2016
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2
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97
Fekete–Szegő Inequalities for Certain Subclasses of Starlike and Convex Functions of Complex Order Associated with Quasisubordination
2
2
In this paper, we find FeketeSzeg¨o bounds for a generalized class $mathcal{M}^{delta, lambda}_{q}(gamma, varphi).$ Also, we discuss some remarkable results.
1

112
119


Nanjundan
Magesh
PostGraduate and Research Department of Mathematics, Government Arts
College for Men, Krishnagiri 635001, Tamilnadu, India.
PostGraduate and Research Department of
India
nmagi_2000@yahoo.co.in


V. K.
Balaji
Department of Mathematics, L.N. Govt. College Ponneri, Chennai, Tamilnadu, India.
Department of Mathematics, L.N. Govt. College
India
balajilsp@yahoo.co.in


C.
Abirami
Faculty of Engineering and Technology, SRM University, Kattankulathur
603203, Tamilnadu, India.
Faculty of Engineering and Technology, SRM
India
shreelekha07@yahoo.com
univalent functions
starlike of MaMinda type and convex of MaMinda type
majorization and quasisubordination
On Some Fractional Integral Inequalities of HermiteHadamard Type for $r$Preinvex Functions
2
2
In this paper, we prove HermiteHadamard type inequalities for $r$preinvexfunctions via fractional integrals. The results presented here would provideextensions of those given in earlier works.
1

120
127


Abdullah
Akkurt
Department of Mathematics, Faculty of Science and Arts, University of
Kahramanmaraş Sütçü İmam, 46100, Kahramanmaraş, Turkey.
Department of Mathematics, Faculty of Science
Turkey
abdullahmat@gmail.com


Hüseyin
Yildirim
Department of Mathematics, Faculty of Science and Arts, University of
Kahramanmaraş Sütçü İmam, 46100, Kahramanmaraş, Turkey.
Department of Mathematics, Faculty of Science
Turkey
hyildir@ksu.edu.tr
integral inequalities
Fractional integrals
HermiteHadamard inequality
preinvex functions
Bergman Kernel Estimates and Toeplitz Operators on Holomorphic Line Bundles
2
2
We characterize operatortheoretic properties(boundedness, compactness, and Schatten class membership) of Toeplitzoperators with positive measure symbols on Bergman spaces of holomorphic hermitian line bundles over Kähler CartanHadamard manifolds in terms of geometric or operatortheoretic properties of measures.
1

128
167


Said
Asserda
Ibn tofail University, Faculty of Sciences, Department of Mathematics,
P.O.Box 242, Kenitra, Morocco.
Ibn tofail University, Faculty of Sciences,
Morocco
asserdasaid@univibntofail.ac.ma
Toeplitz operator
Bergman space
line bundle
Schatten class
Geodesic Flows on the Quotient of the Upper Half Plane over the Hecke Group
2
2
The Hecke group $G_alpha$ is a family of discrete subgroups of$PSL(2,,mathbb{R})$. The quotient space of the action of$G_alpha$ on the upper half plane gives a Riemann surface. Thegeodesic flows on this surface are ergodic. Here, by constructinga phase space for the geodesic flows hitting an appropriate crosssection, we find the arithmetic code of these flows and showthat their code space is a topological Markov chain.
1

168
176


Sanaz
Lamei
Faculty of Mathematical Sciences, University of Guilan, P.O.Box 1914,
Rasht, Iran.
Faculty of Mathematical Sciences, University
Iran
lamei@guilan.ac.ir
Hecke group
geodesic flow
arithmetic coding
Anisotropic HerzMorrey Spaces with Variable Exponents
2
2
In this paper, the authors introduce the anisotropic HerzMorrey spaces with two variableexponents and obtain some properties of these spaces. Subsequently as an application, the authors give some boundedness on the anisotropic HerzMorrey spaces with two variable exponents for a class of sublinearoperators, which extend some known results.
1

177
187


Hongbin
Wang
School of Mathematical Sciences,, University of Chinese Academy of Sciences,, Beijing 100049, China;
School of Science, Shandong University of Technology, Zibo 255049, China.
School of Mathematical Sciences,, University
China
wanghb@sdut.edu.cn


Yihong
Wu
Department of Recruitment and Employment, Zibo Normal College, Zibo
255130, China.
Department of Recruitment and Employment,
China
wfapple123456@163.com
Anisotropic HerzMorrey space
variable exponent
boundedness
sublinear operator
Eisenhart Problem to Submanifolds in NonFlat Real Space Form
2
2
We apply the Eisenhart problem to study the geometric properties ofsubmanifold $M$ of nonflat real space form. It is shown that $M$ is a hypersphere $S^{3}$ when $sigma$ is parallel. When $sigma$ is either semiparallel or recurrent, then $M$ is either an extrinsic sphere and normal flat or mean curvature vector is parallel in the normal space, respectively.
1

188
193


Mundalamane Manjappa
Praveena
Department of Mathematics, Kuvempu University, Shankaraghatta  577 451,
Shimoga, Karnataka, India.
Department of Mathematics, Kuvempu University,
India
mmpraveenamaths@gmail.com


Channabasappa Shanthappa
Bagewadi
Department of Mathematics, Kuvempu University, Shankaraghatta  577 451,
Shimoga, Karnataka, India.
Department of Mathematics, Kuvempu University,
India
prof_bagewadi@yahoo.co.in
Real space forms
submanifolds
parallel second order covariant tensor field
recurrent
On the Sharp Bounds for a Comprehensive Class of Analytic and Univalent Functions by Means of Chebyshev Polynomials
2
2
In this paper, we obtain initial coefficient bounds for functions belong toa comprehensive subclass of univalent functions by using the Chebyshevpolynomials and also we find FeketeSzeg"{o} inequalities for this class.All results are sharp.
1

194
200


Serap
Bulut
Kocaeli University, Faculty of Aviation and Space Sciences, Arslanbey Campus, 41285 KartepeKocaeli, TURKEY.
Kocaeli University, Faculty of Aviation and
Turkey
bulutserap@yahoo.com


Nanjundan
Magesh
P. G. and Research Department of Mathematics, Govt Arts College for
Men, Krishnagiri635001, India.
P. G. and Research Department of Mathematics,
India
nmagi_2000@yahoo.co.in
Analytic functions
univalent functions
coefficient bounds
Chebyshev polynomial
FeketeSzeg"{o} problem
Composition Operators on Weighted BergmanNevanlinna Spaces with Admissible Weights
2
2
A nonnegative, nonincreasing integrable function $omega$ is an admissible weight if $omega(r)/(1  r)^{1 + gamma}$ is nondecreasing for some $gamma > 0$ and $lim_{r to 1} omega(r) = 0.$ In this paper, we characterize boundedness and compactness of composition operators on weighted BergmanNevanlinna spaces with admissible weights.
1

201
208


Ajay
Sharma
Department of Mathematics, Shri Mata Vaishno Devi University, Kakryal,
Katra182320, J&K, India.
Department of Mathematics, Shri Mata Vaishno
India
aksju_76@yahoo.com


Elina
Subhadarsini
Department of Mathematics, Shri Mata Vaishno Devi University, Kakryal,
Katra182320, J&K, India.
Department of Mathematics, Shri Mata Vaishno
India
elinamaths@gmail.com
Composition operator
weighted Bergman Nevanlinna space
Carleson measure
vanishing Carleson measure