@article{Kumar_2018, title={\(L^p\)-approximation and generalized growth of generalized biaxially symmetric potentials on hyper sphere}, volume={47}, url={https://ictp.acad.ro/jnaat/journal/article/view/1109}, DOI={10.33993/jnaat471-1109}, abstractNote={<p>The generalized order of growth and generalized type of an entire function \(F^{\alpha,\beta}\) (generalized biaxisymmetric potentials) have been obtained in terms of the sequence \(E_n^p(F^{\alpha,\beta},\Sigma_r^{\alpha,\beta})\) of best real biaxially symmetric harmonic polynomial approximation on open hyper sphere \(\Sigma_r^{\alpha,\beta}\). Moreover, the results of McCoy [8] have been extended for the cases of fast growth as well as slow growth.</p>}, number={1}, journal={J. Numer. Anal. Approx. Theory}, author={Kumar, Devendra}, year={2018}, month={Aug.}, pages={58–71} }