Faber polynomials in a deltoid region and power iteration momentum methods

Abstract

We consider a region in the complex plane enclosed by a deltoid curve inscribed in the unit circle, and define a family of polynomials Pn that satisfy the same recurrence relation as the Faber polynomials for this region. We use this family of polynomials to give a constructive proof that zn is approximately a polynomial of degree n within the deltoid region. Moreover, we show that |Pn| 1 in this deltoid region, and that, if |z| = 1+, then the magnitude |Pn(z)| is at least 13(1+)n, for all > 0. We illustrate our polynomial approximation theory with an application to iterative linear algebra. In particular, we construct a higher-order momentum-based method that accelerates the power iteration for certain matrices with complex eigenvalues. We show how the method can be run dynamically when the two dominant eigenvalues are real and positive.