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2007
2007
Positive weight quadrature on the sphere and monotonicities of Jacobi polynomials
In 2000, Reimer proved that a positive weight quadrature rule on the unit sphere Sd ⊂ Rd+1 has the property of quadrature regularity. Hesse and Sloan used a related property, called Property (R) in their work on estimates of quadrature error on Sd . Using a variation on Reimer’s bounds on the sum of the quadrature weight within a spherical cap, and using Jacobi polynomials of the form P (1+d/2,d/2) t , as well as the Sturm comparison theorem, the constants related Property (R) can be estimated. A recent conjecture on monotonicities of Jacobi polynomials would, if true, provide improved estimates for these constants.
Real-time Traffic| Added | 27 Dec 2010 |
| Updated | 27 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | NA |
| Authors | Paul C. Leopardi |
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