Sturm series

In mathematics, the Sturm series^[1] associated with a pair of polynomials is named after Jacques Charles François Sturm.

Definition

Further information: Sturm chain

Let ${\displaystyle p_{0}}$  and ${\displaystyle p_{1}}$  two univariate polynomials. Suppose that they do not have a common root and the degree of ${\displaystyle p_{0}}$  is greater than the degree of ${\displaystyle p_{1}}$ . The Sturm series is constructed by:

${\displaystyle p_{i}:=p_{i+1}q_{i+1}-p_{i+2}{\text{ for }}i\geq 0.}$ 

This is almost the same algorithm as Euclid's but the remainder ${\displaystyle p_{i+2}}$  has negative sign.

Sturm series associated to a characteristic polynomial

Let us see now Sturm series ${\displaystyle p_{0},p_{1},\dots ,p_{k}}$  associated to a characteristic polynomial ${\displaystyle P}$  in the variable ${\displaystyle \lambda }$ :

${\displaystyle P(\lambda )=a_{0}\lambda ^{k}+a_{1}\lambda ^{k-1}+\cdots +a_{k-1}\lambda +a_{k}}$ 

where ${\displaystyle a_{i}}$  for ${\displaystyle i}$  in ${\displaystyle \{1,\dots ,k\}}$  are rational functions in ${\displaystyle \mathbb {R} (Z)}$  with the coordinate set ${\displaystyle Z}$ . The series begins with two polynomials obtained by dividing ${\displaystyle P(\imath \mu )}$  by ${\displaystyle \imath ^{k}}$  where ${\displaystyle \imath }$  represents the imaginary unit equal to ${\displaystyle {\sqrt {-1}}}$  and separate real and imaginary parts:

${\displaystyle {\begin{aligned}p_{0}(\mu )&:=\Re \left({\frac {P(\imath \mu )}{\imath ^{k}}}\right)=a_{0}\mu ^{k}-a_{2}\mu ^{k-2}+a_{4}\mu ^{k-4}\pm \cdots \\p_{1}(\mu )&:=-\Im \left({\frac {P(\imath \mu )}{\imath ^{k}}}\right)=a_{1}\mu ^{k-1}-a_{3}\mu ^{k-3}+a_{5}\mu ^{k-5}\pm \cdots \end{aligned}}}$ 

The remaining terms are defined with the above relation. Due to the special structure of these polynomials, they can be written in the form:

${\displaystyle p_{i}(\mu )=c_{i,0}\mu ^{k-i}+c_{i,1}\mu ^{k-i-2}+c_{i,2}\mu ^{k-i-4}+\cdots }$ 

In these notations, the quotient ${\displaystyle q_{i}}$  is equal to ${\displaystyle (c_{i-1,0}/c_{i,0})\mu }$  which provides the condition ${\displaystyle c_{i,0}\neq 0}$ . Moreover, the polynomial ${\displaystyle p_{i}}$  replaced in the above relation gives the following recursive formulas for computation of the coefficients ${\displaystyle c_{i,j}}$ .

${\displaystyle c_{i+1,j}=c_{i,j+1}{\frac {c_{i-1,0}}{c_{i,0}}}-c_{i-1,j+1}={\frac {1}{c_{i,0}}}\det {\begin{pmatrix}c_{i-1,0}&c_{i-1,j+1}\\c_{i,0}&c_{i,j+1}\end{pmatrix}}.}$ 

If ${\displaystyle c_{i,0}=0}$  for some ${\displaystyle i}$ , the quotient ${\displaystyle q_{i}}$  is a higher degree polynomial and the sequence ${\displaystyle p_{i}}$  stops at ${\displaystyle p_{h}}$  with ${\displaystyle h<k}$ .

References

1. (in French) C. F. Sturm. Résolution des équations algébriques. Bulletin de Férussac. 11:419–425. 1829.