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Sufficient and necessary conditions are presented under which two given functions can be separated by a function Π-affine in Rodé sense (resp. Π-convex, Π-concave). As special cases several old and new separation theorems are obtained.

Accelero-summation of the formal solutions of nonlinear difference equations

Geertrui Klara Immink (2011)

Annales de l’institut Fourier

In 1996, Braaksma and Faber established the multi-summability, on suitable multi-intervals, of formal power series solutions of locally analytic, nonlinear difference equations, in the absence of “level $1^{+}$ ”. Combining their approach, which is based on the study of corresponding convolution equations, with recent results on the existence of flat (quasi-function) solutions in a particular type of domains, we prove that, under very general conditions, the formal solution is accelero-summable. Its sum...

Accomodation of zero-valued characteristic roots in the classical solution expression for linear, homogeneous, constant-coefficient, difference equations.

Johnson, C.D. (1996)

Mathematical Problems in Engineering

Accuracy of Several Multidimensional Refinable Distributions.

C. Heil, C. Cabrelli, U. Molter (2000)

The journal of Fourier analysis and applications [[Elektronische Ressource]]

Accurate solution estimates for nonlinear nonautonomous vector difference equations.

Medina, Rigoberto, Gil', M.I. (2004)

Abstract and Applied Analysis

Accurate solution estimates for vector difference equations.

Medina, Rigoberto (2003)

International Journal of Mathematics and Mathematical Sciences

Aczél's Uniqueness Theorem and Cellular Internity.

J.B. Miller (1970)

Aequationes mathematicae

Aczél's Uniqueness theorem and Cellular Internity. (Short Communication).

J.B. Miller (1970)

Aequationes mathematicae

Addendum to the article: Polylogarithms in the field of omega (a root of a given cubic): Functional equations and ladders.

L. Lewin, Xiao Hongnian, M. Abouzahra (1988)

Aequationes mathematicae

Addition Formulae for Field-Valued Continuous Functions on Topological Groups.

Christopher L. Morgan (1974)

Aequationes mathematicae

Addition theorems and related geometric problems of group representation theory

Ekaterina Shulman (2013)

Banach Center Publications

The Levi-Civita functional equation $f (g h) = \sum_{k = 1}^{n} u_{k} (g) v_{k} (h)$ (g,h ∈ G), for scalar functions on a topological semigroup G, has as the solutions the functions which have finite-dimensional orbits in the right regular representation of G, that is the matrix elements of G. In considerations of some extensions of the L-C equation one encounters with other geometric problems, for example: 1) which vectors x of the space X of a representation $g \mapsto T_{g}$ have orbits O(x) that are “close” to a fixed finite-dimensional subspace? 2) for...

Additive and convex functions in linear topological space.

Zbigniew Gajda (1984)

Aequationes mathematicae

Additive and subadditive entropies for discrete n-dimensional random vectors.

B. Forte, R. Gupta (1985)

Aequationes mathematicae

Additive f-bimorphisms and Cosine Type Equations

C.-S. Lin, Y.J. Cho (1997)

Publications de l'Institut Mathématique

Additive functional inequalities in Banach modules.

Park, Choonkil, An, Jong Su, Moradlou, Fridoun (2008)

Journal of Inequalities and Applications [electronic only]

Additive functions modulo a countable subgroup of ℝ

Nikos Frantzikinakis (2003)

Colloquium Mathematicae

We solve the mod G Cauchy functional equation f(x+y) = f(x) + f(y) (mod G), where G is a countable subgroup of ℝ and f:ℝ → ℝ is Borel measurable. We show that the only solutions are functions linear mod G.

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