Yıl 2020,
Cilt: 49 Sayı: 1, 56 - 67, 06.02.2020
Shahid Mehmood
,
Saima Mustafa
Kaynakça
- [1] M. Arif, S. Mahmood, J. Sokołand J. Dziok, New subclass of analytic functions in
conical domain associated with a linear operator, Acta Math Sci, 36B(3), 1–13, 2016.
- [2] M. Arif, S. Umar, S. Mahmood and J. Sokoł, New reciprocal class of analytic functions
associated with linear operator, Iran. J. Sci. Technol. Trans. Sci., 42, 881–886, 2018.
- [3] D.A. Brannan, On functions of bounded boundary rotations, Proc. Edinb. Math. Soc.
2, 339–347, 1968–1969.
- [4] G. Golusin, On distortion theorems and coefficients of univalent functions, Rec. Math.
[Mat. Sbornik] N.S., 19 (61), 183–202, 1946.
- [5] A.W. Goodman, Univalent functions, Vol. I, II, Polygonal Publishing House, Wash-
ington, New Jersey, 1983.
- [6] A.W. Goodman, On uniformly convex functions, Ann. Polon. Math. 56, 87–92, 1991.
- [7] S. Kanas, Techniques of the differential subordination for domains bounded by conic
sections, Int. J. Math. Math. Sci. 38, 2389–2400, 2003.
- [8] S. Kanas and A. Lecko, Differential subordination for domains bounded by hyperbolas,
Zeszyty Nauk. Politech. Rzeszowskiej Mat. 175 (23), 61–70, 1999.
- [9] S. Kanas and A. Wisniowska Conic regions and k-uniform convexity, J. Comput.
Appl. Math. 105, 327–336, 1999.
- [10] S. Kanas and A. Wiśniowska, Conic regions and k-starlike functions, Rev. Roumaine,
Math. Pures Appl. 45, 647–657, 2000.
- [11] S. Mahmood and J. Sokoł, New subclass of analytic functions in conical domain as-
sociated with ruscheweyh Q-differential operator, Results Math. 71, 1345–1357, 2017.
- [12] S. Mahmood, S.N. Malik, S. Mustafa and S.M.J. Riaz, A new subclass of k-Janowski
type functions associated with Ruscheweyh derivative, J. Func. Spaces, 2017, Article
ID 6095293, 7 pages, 2017.
- [13] S.S. Miller and P.T. Mocanu, Differential subordinations theory and applications,
Marcel Dekker, Inc. New York Basel, 2000.
- [14] K.I. Noor, Higher order close-to-convex functions, Math. Japon. 37, 1–8, 1992.
- [15] K.I. Noor, On a generalization of uniformly convex and related functions, Comp.
Math. Appl. 61, 117–125, 2011.
- [16] K.I. Noor and S.N. Malik, On a new class of analytic functions associated with conic
domain, Comput. Math. Appl. 62, 367–375, 2011.
- [17] K.I. Noor and S.N. Malik, On coefficient inequalities of functions associated with conic
domains, Comput. Math. Appl. 62, 2209–2217, 2011.
- [18] B. Pinchuk, Functions with bounded boundary rotation, Isr. J. Math. 10, 7–16, 1971.
- [19] R.K. Raina and P. Sharma, Subordination properties of univalent functions involving
a new class of operators, Electron. J. Math. Anal. Appl. 2 (1), 37–52, 2014.
- [20] F. Rønning, Uniformly convex functions and a corresponding class of starlike func-
tions, Proc. Amer. Math. Soc. 118, 189–196, 1993.
- [21] P. Sharma, R.K. Raina and J. Sokoł, Certain subordination results involving a class
of operators, Analele Univ. Oradea Fasc. Matematica, 21 (2), 89–99, 2014.
