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WCE
2007
2007
Gauss-Radau Quadrature Rule Using Special Class of Polynomials
— A form of Gauss-Quadrature rule over [0,1] has been investigated that involves the derivative of the integrand at the pre-assigned left or right end node. This situation arises when the underlying polynomials are orthogonal with respect to the weight function ( ) : 1x xω = − over [0,1]. Along the lines of Golub’s work, the nodes and weights of the quadrature rule are computed from a Jacobi-type matrix with entries related to simple rational sequences. The structure of these sequences is based on some characteristics of the identity-type polynomials recently developed by one of the authors. The devised rule has a slight
Real-time Traffic| Added | 07 Nov 2010 |
| Updated | 07 Nov 2010 |
| Type | Conference |
| Year | 2007 |
| Where | WCE |
| Authors | M. A. Bokhari, Asghar Qadir |
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