On the critical length conjecture for spherical Bessel functions in CAGD

Abstract

A conjecture of J.M. Carnicer, E. Mainar and J.M. Pe\~na states that the critical length of the space Pn C1 generated by the functions xk x and xk x for k=0,...n is equal to the first positive zero jn+12,1 of the Bessel function Jn+12 of the first kind. It is known that the conjecture implies the following statement (D3): the determinant of the Hankel matrix equation ( array [c]ccc f & f & f\\ f & f & f( 3) \\ f & f & f( 4) array ) eqabstract equation does not have a zero in the interval (0,jn+12,1) whenever f=fn is given by fn( x) =π2 xn+12Jn+12( x) . In this paper we shall prove (D3) and various generalizations.