ON THE DECOMPOSITION OF CONTINUOUS FUNCTIONS AND DIMENSIONS

In this paper, we consider decomposition of continuous functions in [Formula: see text] in terms of Hausdorff dimension and lower box dimension. Precisely, we show that, given real numbers [Formula: see text], any real-valued continuous function in [Formula: see text] can be decomposed into a sum of two real-valued continuous functions each having a graph of Hausdorff dimension [Formula: see text] and lower box dimension [Formula: see text]. This generalizes a theorem of Wingren, also Wu and the present author. We also consider the arbitrary decomposition of continuous functions in terms of Hausdorff dimension and lower box dimension.

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SOME REMARKS ON FRACTIONAL INTEGRAL OF ONE-DIMENSIONAL CONTINUOUS FUNCTIONS

Fractals ◽

10.1142/s0218348x2050005x ◽

2020 ◽

Vol 28 (01) ◽

pp. 2050005

Author(s):

JIA YAO ◽

YING CHEN ◽

JUNQIAO LI ◽

BIN WANG

Keyword(s):

Continuous Function ◽

Fractional Integral ◽

Continuous Functions ◽

Box Dimension ◽

Positive Order ◽

One Dimensional ◽

Katugampola Fractional Integral ◽

Hadamard Fractional Integral

In this paper, we make research on Katugampola and Hadamard fractional integral of one-dimensional continuous functions on [Formula: see text]. We proved that Katugampola fractional integral of bounded and continuous function still is bounded and continuous. Box dimension of any positive order Hadamard fractional integral of one-dimensional continuous functions is one.

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DIMENSION ANALYSIS OF CONTINUOUS FUNCTIONS WITH UNBOUNDED VARIATION

Fractals ◽

10.1142/s0218348x1730001x ◽

2017 ◽

Vol 25 (01) ◽

pp. 1730001 ◽

Cited By ~ 17

Author(s):

JUN WANG ◽

KUI YAO

Keyword(s):

Hausdorff Dimension ◽

Fractal Dimensions ◽

Continuous Functions ◽

Packing Dimension ◽

Box Dimension ◽

Box Counting ◽

Dimension Analysis ◽

Box Counting Dimension ◽

Self Similar

In this paper, we mainly discuss fractal dimensions of continuous functions with unbounded variation. First, we prove that Hausdorff dimension, Packing dimension and Modified Box-counting dimension of continuous functions containing one UV point are [Formula: see text]. The above conclusion still holds for continuous functions containing finite UV points. More generally, we show the result that Hausdorff dimension of continuous functions containing countable UV points is [Formula: see text] also. Finally, Box dimension of continuous functions containing countable UV points has been proved to be [Formula: see text] when [Formula: see text] is self-similar.

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Classical Analysis

Reverse Mathematics ◽

10.23943/princeton/9780691196411.003.0003 ◽

2019 ◽

pp. 51-69

Author(s):

John Stillwell

Keyword(s):

Continuous Function ◽

Continuous Functions ◽

Uniform Continuity ◽

Cantor Set ◽

Binary Trees ◽

Real Numbers ◽

Limit Concept ◽

Closed Intervals ◽

Basic Concepts

This chapter explores the basic concepts that arise when real numbers and continuous functions are studied, particularly the limit concept and its use in proving properties of continuous functions. It gives proofs of the Bolzano–Weierstrass and Heine–Borel theorems, and the intermediate and extreme value theorems for continuous functions. Also, the chapter uses the Heine–Borel theorem to prove uniform continuity of continuous functions on closed intervals, and its consequence that any continuous function is Riemann integrable on closed intervals. In several of these proofs there is a construction by “infinite bisection,” which can be recast as an argument about binary trees. Here, the chapter uses the role of trees to construct an object—the so-called Cantor set.

