On p dependent boundedness of singular integral operators

We study the classical Calderón Zygmund singular integral operator with homogeneous kernel. Suppose that Ω is an integrable function with mean value 0 on S ¹. We study the singular integral operator $$T_\Omega f= {\rm p.v.} \, f * \frac {\Omega (x/|x|)}{|x|^2}.$$ We show that for α > 0 the condition $$\Bigg| \int \limits _{I} \Omega (\theta) \, d\theta \Bigg| \leq C |\log|I||^{-1-\alpha} \quad\quad\quad\quad (0.1)$$ for all intervals |I| < 1 in S ¹ gives L ^p boundedness of T _Ω in the range ${|1/2-1/p| < \frac \alpha {2(\alpha+1)}}$ . This condition is weaker than the conditions from Grafakos and Stefanov (Indiana Univ Math J 47:455–469, 1998) and Fan et al. (Math Inequal Appl 2:73–81, 1999). We also construct an example of an integrable Ω which satisfies (0.1) such that T _Ω is not L ^p bounded for ${|1/2-1/p| > \frac {3\alpha +1}{6(\alpha +1)}}$ .     

On the boundedness of Hamiltonian operators

We show that a non-negative Hamiltonian operator whose domain contains a maximal uniformly positive subspace is bounded.

     

On the H p -L q boundedness of some fractional integral operators

Let A ₁, …, A _m be n × n real matrices such that for each 1 ? i ? m, A _i is invertible and A _i ? A _j is invertible for i ≠ j. In this paper we study integral operators of the form $$Tf(x) = \int {{k_1}(x - {A_{1y}}){k_2}(x - {A_{2y}}) \ldots {k_m}(x - {A_{my}})f(y){\rm{d}}y}$$ ${k_i}(y) = \sum\limits_{j \in z} {{2^{jn/{q_i}}}} \varphi i,j({2^j}y),1 \le {q_i} < \infty ,1/{q_1} + 1/q + ... + 1/q = 1 - r,0 \le r < 1, and \varphi i,j$ satisfying suitable regularity conditions. We obtain the boundedness of T: H ^p (? ⁿ ) → L ^q (? ⁿ ) for 0 < p < 1/r and 1/q = 1/p-r. We also show that we can not expect the H ^p -H ^q boundedness of this kind of operators.     

On the boundedness of threshold operators in $$L_1[0,1]$$ with respect to the Haar basis

We prove a near-unconditionality property for the normalized Haar basis of \(L_1[0,1]\).     

On the boundedness of operator generated by the Haar multishift

Boundedness conditions for operators generated by Haar multishifts in symmetric spaces with nontrivial Boyd indices are obtained.     

On the global boundedness of Fourier integral operators

We consider a class of Fourier integral operators, globally defined on mathbb R^d{{mathbb R}^{d}} , with symbols and phases satisfying product type estimates (the so-called SG or scattering classes). We prove a sharp continuity result for such operators when acting on the modulation spaces M ^p . The minimal loss of derivatives is shown to be d|1/2 − 1/p|. This global perspective produces a loss of decay as well, given by the same order. Strictly related, striking examples of unboundedness on L ^p spaces are presented.     

On boundedness and compactness of Riemann-Liouville fractional operators

Let α ∈ (0, 1). Consider the Riemann-Liouville fractional operator of the form $f \to T_\alpha f(x): = v(x)\int\limits_0^x {\frac{{f(y)u(y)dy}} {{(x - y)^{1 - \alpha } }}} ,x > 0, $ with locally integrable weight functions u and v. We find criteria for the L ^p → L ^q -boundedness and compactness of T _α when 0 < p,q < ∞, p > 1/α under the condition that u monotonely decreases on ?⁺:= [0,∞). The dual versions of this result are given.     

Approximation of functions in spacesL p

Translated from Matematicheskie Zametki, Vol. 56, No. 2, pp. 15–40, August, 1994.     

On boundedness of discrete multilinear singular integral operators

Let m(ξ,η) be a measurable locally bounded function defined in R². Let 1?p₁,q₁,p₂,q₂<∞ such that pi=1 implies qi=∞. Let also 0<p₃,q₃<∞ and 1/p=1/p₁+1/p₂−1/p₃. We prove the following transference result: the operator

     

On the relation between the Jackson and Jung constants of the spacesL p

For any infinitely metrizable compact Abelian groupG; 1pq<,n , the following relations are proved: whereK _pq(G, n, G) is the largest Jackson constant in the approximation of the system of characters by polynomials of ordern, d _pq(G, n, G) is the best Jackson constant,J(L _p(G), L_q(G)) is the Jung constant of the pair of real spaces (L _p(G), L_q(G)), and.Translated fromMatematicheskie Zametki, Vol. 58, No. 6, pp. 828–836, December, 1995.This work was supported by the Russian Foundation for Basic Research under grant No. 95-01-00657.     

On the boundedness of classical operators on weighted lorentz spaces

Conditions on weightsu(·),v(·) are given so that a classical operatorT sends the weighted Lorentz spaceL ^Lrs (vdx) intoL ^pq (udx). HereT is either a fractional maximal operatorM _α or a fractional integral operatorI _α or a Calderón-Zygmund operator. A characterization of this boundedness is obtained forM _α andI _α when the weights have some usual properties and max(r, s) ≤ min(p, q).     

On Rearrangements of the Haar System in L p

In this paper we study operators rearranging the Haar system in each bundle. It is proved that the norm of any nonidentical rearrangement admits a nontrivial lower bound in L ^p spaces, .     

Uniform boundedness inL p (p=p(x)) of some families of convolution operators

Suppose that a measurable 2π-periodic essentially bounded function (the kernel) κ_λ =κ_λ(x) is given for any realλ≥1. We consider the following linear convolution operator inL ^p: $$\kappa _\lambda = \kappa _\lambda f = (\kappa _\lambda f)(x) = \int_{ - \pi }^\pi {f(t)} k_\lambda (t - x) dt.$$ Uniform boundedness of the family of operators {Κ_λ}_λ≥1 is studied. Conditions on the variable exponentp=p(x) and on the kernel κ_λ that ensure the uniform boundedness of the operator family {Κ_λ}_λ≥1 inL ^p are obtained. The condition on the exponentp=p(x) is given in its final form.