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Conformal Radius Has Unique Critical Point when Pre-Schwarzian Derivative is Subordinate to Classical MajorantsAbstract: We obtain a number of the uniqueness criteria for the critical point of the conformal
Refinements and generalizations of majorization, favard and berwald-type inequalities via fink identity obtained from a Fink's identity as well as the refinements of the Favard-Berwald type inequalities by using
Extended Jensen's Functional for Diamond Integral via Hermite Polynomial for n-convex function is deduced from Jensen's inequality involving diamond integrals. Special Hermite
On Zipf-Mandelbrot entropy and 3-convex functions the n-exponential convexity and the log-convexity of the functions associated with the linear
Bifurcations and new uniqueness criteria for critical points of hyperbolic derivatives on curvature-type functionals. This class contains a one-parameter series of Epstein inequalities obtained from
On the Coefficients of Quasiconformality for Convex Functions computed the quantity kf(r) for some convex functions. These examples led them to the conjecture that kf (r
Generalizations of cyclic refinements of jensen's inequality by lidstone's polynomial with applications in information theory generalizations of cyclic refinements of Jensen's inequality using different new Green functions by employing
Subdifferentials of nonconvex integral functionals in banach spaces with applications to stochastic dynamic programmingThe paper concerns the investigation of nonconvex and nondifferentiable integral functionals
GENERALIZED STEFFENSEN-TYPE INEQUALITIES BY ABEL-GONTSCHAROFF POLYNOMIAL, we present mean value theorems and n-exponential convexity for these functionals. We also give
SKETCH OF THE THEORY OF GROWTH OF HOLOMORPHIC FUNCTIONS IN A MULTIDIMENSIONAL TORUSWe develop an approach to the theory of growth of the class H(Tn) of holomorphic functions in a
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