This yields an analogue of paleys inequality for the fourier coefficients of periodic functions. Any function that is not periodic is called aperiodic. Note that the divisors of holomorphic almost periodic functions inherit. New results on positive almost periodic solutions for.
Glicksberg stanford university, university of notre dame, u. A new construction of the theory of almost periodic functions was provided by n. In this paper, a class of firstorder neutral differential equations with timevarying delays and coefficients is considered. In the measure theoretic case we characterize almost periodic functions with these concepts and in the topological case we show that weakly almost periodic functions are mean equicontinuous the converse does not hold. This paper develops a method for discrete computational fourier analysis of functions defined on quasicrystals and other almost periodic sets.
A various types of almost periodic functions on banach spaces. Even earlier, in 1893, the latvian mathematician p. In section 4, under matched spaces, through the basic properties of. Because the circle is a compact abelian group, fourier theory may be used to approximate the periodic function f by finite sums of characters.
Some results on the existence of positive almost periodic solutions for the equations are obtained by using the contracting mapping. Norm inequalities for the fourier coefficients of some almost. In the present book a systematic exposition of the results related to almost periodic solutions of impulsive differential equations is given and the potential for their application is illustrated. We also recollect some basic results regarding equiweyl almost periodic functions and weyl almost. The classical theory of continuous almost periodic functions on the real line was extended by frechet in 1941 14, 15, to the case of continuous almost periodic. In 1933, bochner published an important article devoted to extension of the theory of almost periodic functions on the real line with values in a banach space. Note that we obtain the most important case if x is a banach space, and that the theory of almost periodic functions of real variable with values in a banach space, given by bochner 3, is in its essential lines similar to the theory of classical almost. Averaging almostperiodic functions and finitedimensional unitary representations on free groups. Part 1 purely periodic functions and their fourier series part 2 the theory of almost periodic functions. More lacunary partition functions lovejoy, jeremy, illinois journal of mathematics, 2003. Like many other important mathmatical discoveries it is con nected with several branches of the modern theory of functions. In mathematics, an almost periodic function is, loosely speaking, a function of a real number that is periodic to within any desired level of accuracy, given suitably long, welldistributed almost periods. As such, it has been a challenge for constructive mathematicians to find a natural treatment of them.
Mean sensitive, mean equicontinuous and almost periodic. Weighted pseudo almost periodic functions and applications. This means that weighted pseudo almost periodic functions are good generalizations of the zhangas pseudo almost periodic functions. Pdf almost periodic functions, bohr compactification. Tempelman lithuanian mathematical journal volume 28, pages 332 335 1988cite this article. We study this notion in the topological and measure theoretic setting. Almost periodic functions and differential equations. Existence and global uniform asymptotic stability of almost periodic solutions for cellular neural networks with discrete and distributed delays hou, zongyi, zhu, hongying, and feng, chunhua, journal of applied mathematics, 20. Almostperiodic functions and functional equations springerlink. Newest almostperiodicfunction questions mathoverflow.
The almost periodic functions form a natural example of a nonseparable normed space. Let be the inner product of and let be the space of all almost periodic functions from to. On generalized almost periodic functions besicovitch. Special accent is put on the stepanov generalizations of almost periodic functions and asymptotically almost periodic functions.
A consequence of the definition of the classes of almostperiodic functions through the concept of closure is the approximation theorem. In the other direction, there exist almost periodic. In this note we consider multidimensional hartman almost. On the almost periodic solutions of differential equations. On generalized almost periodic functions besicovitch 1926. So, properties of diverse classes of almost periodic functions with values in banach spaces are considered. A key point is to build the analysis around the emerging theory of quasicrystals and diffraction in the setting on local hulls and dynamical systems. Levin in 23, where it was solved for entire almost periodic functions of exponential type on the plane with zeroes in a strip of. The theory of almost periodic functions with complex values, created by h. We also use the result for sequences to construct an almost periodic function whose. We study global reflection symmetries of almost periodic functions. In the nonlimit periodic case, we establish an upper bound on the haar measure of the set.
Feffermans embedding of a charge space in a measure space allows us to apply standard interpolation theorems to prove norm inequalities for besicovitch almost periodic functions. The theory of almost periodic functions was created and developed in its main features by bohr as a generalization of pure periodicity. A various types of almost periodic functions on banach. His groundbreaking work influenced many later mathematicians, who extended the theory in new and diverse directions. The problem of inner description for the divisors of holomorphic almost periodic functions has been raised by m. The main aim of this paper is to consider the classes of quasiasymptotically almost periodic functions and stepanov quasiasymptotically almost periodic functions in banach spaces. Almost periodic functions and differential equations lloyd. Pdf almost periodic functions, bohr compactification, and. Asymptotic almost periodic functions with range in a. A further study of almost periodic time scales with some notes and applications wang, chao and agarwal, ravi p.