Certain classes of $k$-uniformly functions with bounded radius rotation associated with linear operator
Yıl 2020,
Cilt: 49 Sayı: 1, 56 - 67, 06.02.2020
Shahid Mehmood
,
Saima Mustafa
Öz
In this paper we use linear operator to define certain classes of analytic functions related to conic domains. Inclusion results, radius problems, rate of growth and other interesting properties are investigated.
Kaynakça
- [1] M. Arif, S. Mahmood, J. Sokołand J. Dziok, New subclass of analytic functions in
conical domain associated with a linear operator, Acta Math Sci, 36B(3), 1–13, 2016.
- [2] M. Arif, S. Umar, S. Mahmood and J. Sokoł, New reciprocal class of analytic functions
associated with linear operator, Iran. J. Sci. Technol. Trans. Sci., 42, 881–886, 2018.
- [3] D.A. Brannan, On functions of bounded boundary rotations, Proc. Edinb. Math. Soc.
2, 339–347, 1968–1969.
- [4] G. Golusin, On distortion theorems and coefficients of univalent functions, Rec. Math.
[Mat. Sbornik] N.S., 19 (61), 183–202, 1946.
- [5] A.W. Goodman, Univalent functions, Vol. I, II, Polygonal Publishing House, Wash-
ington, New Jersey, 1983.
- [6] A.W. Goodman, On uniformly convex functions, Ann. Polon. Math. 56, 87–92, 1991.
- [7] S. Kanas, Techniques of the differential subordination for domains bounded by conic
sections, Int. J. Math. Math. Sci. 38, 2389–2400, 2003.
- [8] S. Kanas and A. Lecko, Differential subordination for domains bounded by hyperbolas,
Zeszyty Nauk. Politech. Rzeszowskiej Mat. 175 (23), 61–70, 1999.
- [9] S. Kanas and A. Wisniowska Conic regions and k-uniform convexity, J. Comput.
Appl. Math. 105, 327–336, 1999.
- [10] S. Kanas and A. Wiśniowska, Conic regions and k-starlike functions, Rev. Roumaine,
Math. Pures Appl. 45, 647–657, 2000.
- [11] S. Mahmood and J. Sokoł, New subclass of analytic functions in conical domain as-
sociated with ruscheweyh Q-differential operator, Results Math. 71, 1345–1357, 2017.
- [12] S. Mahmood, S.N. Malik, S. Mustafa and S.M.J. Riaz, A new subclass of k-Janowski
type functions associated with Ruscheweyh derivative, J. Func. Spaces, 2017, Article
ID 6095293, 7 pages, 2017.
- [13] S.S. Miller and P.T. Mocanu, Differential subordinations theory and applications,
Marcel Dekker, Inc. New York Basel, 2000.
- [14] K.I. Noor, Higher order close-to-convex functions, Math. Japon. 37, 1–8, 1992.
- [15] K.I. Noor, On a generalization of uniformly convex and related functions, Comp.
Math. Appl. 61, 117–125, 2011.
- [16] K.I. Noor and S.N. Malik, On a new class of analytic functions associated with conic
domain, Comput. Math. Appl. 62, 367–375, 2011.
- [17] K.I. Noor and S.N. Malik, On coefficient inequalities of functions associated with conic
domains, Comput. Math. Appl. 62, 2209–2217, 2011.
- [18] B. Pinchuk, Functions with bounded boundary rotation, Isr. J. Math. 10, 7–16, 1971.
- [19] R.K. Raina and P. Sharma, Subordination properties of univalent functions involving
a new class of operators, Electron. J. Math. Anal. Appl. 2 (1), 37–52, 2014.
- [20] F. Rønning, Uniformly convex functions and a corresponding class of starlike func-
tions, Proc. Amer. Math. Soc. 118, 189–196, 1993.
- [21] P. Sharma, R.K. Raina and J. Sokoł, Certain subordination results involving a class
of operators, Analele Univ. Oradea Fasc. Matematica, 21 (2), 89–99, 2014.