New Bounds on the Real Polynomial Roots

Abstract

The presented analysis determines several new bounds on the roots of the equation an xn + an-1 xn-1 + ·s + a0 = 0 (with an > 0). All proposed new bounds are lower than the Cauchy bound max\1, Σj=0n-1 |aj/an| \. Firstly, the Cauchy bound formula is derived by presenting it in a new light -- through a recursion. It is shown that this recursion could be exited at earlier stages and, the earlier the recursion is terminated, the lower the resulting root bound will be. Following a separate analysis, it is further demonstrated that a significantly lower root bound can be found if the summation in the Cauchy bound formula is made not over each one of the coefficients a0, a1, …, an-1, but only over the negative ones. The sharpest root bound in this line of analysis is shown to be the larger of 1 and the sum of the absolute values of all negative coefficients of the equation divided by the largest positive coefficient. The following bounds are also found in this paper: max\ 1, ( Σj = 1q Bj/Al )1/(l-k)\, where B1, B2, … Bq are the absolute values of all of the negative coefficients in the equation, k is the highest degree of a monomial with a negative coefficient, Al is the positive coefficient of the term Al xl for which k< l n.