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ASYMPTOTIC-BEHAVIOR OF SOLUTION TO ONE BOUNDARY-VALUE PROBLEM FOR HARMONIC-FUNCTIONS DEPENDING ON PARAMETERASYMPTOTIC-BEHAVIOR OF SOLUTION TO ONE BOUNDARY-VALUE PROBLEM FOR HARMONIC-FUNCTIONS DEPENDING
Mean Value Theorem for Harmonic Functions on Cayley TreeAn analog of the mean value theorem for harmonic functions on Cayley tree is proved in this paper
Application of harmonic analysis for the quantitative description of Earth surface topography to replace an empirical spatial series with a periodic function as a sum of waves with different frequencies
On the Bohr inequality with a fixed zero coefficient of the classical Bohr's inequality for bounded analytic functions and also for K-quasiconformal harmonic mappings
Optimal reconstruction of a harmonic function from inaccurate information on the values of the radial integration operator function harmonic in the unit ball from inaccurate values of the radial integration operator. Information
NEW BOUNDS FOR GENERALIZED TAYLOR EXPANSIONSWe give inequalities for higher order convex functions involving harmonic sequence of polynomials
On locally invertible harmonic mappings of plane domains harmonic mappings with certain prescribed boundary behavior in simply and multiply connected domains
Bohr–Rogosinski Inequalities for Bounded Analytic Functions of the Rogosinski inequality for analytic functions (Formula presented.) in the unit disk (Formula presented
A spherical dome in the temperature field with respect to solid spherical harmonics and trigonometric functions. © 2013 Allerton Press, Inc.
Certain integral inequalities associated with the strongly harmonic h-convex functionsWe study the concept of strongly harmonically h-convex functions and some examples and properties
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