Polynomials: Schur-Cohn Criterion. (1 Viewer)

barbernator · Jun 26, 2012

will try to answer this question after thursday

RealiseNothing · Jun 26, 2012

I think I got an answer to the first one, will post up after I finish this game of LoL.

RealiseNothing · Jun 26, 2012

First one:

Since it's an if and only if, we have to prove it holds both ways, this is the proof for the first way:

We know $|\alpha| < 1 ~$and$~ |\beta| < 1$

Hence we can say:

$(\alpha - 1)(\beta - 1) > 0$

Since each bracket individually is negative and will therefore become positive. Expanding gives:

$\alpha \beta - \alpha - \beta + 1 > 0$

Re-arranging:

$1 + \alpha \beta > \alpha + \beta$

Since $\alpha \beta = ~$product of roots and$~ \alpha + \beta = ~$sum of roots$$

We can let them equal 'c' and 'b' respectively, which by substitution gives:

$1 + c > b$

Now if both $\alpha ~$and$~ \beta$ are less than 1, it follows that their sum is less than 2, and their product is less than 1, hence:

$b < 1 + c < 2$

As required.

Fus Ro Dah · Jun 26, 2012

I don't think that's entirely correct as it is because you assumed there that alpha and beta are real in order to have obtained your inequality (a-1)(b-1)>0.

IamBread · Jun 26, 2012

Are the coefficients real?

Fus Ro Dah · Jun 26, 2012

IamBread said:
Are the coefficients real?

Yes.

IamBread · Jun 26, 2012

Well here's my attempt at the first one.

$We have the polynomial $ p(x)=x^2 + bx + c $, where $ c $ and $ b $ are real.$

$$Let the roots be $ \alpha, \beta $ such that $ |\alpha| < 1 $ and $ |\beta|<1.$

$$From sum and products of roots, it follow that $ \alpha + \beta = -b $ and $ \alpha \beta = c. \\ $As the polynomial has real coefficients, the roots occur in conjugate pairs, and so, $ \alpha \beta = |\alpha|^2 < 1. // $hence $ c < 1, 1 + c < 2$

$$Now since $ \alpha + \beta = -b, |\alpha + \beta| = |b| \\ $From triangle inequality, |\alpha| + |\beta| > |\alpha + \beta| \\ |\alpha + \beta| < 2 \\ |b| < 2$

$$As $ |\alpha| < 1 $ and $ |\beta|<1, (|\alpha| - 1)(|\beta - 1) > 0 \\ |\alpha||\beta| - |\alpha| - |\beta| + 1 > 0 \\ |\alpha||\beta| + 1 > |\alpha| +|\beta| \\ $From triangular inequality, $ |\alpha||\beta| + 1 > |\alpha + \beta| \\ c + 1 > |b|$

$$And so $ |b| < 1 + c < 2 $ iff $ |\alpha|, |\beta| < 1$

Fus Ro Dah · Jun 27, 2012

That seems right but I don't really see how that constitutes a proof satisfying the 'iff' condition.

Polynomials: Schur-Cohn Criterion. (1 Viewer)

Fus Ro Dah

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barbernator

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RealiseNothing

what is that?It is Cowpea

RealiseNothing

what is that?It is Cowpea

Fus Ro Dah

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IamBread

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Fus Ro Dah

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IamBread

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Fus Ro Dah

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