Results 281 to 290 of about 35,490 (309)
Certain inequalities related with Hankel and Toeplitz determinant for q-starlike functions. [PDF]
HeliyonGul I, Al-Sa'di S, Hussain S, Noor S.
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Coefficient Estimate for a Subclass of Univalent Functions with Respect to Symmetric Points
, 2010 Qinghua Xu, Guang-Ping Wu
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Differential subordination and superordination results for p-valent analytic functions associated with (r,k)-Srivastava fractional integral calculus. [PDF]
MethodsXTayyah AS, Atshan WG.
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S100PBP interacts with nucleoporin TPR and facilitates XY crossover formation in mice. [PDF]
EMBO RepWu Y +14 more
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Mathematics of Operations Research, 1983
When a mapping is univalent (one-to-one) on a set is a question which has received considerable study. Much of the recent research has focused on the shape of the set on which the mapping is defined. It has been suggested, in fact, that the set must be convex for univalence to hold. This paper presents conditions under which the set need not be convex.
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When a mapping is univalent (one-to-one) on a set is a question which has received considerable study. Much of the recent research has focused on the shape of the set on which the mapping is defined. It has been suggested, in fact, that the set must be convex for univalence to hold. This paper presents conditions under which the set need not be convex.
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Canadian Journal of Mathematics, 1970
In what follows, we suppose that ƒ(z) = Σ0∞anzn is regular for |z| < 1. LetandThen (see, for example, [6, pp. 235-236]), for 0 ≦ r < ρ < 1, we have:The following results are well known.
Başgöze, T. +2 more
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In what follows, we suppose that ƒ(z) = Σ0∞anzn is regular for |z| < 1. LetandThen (see, for example, [6, pp. 235-236]), for 0 ≦ r < ρ < 1, we have:The following results are well known.
Başgöze, T. +2 more
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Univalent logharmonic mappings
1987Univalent logharmonic mappings (in the author's sense) are univalent solutions of the nonlinear elliptic partial differential equation \[ \overline{f_ z(z)}=a(z)(\overline{f(z)}/f(z))f_ z(z), \] where a(z) is an analytic function in the plane domain U and \(| a(z)|
Abdulhadi, Z., Hengartner, Walter
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1971
PhD ; Mathematics ; University of Michigan, Horace H. Rackham School of Graduate Studies ; http://deepblue.lib.umich.edu/bitstream/2027.42/187047/2/7214968 ...
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PhD ; Mathematics ; University of Michigan, Horace H. Rackham School of Graduate Studies ; http://deepblue.lib.umich.edu/bitstream/2027.42/187047/2/7214968 ...
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