A chebyshev rational function with low Q-factors

We construct digital (t, s)-sequences in a prime-power base q for which the quality parameter t has the least possible order of magnitude. The construction uses algebraic function fields over the finite field of order q which contain many places of degree 1 relative to the genus.

Let ⌽ z g ‫ރ‬ z be a rational function of degree d G 2. A well known theorem n Ž . Ž . in dynamical systems says that if some iterate z s ( ( иии ( z is a 2 Ž . polynomial, then already z is a polynomial. More generally, this is true for Ž . Ž . Ž X Ž . . z g K z for any field K provided that is se

## Abstract We developed a modified generalized Chebyshev (MGC) rational function and synthesized a low‐pass filter (LPF) to implement it. The conventional generalized Chebyshev (GC) filter and proposed MGC filter have an equal ripple in passband. However, in stopband, the GC filter has only one tr

This paper aims to compare rational Chebyshev (RC) and Hermite functions (HF) collocation approach to solve Volterra's model for population growth of a species within a closed system. This model is a nonlinear integro-differential equation where the integral term represents the effect of toxin. This