For a fixed kernel function phi, the one dimensional Hausdorff operator is defined in the integral form by hFf x=0x Ft tf&parl0;xt&parr0; dt. By the Minkowski inequality, it is easy to check that the Hausdorff operator is bounded on the Lebesgue spaces Lp when p ≥ 1, with some size condition assumed on the kernel functions phi. However, people discovered that the above boundedness property is quite different on the Hardy space Hp when 0 < p < 1. To establish the boundedness on the Hardy space for 0 < p < 1, some smoothness must be assumed on the kernel functions phi.;In this thesis, we first study the boundedness h phi on the Hardy space H1, and on the local Hardy space h1( R ). Our work shows that for phi(t) ≥ 0, the Hausdorff operator hphi is bounded on the Hardy space H1 if and only if phi is a Lebesgue integrable function; and hphi is bounded on the local Hardy space h1( R ) if and only if the functions phi(t)&khgr; (1,infinity)(t) and phi(t)&khgr; (0,1)(t) log 1t are Lebesgue integrable. These results solve an open question posed by the Israeli mathematician Liflyand. We also establish an H 1( R ) → H1,infinity( R ) boundedness theorem for hphi. As applications, we obtain many decent properties for the Hardy operator and the k th order Hardy operators. For instance, we know that the Hardy operator H is bounded from H1( R ) → H1,infinity( R ), bounded on the atomic space H1A&parl0;R+ &parr0; +), but it is not bounded on both H 1( R ) and the local Hardy space h1( R ).;We also extend part of these results to the high dimensional Hausdoff operators. Here, we study two high dimensional extentions on the Hausdorff operatorhphi: H&d5;F,b fx =Rn Fy &vbm0;y&vbm0;n-bf&parl0; xy&parr0; dy,n⩾b⩾0, and HF,bf x= RnF&parl0; xy &parr0;&vbm0;y&vbm0;n-bf &parl0;y&parr0;dy,n⩾b ⩾0, where phi is a local integrable function.;For 0 < p < 1, we obtain a sufficient condition for the Hp boundedness for the Hausdorff operator in the one dimensional case. This theorem needs less smoothness on the kernel phi than any other theorems in the literature. Since there is no result involving the boundedness on Hp( Rn ) in the literature for the high dimensional Hausdorff operators, if 0 < p < 1 and n ≥ 2, it is interesting to study such problems in the high dimensional spaces. We establish several sufficient conditions by using a duality argument.;Additionally, we study boundedness of Hausdorff operators on some Herz type spaces, and some bilinear Hausdorff operators operators and fractional Hausdorff operators.
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机译:对于固定的核函数phi,一维Hausdorff算符以整数形式定义为:hFf x = 0x Ft tf&parl0; xt&parr0; dt。通过Minkowski不等式,可以容易地检查Hausdorff算子在p≥1时是否在Lebesgue空间Lp上有界,并且在核函数phi上假设了一些大小条件。但是,人们发现,当0 <1时,在Hardy空间Hp上的上述有界性质完全不同。要在0 <1的Hardy空间上建立有界性,必须在内核函数phi上假设一些平滑度。 ;在本文中,我们首先研究了Hardy空间H1和局部Hardy空间h1(R)的有界性h phi。我们的工作表明,对于phi(t)≥0,当且仅当phi是Lebesgue可积函数时,Hausdorff算子hphi约束在Hardy空间H1上。当且仅当函数phi(t)&khgr;时hphi限制在局部Hardy空间h1(R)上。 (1,无穷大)(t)和phi(t)&khgr; (0,1)(t)log 1t是Lebesgue可积的。这些结果解决了以色列数学家Liflyand提出的一个公开问题。我们还建立了hphi的H 1(R)→H1,infinity(R)有界定理。作为应用程序,我们为Hardy运算符和k阶Hardy运算符获得了许多不错的属性。例如,我们知道Hardy算子H的界线是H1(R)→H1,infinity(R),界于原子空间H1A&parl0; R +&parr0;。 +),但它不仅在H 1(R)和局部Hardy空间h1(R)上都没有边界。我们还将这些结果的一部分扩展到高维Hausdoff算子。在这里,我们研究Hausdorff算子hphi上的两个高维扩展:H&d5; F,b fx = Rn Fy&vbm0; y&vbm0; n-bf&parl0; xy&parr0; dy,n&ges; b&ges; 0和HF,bf x = RnF&parl0; xy&parr0;&vbm0; y&vbm0; n-bf&parl0; y&parr0; dy,n&ges; b&ges; 0,其中phi是局部可积函数。对于0 <1,我们获得了Hp有界的充分条件一维情况下的Hausdorff算子。该定理与文献中的其他定理相比,对核phi的平滑性要求更低。由于在文献中没有关于高维Hausdorff算子的关于Hp(Rn)的有界性的结果,因此,如果0 <1且n≥2,则在高维空间中研究此类问题很有趣。我们使用对偶性参数建立了几个充分的条件。此外,我们研究了Hausdorff算子在某些Herz型空间,一些双线性Hausdorff算子和分数阶Hausdorff算子上的有界性。
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