Consider the vector space of continuous real valued functions on a finite interval and the inner product defined by the integral over the interval . If we have a family of orthogonal polynomials such that their span is dense then each polynomial has exactly n distinct roots . I was wondering if these roots might be dense in the interval because i tried to think of these polynomials as interpolation polynomials.
Density of the roots of orthogonal polynomials
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real-analysis
linear-algebra
polynomials
inner-product-space
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0Are you assuming these polynomials form a dense basis? Why are you assuming the roots are distinct? – 2017-02-14
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0Related: http://math.stackexchange.com/questions/12160/roots-of-legendre-polynomial – 2017-02-14
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0Sorry i forgot to mention that my bad , yes i am assuming the span of this set is dense ( the term in french is "Famille totale" i can't find the english equivalent ) – 2017-02-14
1 Answers
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The answer appears to be "Yes". I have found a proof but it is too long for me to write here . The proof is an admission exams to the french "École Polytechnique" here is a link to the exam X-ENS PSI 2006 .I will try to write the proof in english in my spare time and add it here as soon as possible .