Add to ORKGIn this paper we consider measurable functions f from a symmetric space X on [0,1]. We prove some inequalities relating the behavior of the nonincreasing rearrangement f* and the (generalized) modulus of continuity ωX (t,f). In particular, we generalize, complement and unify some previous result by Brudnyi, Garsia and Rodemich, Milman, Osvald, Storozhenko, and Wik. We note that these inequalities have direct applications, e.g. in the theory of imbedding of symmetric spaces and Besov (Lipschitz) spaces, Fourier analysis and the theory of stochastic processes. This paper is organized in the following way: In Section 1 we give some basic definitions and other preliminaries. In Section 2 we present a generalization of the Storozhenko inequality...
We define a new rearrangement, called rearrangement by tamping, for non-negative measurable function...
Inspired by work of Montgomery on Fourier series and Donoho-Strak in signal processing, we investiga...
AbstractLet f be a Lebesgue measurable function on I = [0, 1] which is finite-valued almost everywhe...
In this paper we consider measurable functions f from a symmetric space X on [0,1]. We prove some in...
In this paper we consider measurable functions f from a symmetric space X on [0,1]. We prove some in...
Inequalities for moduli of continuity and rearrangements.Milman, Mario8 pág.Nivel analíticosemestra
AbstractLet ƒ, g be measurable non-negative functions on R, and let \̄tf, ḡ be their equimeasurable ...
AbstractIn this note, we extend the notion of relative rearrangement introduced by J. Mossimo and R....
AbstractThe inequalities of Hardy–Littlewood and Riesz say that certain integrals involving products...
We prove, within the context of spaces of homogeneous type, $L^p$ and exponential type self-improvin...
Let smooth on with for . Furthermore, let nonnegative and bounded functions on with compact su...
Abstract. Let X be a rearrangement-invariant Banach function space over a domain Rn. We characteriz...
AbstractWe obtain new inequalities for the Fourier transform, both on Euclidean space, and on non-co...
We prove a new rearrangement inequality for multiple integrals, which partly generalizes a result of...
One of the main purposes of this paper is to obtain estimates for Fourier transforms of functions in...
We define a new rearrangement, called rearrangement by tamping, for non-negative measurable function...
Inspired by work of Montgomery on Fourier series and Donoho-Strak in signal processing, we investiga...
AbstractLet f be a Lebesgue measurable function on I = [0, 1] which is finite-valued almost everywhe...
In this paper we consider measurable functions f from a symmetric space X on [0,1]. We prove some in...
In this paper we consider measurable functions f from a symmetric space X on [0,1]. We prove some in...
Inequalities for moduli of continuity and rearrangements.Milman, Mario8 pág.Nivel analíticosemestra
AbstractLet ƒ, g be measurable non-negative functions on R, and let \̄tf, ḡ be their equimeasurable ...
AbstractIn this note, we extend the notion of relative rearrangement introduced by J. Mossimo and R....
AbstractThe inequalities of Hardy–Littlewood and Riesz say that certain integrals involving products...
We prove, within the context of spaces of homogeneous type, $L^p$ and exponential type self-improvin...
Let smooth on with for . Furthermore, let nonnegative and bounded functions on with compact su...
Abstract. Let X be a rearrangement-invariant Banach function space over a domain Rn. We characteriz...
AbstractWe obtain new inequalities for the Fourier transform, both on Euclidean space, and on non-co...
We prove a new rearrangement inequality for multiple integrals, which partly generalizes a result of...
One of the main purposes of this paper is to obtain estimates for Fourier transforms of functions in...
We define a new rearrangement, called rearrangement by tamping, for non-negative measurable function...
Inspired by work of Montgomery on Fourier series and Donoho-Strak in signal processing, we investiga...
AbstractLet f be a Lebesgue measurable function on I = [0, 1] which is finite-valued almost everywhe...