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Good’s theorem for Hurwitz continued fractions

International Journal of Number Theory ◽

10.1142/s1793042120500761 ◽

2020 ◽

Vol 16 (07) ◽

pp. 1433-1447

Author(s):

Gerardo Gonzalez Robert

Keyword(s):

Hausdorff Dimension ◽

Complex Plane ◽

Continued Fractions ◽

Continued Fraction ◽

Analogous Result ◽

Complex Numbers ◽

Real Numbers ◽

Dimension Formula

Good’s Theorem for regular continued fraction states that the set of real numbers [Formula: see text] such that [Formula: see text] has Hausdorff dimension [Formula: see text]. We show an analogous result for the complex plane and Hurwitz Continued Fractions: the set of complex numbers whose Hurwitz Continued fraction [Formula: see text] satisfies [Formula: see text] has Hausdorff dimension [Formula: see text], half of the ambient space’s dimension.

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MULTIFRACTAL ANALYSIS OF ONE-DIMENSIONAL BIASED WALKS

Fractals ◽

10.1142/s0218348x18500305 ◽

2018 ◽

Vol 26 (03) ◽

pp. 1850030 ◽

Cited By ~ 6

Author(s):

YUFEI CHEN ◽

MEIFENG DAI ◽

XIAOQIAN WANG ◽

YU SUN ◽

WEIYI SU

Keyword(s):

Random Walk ◽

Hausdorff Dimension ◽

Multifractal Analysis ◽

Infinite Sequence ◽

Real Numbers ◽

One Dimensional ◽

Dimension Formula ◽

Sum Of Digits ◽

Packing Dimensions ◽

Dyadic System

For an infinite sequence [Formula: see text] of [Formula: see text] and [Formula: see text] with probability [Formula: see text] and [Formula: see text], we mainly study the multifractal analysis of one-dimensional biased walks. Let [Formula: see text] and [Formula: see text]. The Hausdorff and packing dimensions of the sets [Formula: see text] are [Formula: see text], which is the development of the theorem of Besicovitch [On the sum of digits of real numbers represented in the dyadic system, Math. Ann. 110 (1934) 321–330] on random walk, saying that: For any [Formula: see text], the set [Formula: see text] has Hausdorff dimension [Formula: see text].

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Invariant subsets of expanding mappings of the circle

Ergodic Theory and Dynamical Systems ◽

10.1017/s0143385700004247 ◽

1987 ◽

Vol 7 (4) ◽

pp. 627-645 ◽

Cited By ~ 19

Author(s):

Mariusz Urbański

Keyword(s):

Continuous Function ◽

Hausdorff Dimension ◽

Continuous Mapping ◽

Continuous Functions ◽

Compact Interval ◽

Hölder Continuous ◽

One Dimensional ◽

Piecewise Monotone ◽

Hölder Continuous Functions ◽

Expanding Mapping

AbstractThe continuity of Hausdorff dimension of closed invariant subsetsKof aC2-expanding mappinggof the circle is investigated. Ifg/Ksatisfies the specification property then the equilibrium states of Hölder continuous functions are studied. It is proved that iffis a piecewise monotone continuous mapping of a compact interval and φ a continuous function withP(f,φ)> sup(φ), then the pressureP(f,φ) is attained on one-dimensional ‘Smale's horseshoes’, and some results of Misiurewicz and Szlenk [M−Sz] are extended to the case of pressure.

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THE EFFECTS OF THE RIEMANN–LIOUVILLE FRACTIONAL INTEGRAL ON THE BOX DIMENSION OF FRACTAL GRAPHS OF HÖLDER CONTINUOUS FUNCTIONS

Fractals ◽

10.1142/s0218348x20500528 ◽

2020 ◽

Vol 28 (03) ◽

pp. 2050052

Author(s):

JUNRU WU

Keyword(s):

Continuous Function ◽

Fractional Integral ◽

Closed Interval ◽

Open Interval ◽

Continuous Functions ◽

Box Dimension ◽

Hölder Continuous ◽

Positive Order ◽

Lipschitz Continuous ◽

Hölder Continuous Functions

In this paper, the linearity of the dimensional-decrease effect of the Riemann–Liouville fractional integral is mainly explored. It is proved that if the Box dimension of the graph of an [Formula: see text]-Hölder continuous function is greater than one and the positive order [Formula: see text] of the Riemann–Liouville fractional integral satisfies [Formula: see text], the upper Box dimension of the Riemann–Liouville fractional integral of the graph of this function will not be greater than [Formula: see text]. Furthermore, it is proved that the Riemann–Liouville fractional integral of a Lipschitz continuous function defined on a closed interval is continuously differentiable on the corresponding open interval.

