Partial sums of generalized Rabotnov function

Abstract

Let (Rα ,β ,γ (z))m(z)=z+Σn=1mAnzn+1 be the sequence of partial sums of the normalized Rabotnov functions Rα ,β ,γ (z)=z+Σn=1∞ Anzn+1 where An=β n ( γ +α ) ( ( γ +α ) (n+1)) . The purpose of the present paper is to determine lower bounds for R \ Rα ,β ,γ (z)% (Rα ,β ,γ )m(z) \ ,R% \ (Rα ,β ,γ )m(z)R% α ,β ,γ (z) \ , R \ Rα ,β ,γ (z)(% Rα ,β ,γ )m (z) \ ,R% \ (Rα ,β ,γ )m (z)% Rα ,β ,γ (z) \ . Furthermore, we give lower bounds for R \ I[ R% α ,β ,γ ] (z)(I[ Rα ,β ,γ ] )m(z) \ and R \ % (I[ Rα ,β ,γ ] )m(z)% I[ Rα ,β ,γ ] (z) \ where I[ Rα ,β ,γ ] is the Alexander transform of Rα ,β ,γ . Several examples of the main results are also considered.