JAEM 2014, Vol 4, No 1JAEM 2014, Vol 4, No 1 koleksiyonunu içerir.https://hdl.handle.net/11729/23942024-03-28T13:21:35Z2024-03-28T13:21:35ZSufficient conditions for generalized Sakaguchi type functions of order βMathur, A. TrilokMathur, RuchiSinha, C. Deepahttps://hdl.handle.net/11729/25272021-06-29T12:31:45Z2014-01-01T00:00:00ZSufficient conditions for generalized Sakaguchi type functions of order β
Mathur, A. Trilok; Mathur, Ruchi; Sinha, C. Deepa
In this paper, we obtain some sufficient conditions for generalized Sakaguchi type function of order β, defined on the open unit disk. Many interesting outcomes of our results are also calculated.
2014-01-01T00:00:00ZDomination integrity of total graphsVaidya, Samir K.Shah, Nirav H.https://hdl.handle.net/11729/25262021-06-29T12:24:06Z2014-01-01T00:00:00ZDomination integrity of total graphs
Vaidya, Samir K.; Shah, Nirav H.
The domination integrity of a simple connected graph G is a measure of vulnerability of a graph. Here we determine the domination integrity of total graphs of path Pn, cycle Cn and star K1,n.
2014-01-01T00:00:00ZHarmonic mappings related to the convex functionsYemişci, ArzuPolatoğlu, Yaşarhttps://hdl.handle.net/11729/25252021-06-29T12:24:27Z2014-01-01T00:00:00ZHarmonic mappings related to the convex functions
Yemişci, Arzu; Polatoğlu, Yaşar
The main purpose of this paper is to give the extent idea which was introduced by R. M. Robinson [5]. One of the interesting application of this extent idea is an investigation of the class of harmonic mappings related to the convex functions.
2014-01-01T00:00:00ZSome results on a subclass of harmonic mappings of order alphaVarol, DürdaneAydoğan, Seher MelikeOwa, Shigeyoshihttps://hdl.handle.net/11729/25242024-01-18T23:33:03Z2014-01-01T00:00:00ZSome results on a subclass of harmonic mappings of order alpha
Varol, Dürdane; Aydoğan, Seher Melike; Owa, Shigeyoshi
Let SH be the class of harmonic mappings defined by SH = { f = h(z) + g(z)| h(z) = z + ∑∞ n=2 anzⁿ, g(z) = b1z + ∑∞ n=2 bnzⁿ, b1 < 1 } where h(z) and g(z) are analytic. Additionally f(z) ∈ SH(α) ⇔ | zh′ (z) − zg′(z) h(z) + g(z) − 1 − b1 1 + b1| < | 1 − b1 1 + b1| − α, z ∈ U, 0 ≤ α < 1 − b1 1 + b1 In the present work, by considering the analyticity of the functions defined by R. M. Robinson [7], we discuss the applications to the harmonic mappings.
2014-01-01T00:00:00Z