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

Definition

Template:See Let p0 and p1 two univariate polynomials. Suppose that they do not have a common root and the degree of p0 is greater than the degree of p1. The Sturm series is constructed by:

pi:=pi+1qi+1pi+2 for i0.

This is almost the same algorithm as Euclid's but the remainder pi+2 has negative sign.

Sturm series associated to a characteristic polynomial

Let us see now Sturm series p0,p1,,pk associated to a characteristic polynomial P in the variable λ:

P(λ)=a0λk+a1λk1++ak1λ+ak

where ai for i in {1,,k} are rational functions in (Z) with the coordinate set Z. The series begins with two polynomials obtained by dividing P(ıμ) by ık where ı represents the imaginary unit equal to 1 and separate real and imaginary parts:

p0(μ):=(P(ıμ)ık)=a0μka2μk2+a4μk4±p1(μ):=(P(ıμ)ık)=a1μk1a3μk3+a5μk5±

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

pi(μ)=ci,0μki+ci,1μki2+ci,2μki4+

In these notations, the quotient qi is equal to (ci1,0/ci,0)μ which provides the condition ci,00. Moreover, the polynomial pi replaced in the above relation gives the following recursive formulas for computation of the coefficients ci,j.

ci+1,j=ci,j+1ci1,0ci,0ci1,j+1=1ci,0det(ci1,0ci1,j+1ci,0ci,j+1).

If ci,0=0 for some i, the quotient qi is a higher degree polynomial and the sequence pi stops at ph with h<k.

References

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