Free Online Productivity Tools
i2Speak
i2Symbol
i2OCR
iTex2Img
iWeb2Print
iWeb2Shot
i2Type
iPdf2Split
iPdf2Merge
i2Bopomofo
i2Arabic
i2Style
i2Image
i2PDF
iLatex2Rtf
Sci2ools
JAT
2007
2007
Monotonicity of zeros of Jacobi polynomials
Denote by xn,k(α, β), k = 1, . . . , n, the zeros of the Jacobi polynomial P (α,β) n (x). It is well known that xn,k(α, β) are increasing functions of β and decreasing functions of α. In this paper we investigate the question of how fast the functions 1 − xn,k(α, β) decrease as β increases. We prove that the products tn,k(α, β) := fn(α, β) (1 − xn,k(α, β)), where fn(α, β) = 2n2 + 2n(α + β + 1) + (α + 1)(β + 1), are already increasing functions of β and that, for any fixed α > −1, fn(α, β) is the asymptotically extremal, with respect to n, function of β that forces the products tn,k(α, β) to increase. Key words: Zeros, Jacobi polynomials, monotonicity.
Real-time Traffic| Added | 15 Dec 2010 |
| Updated | 15 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | JAT |
| Authors | Dimitar K. Dimitrov, Fernando R. Rafaeli |
Comments (0)
Researcher Info
|
