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Hypercyclic Convolution Operators On Spaces Of Entire Functions
(Theta FoundationBucharest, 2016)
Entire Functions in Weighted L2 and Zero Modes of the Pauli Operator with Non-Signdefinite Magnetic Field
(Universidad de La Frontera. Departamento de Matemática y EstadísticaUniversidade Federal de Pernambuco. Departamento de Matemática, 2010)
Schur-Szegö composition of entire functions
(2012)
For any pair of algebraic polynomials A(x) = n k=0 n k akxk and B(x) = n k=0 n k bkxk, their Schur-Szego composition is defined by ˝ (A ∗ n B)(x) = n k=0 n k akbkxk. Motivated by some recent results which show that ...
Results on the uniqueness of difference polynomials of entire functions
(Centro de Investigaciones en Matemática Pura y Aplicada (CIMPA) y Escuela de Matemática, San José, Costa Rica., 2015)
Radii of starlikeness and convexity of some q-Bessel functions
(2016-03-01)
Geometric properties of the Jackson and Hahn-Exton q-Bessel functions are studied. For each of them, three different normalizations are applied in such a way that the resulting functions are analytic in the unit disk of ...
Caracterização de funções inteiras e contínuas sob certas condições
(Universidade Tecnológica Federal do ParanáCornelio ProcopioBrasilLicenciatura em MatemáticaUTFPR, 2018)
The aim of this work is to investigate an polinomial interpolation process for entire functions and determinate continuous functions which satisfy certain properties. Moreover, we present Newton binomial expansion for ...
Schur-SzegA composition of entire functions
(Springer, 2012-07-01)
For any pair of algebraic polynomials A(x) = Sigma(n)(k=0) ((n)(k))a(k)x(k) and B(x) = Sigma(n)(k=0) ((n)(k))b(k)x(k), their Schur-Szego composition is defined by (A (*)(n) B)(x) = Sigma(n)(k=0) ((n)(k))a(k)b(k)x(k). ...
Schur-SzegA composition of entire functions
(Springer, 2012-07-01)
For any pair of algebraic polynomials A(x) = Sigma(n)(k=0) ((n)(k))a(k)x(k) and B(x) = Sigma(n)(k=0) ((n)(k))b(k)x(k), their Schur-Szego composition is defined by (A (*)(n) B)(x) = Sigma(n)(k=0) ((n)(k))a(k)b(k)x(k). ...
Schur-SzegA composition of entire functions
(Springer, 2014)