and engineering computing. By using a companion of Ostrowski's inequality for function of bounded variation, we give some new approximations of the finite Hilbert transform, which may have the better error bounds than the known results obtained via Ostrowski type inequality. Some numerical experiments are also presented.

[1]  S. Dragomir,et al.  Approximating the finite Hilbert transform via trapezoid type inequalities , 2002 .

[2]  Giovanni Monegato,et al.  The numerical evaluation of one-dimensional Cauchy principal value integrals , 1982, Computing.

[3]  Nikolaos I. Ioakimidis,et al.  On the uniform convergence of Gaussian quadrature rules for Cauchy principal value integrals and their derivatives , 1985 .

[4]  P. Rabinowitz,et al.  On the uniform convergence of Cauchy principal values of quasi-interpolating splines , 1995 .

[5]  S. Dragomir Some Companions of Ostrowski's Inequality for Absolutely Continuous Functions and Applications , 2003, math/0306076.

[6]  S. Dragomir Sharp Error Bounds of a Quadrature Rule with One Multiple Node for the Finite Hilbert Transform in Some Classes of Continuous Differentiable Functions , 2005 .

[7]  George I. Tsamasphyros,et al.  On the convergence of some quadrature rules for Cauchy principal-value and finite-part integrals , 1983, Computing.

[8]  Zheng Liu SOME COMPANIONS OF AN OSTROWSKI TYPE INEQUALITY AND APPLICATIONS , 2009 .

[9]  Catterina Dagnino,et al.  Numerical integration based on quasi-interpolating splines , 1993, Computing.

[10]  P. Rabinowitz Numerical integration based on approximating splines , 1990 .

[11]  P. Rabinowitz On an interpolatory product rule for evaluating Cauchy principal value integrals , 1989 .

[12]  S. Dragomir APPROXIMATING THE FINITE HILBERT TRANSFORM VIA AN OSTROWSKI TYPE INEQUALITY FOR FUNCTIONS OF BOUNDED VARIATION , 2002 .

[13]  Wenjun Liu,et al.  Weighted Ostrowski, trapezoid and Grüss type inequalities on time scales , 2012 .

[14]  S. Dragomir ON THE OSTROWSKI'S INTEGRAL INEQUALITY FOR MAPPINGS WITH BOUNDED VARIATION AND APPLICATIONS , 2001 .

[15]  D. Hunter,et al.  Some Gauss-type formulae for the evaluation of Cauchy principal values of integrals , 1972 .

[16]  A companion of Ostrowski's inequality for mappings whose first derivatives are bounded and applications in numerical integration , 2012 .

[17]  Seakweng Vong A note on some Ostrowski-like type inequalities , 2011, Comput. Math. Appl..

[18]  Tatsuo Torii,et al.  Hilbert and Hadamard transforms by generalized Chebyshev expansion , 1994 .