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Displaying 41 – 60 of 242

Cones of Lower Semicontinuous Functions and a Characterisation of Finely Hyperharmonic Functions.

Terry J. Lyons (1982)

Mathematische Annalen

Connected simple graphs and a selection problem

F. Burton Jones (1975)

Czechoslovak Mathematical Journal

Connectivity of diagonal products of Baire one functions

Aleksander Maliszewski (1994)

Fundamenta Mathematicae

We characterize those Baire one functions f for which the diagonal product x → (f(x), g(x)) has a connected graph whenever g is approximately continuous or is a derivative.

Connectivity points and Darboux points of real functions

Harvey Rosen (1975)

Fundamenta Mathematicae

Continuous-, derivative-, and differentiable-restrictions of measurable functions

Jack Brown (1992)

Fundamenta Mathematicae

We review the known facts and establish some new results concerning continuous-restrictions, derivative-restrictions, and differentiable-restrictions of Lebesgue measurable, universally measurable, and Marczewski measurable functions, as well as functions which have the Baire properties in the wide and restricted senses. We also discuss some known examples and present a number of new examples to show that the theorems are sharp.

Countable decomposition of derivatives and Baire 1 functions.

Darji, Udayan B. (1996)

Journal of Applied Analysis

Density Continuity versus Continuity.

K. Ciesielski, K. Ostaszewski (1990)

Forum mathematicum

Deux exemples de fonctions non mesurables

Zbigniew Grande (1979)

Colloquium Mathematicae

Die Elemente der Functionenlehre.

E. Heine (1872)

Journal für die reine und angewandte Mathematik

Discontinuity points of exactly $k$ -to-one functions

Jerzy Krzempek, Szymon Plewik (2004)

Acta Universitatis Carolinae. Mathematica et Physica

Eine Äquivalenzrelation in der Kategorie der Phasenfunktionen

Květomil Stach (1971)

Archivum Mathematicum

Eine Bermerkung über Stammfunktion und Zwischenwerteigenschaft.

Jürg Rätz (1980)

Elemente der Mathematik

Einiges über Functionen mit nicht-abzahlbaren Unstetigkeitsstellen

T. Brodén (1901)

Mathematische Annalen

Finitely generated semigroups of continuous on [0,1]

Sam Young (1970)

Fundamenta Mathematicae

Fractional Iteration and a Generalised Abel's Equation in Two Variables

PHIL DIAMOND (1971)

Aequationes mathematicae

Function decompositions related to the Luzin N-property.

Nasyrov, F.S. (2004)

Sibirskij Matematicheskij Zhurnal

Functions characterized by images of sets

Krzysztof Ciesielski, Dikran Dikrajan, Stephen Watson (1998)

Colloquium Mathematicae

For non-empty topological spaces X and Y and arbitrary families $𝒜$ ⊆ $𝒫 (X)$ and $ℬ \subseteq 𝒫 (Y)$ we put $𝒞_{𝒜, ℬ}$ =f ∈ $Y^{X}$ : (∀ A ∈ $𝒜$ )(f[A] ∈ $ℬ)$ . We examine which classes of functions $ℱ$ ⊆ $Y^{X}$ can be represented as $𝒞_{𝒜, ℬ}$ . We are mainly interested in the case when $ℱ = 𝒞 (X, Y)$ is the class of all continuous functions from X into Y. We prove that for a non-discrete Tikhonov space X the class $ℱ = 𝒞$ (X,ℝ) is not equal to $𝒞_{𝒜, ℬ}$ for any $𝒜$ ⊆ $𝒫 (X)$ and $ℬ$ ⊆ $𝒫$ (ℝ). Thus, $𝒞$ (X,ℝ) cannot be characterized by images of sets. We also show that none of the following classes of...

Generalized distributivity for real, continuous functions. II: Local solutions in the continuous case.

Anders Lundberg (1985)

Aequationes mathematicae

Grundlagen für eine Theorie der Functionen einer veränderlichen rellen Grösse [Book]

Ulisse Dini (1892)

How smooth is almost every function in a Sobolev space?

Aurélia Fraysse, Stéphane Jaffard (2006)

Revista Matemática Iberoamericana

We show that almost every function (in the sense of prevalence) in a Sobolev space is multifractal: Its regularity changes from point to point; the sets of points with a given Hölder regularity are fractal sets, and we determine their Hausdorff dimension.

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