Almost periodic function article about almost periodic. Then, we consider a class of neutral functional dynamic equations with stepanov almost periodic terms on time scales in a banach space. Almost periodic divisors, holomorphic functions, and. Almostperiodic function encyclopedia of mathematics. We also recollect some basic results regarding equiweylalmost periodic functions and weylalmost. Some of the worksheets below are free periodic functions worksheet, definition of periodic functions, examples and exercises, periodic functions cards, determine whether each function is or is not periodic, once you find your worksheets, you can either click on the popout icon or download button to print or download your desired. Prelude to periodic functions each day, the sun rises in an easterly direction, approaches some maximum height relative to the celestial equator, and sets in a westerly direction. Maniar, composition of pseudoalmost periodic functions and cauchy problems with operator of nondense domain, ann. Averaging almostperiodic functions and finitedimensional. Almost periodic functions on a locally compact abelian group. Almost periodic sequences and functions with given values.
New results on positive almost periodic solutions for first. Then we explore some properties of hausdorff almost periodic time scales and prove that the family of almost periodic functions on hausdorff almost periodic time scales. Basic properties of almost periodic functions springerlink. View the article pdf and any associated supplements and figures for a period of 48 hours. Recently, in 14, 35, the almost periodic functions and the uniformly almost periodic functions on time scales were presented and investigated, as applications, the existence of almost periodic solutions to a class of functional differential equations and neural networks were studied effectively see, 14, 35. Spaces of holomorphic almost periodic functions on a strip. In mathematics, a periodic function is a function that repeats its values in regular intervals or periods. Unlimited viewing of the articlechapter pdf and any associated supplements and figures. Almost periodic and asymptotically almost periodic functions.
The concept was first studied by harald bohr and later generalized by vyacheslav stepanov, hermann weyl and abram samoilovitch besicovitch, amongst others. A consequence of the definition of the classes of almost periodic functions through the concept of closure is the approximation theorem. The completion of is then a hilbert space with the inner product defined by first, we establish the relationship between the bohr transforms of the almost periodic solutions of and those of the inhomogeneity. Search for library items search for lists search for contacts search for a library. Norm inequalities for the fourier coefficients of some. Some results on the existence of positive almost periodic solutions for the equations are obtained by using the contracting mapping principle and the differential inequality technique. Computing with almost periodic functions moody 2008. It is not possible to give any direct test for a series to be the fourier series of an almost periodic function, nor can the similar problem be solved for the class of purely periodic con tinuous functions. Bohl studied a special case of almost periodic functionsquasiperiodic functions. Mandelbrojt mandelbrojt 1 can be considered as problems about mean periodic functions.
The pattern of the suns motion throughout the course of a year is a periodic function. Buy almost periodic functions and differential equations on free shipping on qualified orders. The class of asymptotically weylalmost periodic functions, introduced in this work, seems to be not considered elsewhere even in the. Introduction this paper is devoted to tile extension, to certain commutative topological semi groups, of the fundamental approximation theorem for almost periodic functions on groups. The notions of almost periodicity in the sense of weyl and besicovitch of the order p are extended to holomorphic functions on a strip.
Then we develop the almost periodic function theory on time scales, with examples given along the way. The most important examples are the trigonometric functions, which repeat over intervals of 2. In addition, an example is given to illustrate our results. Bohrs theory of analytic almost periodic functions of a complex variable, their dirichlet series and their behaviour in and on the boundary of a. The bohr compactum of a locally compact abelian group and almost periodic functions 2. F steinhardt mathematician harald bohr, motivated by questions about which functions could be represented by a dirichlet series, devised the theory of almost periodic functions during the 1920s. The theory of almost periodic functions was mainly created and published during 19241926 by the danish mathematician harold bohr.
Approximations of almost periodic functions by trigonometric polynomials and periodic functions 3. The heart of the book, his exploration of the theory of almost periodic functions, is supplemented by two appendixes that cover generalizations of almost periodic functions and almost periodic functions of a complete variable. Spaces of almost periodic functions and almost periodic operators 4. Almost periodic functions, bohr compactification, and differential equations article pdf available in milan journal of mathematics 661.
Almost periodic solution for neutral functional dynamic. The space b p of besicovitch almost periodic functions for p. Once bohr established his fundamental theorem, he was able to show that any continuous almost periodic function is the limit of a uniformly convergent sequence of trigonometric polynomials. Definitions 11 and 12, and theorems 24 and 28 is a sum of a finite number of irreducible representations, that is, there is the socalled. Definitions 11 and 12, and theorems 24 and 28 is a sum of a finite number of irreducible representations, that is, there is. Pdf almost periodic and asymptotically almost periodic functions. Almost periodic solutions of impulsive differential equations.
Pdf this paper is a survey of the basic properties of various type of almost periodic functions. The almost periodic functions on the real line can be characterized as uniform limits of trigonometric functions. Almost periodic functions pdf free download fox ebook. Spectral properties of weakly asymptotically almost periodic. If one quotients out a subspace of null functions, it can be identified with the space of l p functions on the bohr compactification of the reals. Bibliographical notes almost periodic functions on groups. We first propose a concept of almost periodic functions in the sense of stepanov on time scales. Almost periodic functions article about almost periodic. In mathematics, an almost periodic function is, loosely speaking, a function of a real number that is periodic to within any desired level of accuracy, given suitably long, welldistributed almostperiods. Mathematician harald bohr, motivated by questions about which functions could be represented by a dirichlet series, devised the theory of almost periodic functions during the 1920s. Still, there is a theorem which states that any uniformly continuous bounded meanperiodic function is almost periodic in the sense of bohr. Translation properties of time scales and almost periodic functions. Almost periodic functions and functional equations the. Almost periodic and asymptotically almost periodic.
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