On Simpson's inequality and applications.

New inequalities of Simpson type and their application to quadrature formulae in Numerical Analysis are given.

[1]  A Generalization of the Ostrowski Integral Inequality for Mappings Whose Derivatives Belong to Lp[a, b] and Applications in Numerical Integration☆ , 2001 .

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

[3]  Sever S Dragomir,et al.  The unified treatment of trapezoid, Simpson, and Ostrowski type inequality for monotonic mappings and applications , 2000 .

[4]  N. S. Barnett,et al.  An n-dimensional Version of Ostrowski's Inequality for Mappings of the $H\ddot{o}lder$ Type , 2000 .

[5]  Sever Silvestru Dragomir,et al.  A new generalization of Ostrowski's integral inequality for mappings whose derivatives are bounded and applications in numerical integration and for special means , 2000, Appl. Math. Lett..

[6]  S. Dragomir,et al.  LOBATTO TYPE QUADRATURE RULES FOR FUNCTIONS WITH BOUNDED DERIVATIVE , 2000 .

[7]  On a Weighted Generalization of Iyengar Type Inequalities Involving Bounded First Derivative , 2000 .

[8]  N. S. Barnett,et al.  Inequalities for Beta and Gamma functions via some classical and new integral inequalities. , 2000 .

[9]  S. Dragomir The Ostrowski integral inequality for mappings of bounded variation , 1999, Bulletin of the Australian Mathematical Society.

[10]  A Weighted Version of Ostrowski Inequality for Mappings of Holder Type and Applications in Numerical Analysis , 1999 .

[11]  S. Dragomir,et al.  AN INEQUALITY OF OSTROWSKI TYPE AND ITS APPLICATIONS FOR SIMPSON'S RULE AND SPECIAL MEANS , 1999 .

[12]  N. S. Barnett,et al.  An Ostrowski type inequality for a random variable whose probability density function belongs to L_p [a,b], p > 1 , 1999 .

[13]  N. S. Barnett,et al.  An Ostrowski type Inequality for Double Integrals in Terms of Lp- Norms and Applications in Numerical Integration , 1998 .

[14]  S. Dragomir ON SIMPSON'S QUADRATURE FORMULA FOR DIFFERENTIABLE MAPPINGS WHOSE DERIVATIVES BELONG TO L p - SPACES AND APPLICATIONS , 1998 .

[15]  S. Dragomir,et al.  AN INEQUALITY OF OSTROWSKI TYPE FOR MAPPINGS WHOSE SECOND DERIVATIVES BELONG TO L 1 (a, b) AND APPLICATIONS , 1998 .

[16]  Neil S Barnett,et al.  AN OSTROWSKI TYPE INEQUALITY FOR MAPPINGS WHOSE SECOND DERIVATIVES ARE BOUNDED AND APPLICATIONS , 1998 .

[17]  S. Dragomir,et al.  An Ostrowski Type Inequality for Mappings whose Second Derivatives Belong to Lp (A,B) and Applications , 1998 .

[18]  S. Dragomir,et al.  AN OSTROWSKI TYPE INEQUALITY FOR WEIGHTED MAPPINGS WITH BOUNDED SECOND DERIVATIVES , 1998 .

[19]  Sever S Dragomir,et al.  Applications of Ostrowski's inequality to the estimation of error bounds for some special means and for some numerical quadrature rules☆ , 1998 .

[20]  N. S. Barnett,et al.  AN OSTROWSKI TYPE INEQUALITY FOR DOUBLE INTEGRALS AND APPLICATIONS FOR CUBATURE FORMULAE , 1998 .

[21]  S. Dragomir,et al.  Some Ostrowski Type Inequalities for N-Time Differentiable Mappings and Applications , 1998 .

[22]  S. Dragomir,et al.  AN INEQUALITY OF OSTROWSKI TYPE FOR MAPPINGS WHOSE SECOND DERIVATIVES ARE BOUNDED AND APPLICATIONS , 1998 .

[23]  Sever S Dragomir,et al.  An inequality of Ostrowski-Grüss' type and its applications to the estimation of error bounds for some special means and for some numerical quadrature rules , 1997 .

[24]  D. S. Mitrinovic,et al.  Classical and New Inequalities in Analysis , 1992 .