TY  - GEN 
AU  - Aptekarev, A. I.
AU  - Dehesa, J. S.
AU  - Martínez-Finkelshtein, Andrei
AU  - Yáñez, R.
PY  - 2009
UR  - http://hdl.handle.net/10835/1630
AB  - Let $p_n$ be the $n$-th orthonormal polynomial on the real line, whose zeros are $\lambda_j^{(n)}$, $j=1, ..., n$. Then for each $j=1, ..., n$, $$ \vec \Psi_j^2 = (\Psi_{1j}^2, ..., \Psi_{nj}^2) $$ with $$ \Psi_{ij}^2= p_{i-1}^2 (\lambda_j^{(n)})...
LA  - en
KW  - Polinomios ortogonales
KW  - Entropia de Shannon
KW  - Chebyshev polinomios
KW  - Formula Euler–Maclaurin
KW  - Orthogonal polynomials
KW  - Shannon entropy
KW  - Chebyshev polynomials
KW  - Euler–Maclaurin formula
TI  - Discrete entropies of orthogonal polynomials
ER  -