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Functional Analysis and Its Applications, 2003
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Schechter, M., Zou, W.
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Schechter, M., Zou, W.
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On Functions Bounded by Karamata Functions
Journal of Mathematical Sciences, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Cadena, M., Kratz, M., Omey, Edward
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On Bounded Universal Functions
Computational Methods and Function Theory, 2012Let \(K\subset\mathbb{C}\) be a compact set. By \(K^c\) denote the complement of \(K\). In the paper under review, the author investigates boundedness properties of some universal functions. Let \((a_n)_{n\in\mathbb{N}}\) be an unbounded sequence in \(\mathbb{C}\).
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From Functional “Mess” to Bounded Functionality
Minds and Machines, 2001Summary: Some evolutionary psychologists contend that the best way to discover the functions of our present psychological systems is by appealing to the notion of functional mesh, that is, the assumed tight fit between a trait's design and the adaptive problem it is supposed to solve.
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Bounds for Preference Function Assessment
Management Science, 1975It is well known that when an individual assesses a preference (utility) function, the set of assessed gambles and certainty equivalents is often inconsistent and, if consistent, many preference functions may satisfy the assessments. Mathematical programming is employed to examine properties that might be useful in a sequential determination of the ...
Stephen P. Bradley +1 more
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1992
Liouville’s Theorem in complex analysis states that a bounded holo-morphic function on C is constant. A similar result holds for harmonic functions on R n . The simple proof given below is taken from Edward Nelson’s paper [7], which is one of the rare mathematics papers not containing a single mathematical symbol.
Sheldon Axler, Paul Bourdon, Wade Ramey
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Liouville’s Theorem in complex analysis states that a bounded holo-morphic function on C is constant. A similar result holds for harmonic functions on R n . The simple proof given below is taken from Edward Nelson’s paper [7], which is one of the rare mathematics papers not containing a single mathematical symbol.
Sheldon Axler, Paul Bourdon, Wade Ramey
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ON ASYMPTOTICALLY MONOGENIC BOUNDED FUNCTIONS
Mathematics of the USSR-Sbornik, 1987A function f defined in a domain \(D\subset {\mathbb{C}}\) is called semi- asymptotically monogenic at a point \(z_ 0\in D\) if there exists a derivative \(f(z_ 0)\) along a set of lower density greater than \(1/2\) at \(z_ 0.\) Theorem. If f is bounded in D and f is semi-asymptotical monogenic at all points of \(D\setminus e\), where e is a countable ...
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