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- Shapiro_polynomials abstract "In mathematics, the Shapiro polynomials are a sequence of polynomials which were first studied by Harold S. Shapiro in 1951 when considering the magnitude of specific trigonometric sums. In signal processing, the Shapiro polynomials have good autocorrelation properties and their values on the unit circle are small. The first few members of the sequence are:where the second sequence, indicated by Q, is said to be complementary to the first sequence, indicated by P.".
- Shapiro_polynomials thumbnail Rudin_shapiro_8_zeros.svg?width=300.
- Shapiro_polynomials wikiPageID "10338711".
- Shapiro_polynomials wikiPageRevisionID "605254779".
- Shapiro_polynomials hasPhotoCollection Shapiro_polynomials.
- Shapiro_polynomials subject Category:Digital_signal_processing.
- Shapiro_polynomials subject Category:Fourier_analysis.
- Shapiro_polynomials subject Category:Polynomials.
- Shapiro_polynomials comment "In mathematics, the Shapiro polynomials are a sequence of polynomials which were first studied by Harold S. Shapiro in 1951 when considering the magnitude of specific trigonometric sums. In signal processing, the Shapiro polynomials have good autocorrelation properties and their values on the unit circle are small. The first few members of the sequence are:where the second sequence, indicated by Q, is said to be complementary to the first sequence, indicated by P.".
- Shapiro_polynomials label "Polynôme de Shapiro".
- Shapiro_polynomials label "Shapiro polynomials".
- Shapiro_polynomials label "Многочлены Шапиро".
- Shapiro_polynomials sameAs Polynôme_de_Shapiro.
- Shapiro_polynomials sameAs m.02q8wnr.
- Shapiro_polynomials sameAs Q3395690.
- Shapiro_polynomials sameAs Q3395690.
- Shapiro_polynomials wasDerivedFrom Shapiro_polynomials?oldid=605254779.
- Shapiro_polynomials depiction Rudin_shapiro_8_zeros.svg.
- Shapiro_polynomials isPrimaryTopicOf Shapiro_polynomials.
