A note on the sharpness of the Remez-type inequality for homogeneous polynomials on the sphere
Electronic transactions on numerical analysis, Tome 25 (2006), pp. 278-283
Remez-type inequalities provide upper bounds for the uniform norms of polynomials on given $\textcent $compact sets provided that for every where is a subset of of small measure. In this $\sterling $#############$ \textcent \ddot $§$\copyright $###$ \copyright $###$\sterling $! #"###$ " \sterling $note we obtain an asymptotically sharp Remez-type inequality for homogeneous polynomials on the unit sphere in %')(
@article{ETNA_2006__25__a14,
author = {Yattselev, M.},
title = {A note on the sharpness of the {Remez-type} inequality for homogeneous polynomials on the sphere},
journal = {Electronic transactions on numerical analysis},
pages = {278--283},
year = {2006},
volume = {25},
zbl = {1107.41014},
language = {en},
url = {http://geodesic.mathdoc.fr/item/ETNA_2006__25__a14/}
}
TY - JOUR AU - Yattselev, M. TI - A note on the sharpness of the Remez-type inequality for homogeneous polynomials on the sphere JO - Electronic transactions on numerical analysis PY - 2006 SP - 278 EP - 283 VL - 25 UR - http://geodesic.mathdoc.fr/item/ETNA_2006__25__a14/ LA - en ID - ETNA_2006__25__a14 ER -
Yattselev, M. A note on the sharpness of the Remez-type inequality for homogeneous polynomials on the sphere. Electronic transactions on numerical analysis, Tome 25 (2006), pp. 278-283. http://geodesic.mathdoc.fr/item/ETNA_2006__25__a14/