ℓ1-summability of higher-dimensional Fourier series

It is proved that the maximal operator of the ${?}_1$-Fejér means of a $d$-dimensional Fourier series is bounded from the periodic Hardy space $H_p\left({\mathbb{T}}^d\right)$ to $L_p\left({\mathbb{T}}^d\right)$ for all $d/(d+1)<p\le \infty$ and, consequently, is of weak type (1, 1). As a consequence we obtain that the ${?}_1$-Fejér means of a function $f\in L_1\left({\mathbb{T}}^d\right)$ converge a.e. to $f$. Moreover, we prove that the ${?}_1$-Fejér means are uniformly bounded on the spaces $H_p\left({\mathbb{T}}^d\right)$ and so they converge in norm $(d/(d+1)<p<\infty )$. Similar results are shown for conjugate functions and for a general summability method, called $\theta$-summability. Some special cases of the ${?}_1–\theta$-summation are considered, such as the Weierstrass, Picard, Bessel, Fejér, de la Vallée Poussin, Rogosinski and Riesz summations.     

Universality properties of Walsh–Fourier series

It is shown that Walsh–Fourier series of \(W\) -continuous functions can have maximal sets of limit functions on small subsets of the unit interval.     

Everywhere divergent Φ-means of Fourier series

For a function ? ∈, L ¹( $\mathbb{T}$ ), we investigate the sequence (C, 1) of mean values Φ(¦S _k (x, ?) ? ?(x)¦), where Φ(t): [0, +∞) → [0,+∞), Φ(0) = 0, is a continuous increasing function. We prove that if Φ increases faster than exponentially, then these means can diverge everywhere. Divergence almost everywhere of such means was established earlier.     

Hyperbolic Fourier coefficients of Poincaré series

The Ramanujan Journal - Poincaré (Ann Fac Sci Toulouse Sci Math Sci Phys 3:125–149, 1912) and Petersson (Acta Math 58(1):169–215, 1932) gave the now classical expression for the...     

Nörlund summability of Fourier series and its conjugate series

Summary In this paper the author has obtained two theorems for the N?rlund summability of Fourier series and its conjugate series respectively under very general conditions.     

Weak type inequalities for the ℓ 1-summability of higher dimensional Fourier transforms

Under some weak conditions on θ, it was verified in [21, 17] that the maximal operator of the ? ₁-θ-means of a tempered distribution is bounded from H _p (? ^d ) to L _p (? ^d ) for all d/(d + α) < p ≤ ∞, where 0 < α ≤ 1 depends only on θ. In this paper, we prove that the maximal operator is bounded from H _d/(d+α)(? ^d ) to the weak L _d/(d+α)(? ^d ) space. The analogous result is given for Fourier series, as well. Some special cases of the ? ₁-θ-summation are considered, such as the Weierstrass, Picard, Bessel, Fejér, de La Vallée-Poussin, Rogosinski and Riesz summations.     

Marcinkiewicz-type strong means of Fourier—Laplace series

We obtain estimates for Marcinkiewicz-type strong means of the Fourier—Laplace series of continuous functions in terms of the best approximations.Translated from Ukrainskyi Matematychnyi Zhurnal, Vol. 56, No. 6, pp. 763–773, June, 2004.     

Fourier coefficients of logarithmic vector-valued Poincaré series

We give an exact expression (Theorem 3.2) for the Fourier coefficients of logarithmic vector-valued Poincaré series associated to representations where \(\rho (T)\) is a single Jordan block.     

Properties of Cesàro means of double Fourier series

The pointwise behavior of partial sums and Cesàro means of trigonometric series were studied in many papers. This paper deals with the behavior of rectangular Cesàro means at a point (x ₀, y ₀) for functions f(x, y) bounded in the square [?π; π]² and satisfying the condition |f(x ₀ + s, y ₀ + t) ? f(x ₀, y ₀)| ≤ ρ $ \left( {\sqrt {s^2 + t^2 } } \right) $ ^α , for some α ∈ (0, 1) and all s and t.     