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RELATIONSHIP BETWEEN UPPER BOX DIMENSION OF CONTINUOUS FUNCTIONS AND ORDERS OF WEYL FRACTIONAL INTEGRAL

Fractals ◽

10.1142/s0218348x20502230 ◽

2021 ◽

Author(s):

H. B. GAO ◽

Y. S. LIANG ◽

W. XIAO

Keyword(s):

Fractal Dimension ◽

Continuous Function ◽

Bounded Variation ◽

Fractional Integral ◽

Continuous Functions ◽

Fractional Integrals ◽

Box Dimension ◽

Hölder Continuous ◽

Dimension One ◽

Weyl Fractional Integral

In this paper, we mainly investigate relationship between fractal dimension of continuous functions and orders of Weyl fractional integrals. If a continuous function defined on a closed interval is of bounded variation, its Weyl fractional integral must still be a continuous function with bounded variation. Thus, both its Weyl fractional integral and itself have Box dimension one. If a continuous function satisfies Hölder condition, we give estimation of fractal dimension of its Weyl fractional integral. If a Hölder continuous function is equal to 0 on [Formula: see text], a better estimation of fractal dimension can be obtained. When a function is continuous on [Formula: see text] and its Weyl fractional integral is well defined, a general estimation of upper Box dimension of Weyl fractional integral of the function has been given which is strictly less than two. In the end, it has been proved that upper Box dimension of Weyl fractional integrals of continuous functions is no more than upper Box dimension of original functions.

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BOX DIMENSION OF HADAMARD FRACTIONAL INTEGRAL OF CONTINUOUS FUNCTIONS OF BOUNDED AND UNBOUNDED VARIATION

Fractals ◽

10.1142/s0218348x17500359 ◽

2017 ◽

Vol 25 (03) ◽

pp. 1750035 ◽

Cited By ~ 7

Author(s):

XIAO ER WU ◽

JUN HUAI DU

Keyword(s):

Fractal Dimension ◽

Hausdorff Dimension ◽

Bounded Variation ◽

Fractional Integral ◽

Continuous Functions ◽

Functions Of Bounded Variation ◽

Box Dimension ◽

Definition Of ◽

Hadamard Fractional Integral ◽

Variation Point

The present paper investigates fractal dimension of Hadamard fractional integral of continuous functions of bounded and unbounded variation. It has been proved that Hadamard fractional integral of continuous functions of bounded variation still is continuous functions of bounded variation. Definition of an unbounded variation point has been given. We have proved that Box dimension and Hausdorff dimension of Hadamard fractional integral of continuous functions of bounded variation are [Formula: see text]. In the end, Box dimension and Hausdorff dimension of Hadamard fractional integral of certain continuous functions of unbounded variation have also been proved to be [Formula: see text].

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Almost Somewhat Near Continuity and Near Regularity

Moroccan Journal of Pure and Applied Analysis ◽

10.2478/mjpaa-2021-0009 ◽

2021 ◽

Vol 7 (1) ◽

pp. 88-99

Author(s):

Zanyar A. Ameen

Keyword(s):

Continuous Function ◽

Continuous Functions ◽

One To One ◽

Nearly Continuous

AbstractThe notions of almost somewhat near continuity of functions and near regularity of spaces are introduced. Some properties of almost somewhat nearly continuous functions and their connections are studied. At the end, it is shown that a one-to-one almost somewhat nearly continuous function f from a space X onto a space Y is somewhat nearly continuous if and only if the range of f is nearly regular.

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