Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk
<p/> <p>Starting out from a question posed by T. Erdélyi and J. Szabados, we consider Schur-type inequalities for the classes of complex algebraic polynomials having no zeros within the unit disk <inline-formula><graphic file="1029-242X-2007-090526-i1.gif"/>...
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2007-01-01
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| Series: | Journal of Inequalities and Applications |
| Online Access: | http://www.journalofinequalitiesandapplications.com/content/2007/090526 |
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doaj-bdff4cb1571745268fcf1a7315ad46552020-11-25T00:20:37ZengSpringerOpenJournal of Inequalities and Applications1025-58341029-242X2007-01-0120071090526Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit DiskRévész Szilárd Gy<p/> <p>Starting out from a question posed by T. Erdélyi and J. Szabados, we consider Schur-type inequalities for the classes of complex algebraic polynomials having no zeros within the unit disk <inline-formula><graphic file="1029-242X-2007-090526-i1.gif"/></inline-formula>. The class of polynomials with no zeros in <inline-formula><graphic file="1029-242X-2007-090526-i2.gif"/></inline-formula>—also known as Bernstein or Lorentz class—was studied in detail earlier. For real polynomials utilizing the Bernstein-Lorentz representation as convex combinations of fundamental polynomials <inline-formula><graphic file="1029-242X-2007-090526-i3.gif"/></inline-formula>, G. Lorentz, T. Erdélyi, and J. Szabados proved a number of improved versions of Schur- (and also Bernstein- and Markov-) type inequalities. Here we investigate the similar questions for complex polynomials. For complex polynomials, the above convex representation is not available. Even worse, the set of complex polynomials, having no zeros in the unit disk, does not form a convex set. Therefore, a possible proof must go along different lines. In fact, such a direct argument was asked for by Erdélyi and Szabados already for the real case. The sharp forms of the Bernstein- and Markov-type inequalities are known, and the right factors are worse for complex coefficients than for real ones. However, here it turns out that Schur-type inequalities hold unchanged even for complex polynomials and for all monotonic, continuous weight functions. As a consequence, it becomes possible to deduce the corresponding Markov inequality from the known Bernstein inequality and the new Schur-type inequality with logarithmic weight.</p>http://www.journalofinequalitiesandapplications.com/content/2007/090526 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Révész Szilárd Gy |
| spellingShingle |
Révész Szilárd Gy Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk Journal of Inequalities and Applications |
| author_facet |
Révész Szilárd Gy |
| author_sort |
Révész Szilárd Gy |
| title |
Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk |
| title_short |
Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk |
| title_full |
Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk |
| title_fullStr |
Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk |
| title_full_unstemmed |
Schur-Type Inequalities for Complex Polynomials with no Zeros in the Unit Disk |
| title_sort |
schur-type inequalities for complex polynomials with no zeros in the unit disk |
| publisher |
SpringerOpen |
| series |
Journal of Inequalities and Applications |
| issn |
1025-5834 1029-242X |
| publishDate |
2007-01-01 |
| description |
<p/> <p>Starting out from a question posed by T. Erdélyi and J. Szabados, we consider Schur-type inequalities for the classes of complex algebraic polynomials having no zeros within the unit disk <inline-formula><graphic file="1029-242X-2007-090526-i1.gif"/></inline-formula>. The class of polynomials with no zeros in <inline-formula><graphic file="1029-242X-2007-090526-i2.gif"/></inline-formula>—also known as Bernstein or Lorentz class—was studied in detail earlier. For real polynomials utilizing the Bernstein-Lorentz representation as convex combinations of fundamental polynomials <inline-formula><graphic file="1029-242X-2007-090526-i3.gif"/></inline-formula>, G. Lorentz, T. Erdélyi, and J. Szabados proved a number of improved versions of Schur- (and also Bernstein- and Markov-) type inequalities. Here we investigate the similar questions for complex polynomials. For complex polynomials, the above convex representation is not available. Even worse, the set of complex polynomials, having no zeros in the unit disk, does not form a convex set. Therefore, a possible proof must go along different lines. In fact, such a direct argument was asked for by Erdélyi and Szabados already for the real case. The sharp forms of the Bernstein- and Markov-type inequalities are known, and the right factors are worse for complex coefficients than for real ones. However, here it turns out that Schur-type inequalities hold unchanged even for complex polynomials and for all monotonic, continuous weight functions. As a consequence, it becomes possible to deduce the corresponding Markov inequality from the known Bernstein inequality and the new Schur-type inequality with logarithmic weight.</p> |
| url |
http://www.journalofinequalitiesandapplications.com/content/2007/090526 |
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