Results 331 to 340 of about 17,517,320 (360)

Generalized Conjugate Functions

Mathematische Operationsforschung und Statistik. Series Optimization, 1977
Conjugate functions introduced in nonlinear programming by Fenchel are closely connected with polarity with respect to a special hypersurface of the order two. In the paper a wider class of conjugate functions is considered, basing on the polarity with respect to a nondegenerate hypersurface φ of order two. Important properties of so-called φ-conjugate
Deumlich, R., Elster, K.-H.
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On a test of normality based on the empirical moment generating function

, 2016
We provide the lacking theory for a test of normality based on a weighted $$L^2$$ L 2 -statistic that employs the empirical moment generating function.
N. Henze, Stefan Koch
semanticscholar   +1 more source

GENERALIZED MEROMORPHIC FUNCTIONS

Russian Academy of Sciences. Izvestiya Mathematics, 1994
The autor continues his pioneering work on generalized meromorphic functions on the big plane generated by a compact Abelian group \(G\) with ordered dual group \(\Gamma\subset\mathbb{R}\). Here he presents the proofs of several of his previously announced results. Let \(G\) be a compact Abelian group with ordered dual group \(\Gamma\subset \mathbb{R}\)
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Some Generating Functions

Proceedings of the London Mathematical Society, 1933
Die Anzahl der linear-unabhängigen Seminvarianten (oder Kovarianten) vom Grade \(\delta\) und Gewichten \(\alpha,\beta,\gamma\) einer ternären Form \(a_x^n\) ist gleich dem Koeffizienten von \(y^\beta z^\gamma\) in der erzeugenden Funktion \[ (1 - y) (1 - z) (1 - \frac{z}{y}) \sum_{r+s=0}^n y^{r\delta} z^{s\delta} \mathop{{\prod}'}_{\rho+\sigma=0}^n ...
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Generalized Lipschitz Functions

Computational Methods and Function Theory, 2006
Lipschitz classes with variable exponents \(\text{Lip}_{\alpha(t)}\) are introduced. The exponents \({\alpha(t)}\) (called test functions) are supposed to be real-valued continuous functions defined in the right neighbourhood of zero satisfying the following conditions: \[ 1)\;{\alpha(t) = \alpha + o(1)},\;\alpha\in {\mathbb R};\quad 2) \;\int_{0}^{t} \
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Portfolio Generating Functions

SSRN Electronic Journal, 1998
A general method is presented for constructing dynamic equity portfolios through the use of mathematical generating functions. The return on these functionally generated portfolios is related to the return on the market portfolio by a stochastic differential equation.
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Harmonic generalized functions in generalized function algebras

Monatshefte für Mathematik, 2009
The analysis of properties of harmonic generalized functions within the framework of Colombeau theory is carried out. The authors present generalizations of the maximum principle and Liouville's theorem for harmonic generalized functions. The Dirichlet problem is solved by an application of the Poisson formula in the framework of generalized functions.
Pilipović, Stevan, Scarpalézos, Dimitris   +1 more
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Generating Functions for Hermite Functions

Canadian Journal of Mathematics, 1959
Hermite's function Hn(x) is denned for all complex values of x and n bywhere F (α; γ; x) is Kummer's function with the customary indices omitted. It satisfies the differential equation1.1of whichis a second solution. Every solution of (1.1) is an entire function.
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Generating Functions for Ultraspherical Functions

Canadian Journal of Mathematics, 1968
The ultraspherical function1.1for |1 — x| < 2 is a solution of the differential equation1.2This equation has two independent solutions; of the two, only Pn(λ)(x) is analytic at x = 1, aside for some special values of λ, which we shall not consider.
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Fractional-order Kalman filters for continuous-time linear and nonlinear fractional-order systems using Tustin generating function

International Journal of Control, 2019
Zhe Gao
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