Partial sums of the normalized Dini functions
Abstract
Let ( wα ,v) m(z)=z+Σn=1manzn+1 be the sequence of partial sums of normalized Dini functions wα ,v(z)=z+Σn=1∞ anzn+1 where an=( -1) n( 2n+α ) α 4nn!( v+1) n% . The aim of the present paper is to obtain lower bounds for R \ wα ,v(z)( wα ,v) m(z)\ , R\ ( wα ,v) m(z)wα ,v(z)\ , R\ wα ,v^ (z) ( wα ,v) m^ (z)\ and R \ ( wα ,v) m^ (z)wα ,v^ (z)\ . Also we give a few geometric description regarding image domains of some functions.
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