Adaptive Fourier series—a variation of greedy algorithm

We study decomposition of functions in the Hardy space \(H^2(\mathbb{D} )\) into linear combinations of the basic functions (modified Blaschke products) in the system

$\label{Walsh like} {B}_n(z)= \frac{\sqrt{1-|a_n|^2}}{1-\overline{a}_{n}z}\prod\limits_{k=1}^{n-1}\frac{z-a_k}{1-\overline{a}_{k}z}, \quad n=1,2,..., $

(1)

where the points a _n ’s in the unit disc \(\mathbb{D}\) are adaptively chosen in relation to the function to be decomposed. The chosen points a _n ’s do not necessarily satisfy the usually assumed hyperbolic non-separability condition

$\label{condition} \sum\limits_{k=1}^\infty (1-|a_k|)=\infty $

(2)

in the traditional studies of the system. Under the proposed procedure functions are decomposed into their intrinsic components of successively increasing non-negative analytic instantaneous frequencies, whilst fast convergence is resumed. The algorithm is considered as a variation and realization of greedy algorithm.

     

On the mean convergence of Fourier–Jacobi series

The convergence of Fourier–Jacobi series in the spaces L _p,A,B is studied in the case where the Lebesgue constants are unbounded.     

The Hölder exponent of some Fourier series

In this paper we study the local regularity of fractional integrals of Fourier series using several definitions of the Hölder exponent. We especially consider series coming from fractional integrals of modular forms. Our results show that in general, cusp forms give rise to pure fractals (as opposed to multifractals). We include explicit examples and computer plots.     

Ramanujan — Fourier series and a theorem of Ingham

Given two arithmetical functions f, g, we derive, under suitable conditions, asymptotic formulas for the convolution sums ∑ _n≤N f (n) _g (n + h) for a fixed number h. To this end, we develop the theory of Ramanujan expansions for arithmetical functions. Our results give new proofs of some old results of Ingham proved by him in 1927 using different techniques.     

On absolute convergence of Haar—Fourier series of superpositions of functions

В работе решены некот орые задачи, поставле нные П. Л. Ульяновым [5]. ПустьA _χ обозначает мн ожество тех функций?∈L(0, l), ряды Фурье которых вс юду абсолютно сходятся. Если? — вещественная функция на интервале [a, b], то для того, чтобы для каж дой?∈A _χ удовлетворяющей ус ловиюa≦?(t)≦b, 0≦t≦1, выполнялось включен ие?○?∈A _χ , необходимо и достато чно, чтобы? была лине йной функцией, т.е.?(x)=cx+d,x∈[a,b], гдеc иd — вещественны е постоянные. То же самое утвержден ие остается в силе, есл и заменить классA _? наA _χ ?C[0, 1]. Пусть далее? непреры вно дифференцируема я функция на [a,b]. Если некоторый мо дуль непрерывностиω и мод уль непрерывностиω(δ;?′) удовлетворяют услов ию \(\sum\limits_{n = 0}^\infty {\omega (\omega (2^{ - n} } ;\varphi '))\omega (2^{ - n} )< \infty ,\) , то?○?∈A _χ для каждой функци и?∈A _χ ∩H ^ω , гдеa≦?(t)≦b, 0≦t≦1.     

Triangular Ces??ro summability of two dimensional Fourier series

It is proved that the maximal operator of the triangular Ces??ro means of a two-dimensional Fourier series is bounded from the periodic Hardy space $H_{p}(\mathbb{T}^{2})$ to $L_{p}(\mathbb{T}^{2})$ for all 2/(2+??)<p?Q?? and, consequently, is of weak type (1,1). As a consequence we obtain that the triangular Ces??ro means of a function $f \in L_{1}(\mathbb{T}^{2})$ converge a.e. to?f.     

Localization of Cesaro means of Fourier series for functions of bounded Λ-variation

We consider classes of periodic functions of bounded Λ-variation, where Λ has a power growth rate. We show that this class contains a continuous function whose Cesaro means of the Fourier series (whose order depends on the growth rate of Λ) have no localization property.     

Fourier series and the δ process

We discuss the effect of a particular sequence acceleration method, the δ²${\delta }^2$ process, on the partial sums of Fourier series. We show that for a very general class of functions, this method fails on a dense set of points; not only does it not speed up convergence, it turns the sequence of partial sums into a sequence with multiple limit points.