Let be the class of analytic functions in the unit disk with and in . Let also , be the well known classes of normalized univalent starlike and convex functions respectively. For we introduce the classes , and which are subclasses of , and respectively, being defined as follows: iff with iff and iff . In this paper we study different kind of coefficient problems for the above mentioned classes , and . All the estimations obtained are the best possible.
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be the class of analytic functions in the unit disk 
with 
and 
in 
. Let also 
, 
be the well known classes of normalized univalent starlike and convex functions respectively. For 
we introduce the classes ![$mathcal{P}% _{[alpha]}$](images/011_03_JIPAM/img9.gif){kind=small}
, ![$mathcal{S}^*_{[alpha]}$](images/011_03_JIPAM/img10.gif){kind=small}
and ![$mathcal{K}_{[alpha]}$](images/011_03_JIPAM/img11.gif){kind=small}
which are subclasses of 
and ![$p in mathcal{P}_{[alpha]} $](images/011_03_JIPAM/img13.gif){kind=small}
iff 
with 
![$f in mathcal{S}^*_{[alpha]}$](images/011_03_JIPAM/img16.gif){kind=small}
iff ![$ frac{z f^prime }{f}in mathcal{P}_{[alpha]}$](images/011_03_JIPAM/img17.gif){kind=small}
and ![$f in mathcal{K}_{[alpha]}$](images/011_03_JIPAM/img18.gif){kind=small}
iff ![$ {1 + {frac{ z f^{primeprime}(z)}{f^{prime}(z)}}} in mathcal{P}_{[alpha]} $](images/011_03_JIPAM/img19.gif){kind=small}
. In this paper we study different kind of coefficient problems for the above mentioned classes ![$mathcal{P}_{[alpha]}$](images/011_03_JIPAM/img20.gif){kind=small}
, ![$% mathcal{P}_{[alpha]}$](images/011_03_JIPAM/img21.gif){kind=small}
. All the estimations obtained are the best possible.
