In this paper, by using the generating function Φ and X the criteria of the rotundity for the Orlicz-Bochner function and sequence spaces endowed with the Luxemburg norm were obtained. And the sufficient and necessar...In this paper, by using the generating function Φ and X the criteria of the rotundity for the Orlicz-Bochner function and sequence spaces endowed with the Luxemburg norm were obtained. And the sufficient and necessary conditions were given for the extreme point of Orlicz-Bochner sequence space and the conditions in part for Orlicz-Bochner function space.展开更多
In this paper we give some characterizations of O-convexity of Banach spaces, and show the criteria for O-convexity in Orlicz-Bochner function space LM(μ, X) and Orlicz-Bochner sequence space lM(Xs) endowed with ...In this paper we give some characterizations of O-convexity of Banach spaces, and show the criteria for O-convexity in Orlicz-Bochner function space LM(μ, X) and Orlicz-Bochner sequence space lM(Xs) endowed with Orlicz norm.Moreover, we give a sufficient condition for the dual of such a space to have the fixed point property.展开更多
In general, Banach space-valued Riemann integrable functions defined on [0, 1] (equipped with the Lebesgue measure) need not be weakly continuous almost everywhere. A Banach space is said to have the weak Lebesgue p...In general, Banach space-valued Riemann integrable functions defined on [0, 1] (equipped with the Lebesgue measure) need not be weakly continuous almost everywhere. A Banach space is said to have the weak Lebesgue property if every Riemann integrable function taking values in it is weakly continuous almost everywhere. In this paper we discuss this property for the Banach space LX^1 of all Bochner integrable functions from [0, 1] to the Banach space X. We show that LX^1 has the weak Lebesgue property whenever X has the Radon-Nikodym property and X* is separable. This generalizes the result by Chonghu Wang and Kang Wan [Rocky Mountain J. Math., 31(2), 697-703 (2001)] that L^1[0, 1] has the weak Lebesgue property.展开更多
In Orlicz-Bochner sequence spaces endowed with Orlicz norm and Luxemburg norm, points of lower monotonicity, upper monotonicity, lower local uniform monotonicity and upper local uniform monotonicity are characterized.
In this paper, we discuss some basic properties of the Orlicz-Bochner sequence space l_M(X) and its subspace h_M(X). We present the equivalent definition of h_M(X), the sufficient and necessary conditions under which ...In this paper, we discuss some basic properties of the Orlicz-Bochner sequence space l_M(X) and its subspace h_M(X). We present the equivalent definition of h_M(X), the sufficient and necessary conditions under which l_^(M) (X) is complete, and l_M(X) and h_M(X) are separable respectively, and also give the sufficient condition that h_M(X) has a basis. All these results generalize the results for the classical Orlicz sequence spaces.展开更多
The boundedness of maximal Bochner-Riesz operator B^δ* and that of maximal commutator B^bδ*, generated by this operator and Lipschitz function on the classical Morrey space and generalized Morrey space are establi...The boundedness of maximal Bochner-Riesz operator B^δ* and that of maximal commutator B^bδ*, generated by this operator and Lipschitz function on the classical Morrey space and generalized Morrey space are established.展开更多
In this paper, we will use a method of sharp maximal function approach to show the boundedness of commutator [b,TR^δ] by Bochner-Riesz operators and the function b on weighted Morrey spaces L^p,k (ω) under appro...In this paper, we will use a method of sharp maximal function approach to show the boundedness of commutator [b,TR^δ] by Bochner-Riesz operators and the function b on weighted Morrey spaces L^p,k (ω) under appropriate conditions on the weight w, where b belongs to Lipschitz space or weighted Lipschitz space.展开更多
Let w be a Muckenhoupt weight and Hwp (JRn) be the weighted Hardy space. In this paper, by using the atomic decomposition of Hwp(Rn), we will show that the Bochner-Riesz operators TRδ are bounded from Hwp(Rn) t...Let w be a Muckenhoupt weight and Hwp (JRn) be the weighted Hardy space. In this paper, by using the atomic decomposition of Hwp(Rn), we will show that the Bochner-Riesz operators TRδ are bounded from Hwp(Rn) to the weighted weak Hardy spaces WHwp (Rn) for 0 〈 p 〈 1 and δ = n/p- (n + 1)/2. This result is new even in the unweighted case.展开更多
文摘In this paper, by using the generating function Φ and X the criteria of the rotundity for the Orlicz-Bochner function and sequence spaces endowed with the Luxemburg norm were obtained. And the sufficient and necessary conditions were given for the extreme point of Orlicz-Bochner sequence space and the conditions in part for Orlicz-Bochner function space.
文摘In this paper we give some characterizations of O-convexity of Banach spaces, and show the criteria for O-convexity in Orlicz-Bochner function space LM(μ, X) and Orlicz-Bochner sequence space lM(Xs) endowed with Orlicz norm.Moreover, we give a sufficient condition for the dual of such a space to have the fixed point property.
基金supported by MEC and FEDER (Project MTM2005-08350-C03-03)Generalitat Valenciana (Project GV/2007/191)+3 种基金supported by MEC and FEDER (Project MTM2005-08379)Fundacion Seneca (Project 00690/PI/04) the "Juan de la Cierva" Programme (MEC and FSE)supported by MEC and FEDER (Project MTM2006-11690-C02-01)
文摘In general, Banach space-valued Riemann integrable functions defined on [0, 1] (equipped with the Lebesgue measure) need not be weakly continuous almost everywhere. A Banach space is said to have the weak Lebesgue property if every Riemann integrable function taking values in it is weakly continuous almost everywhere. In this paper we discuss this property for the Banach space LX^1 of all Bochner integrable functions from [0, 1] to the Banach space X. We show that LX^1 has the weak Lebesgue property whenever X has the Radon-Nikodym property and X* is separable. This generalizes the result by Chonghu Wang and Kang Wan [Rocky Mountain J. Math., 31(2), 697-703 (2001)] that L^1[0, 1] has the weak Lebesgue property.
文摘In Orlicz-Bochner sequence spaces endowed with Orlicz norm and Luxemburg norm, points of lower monotonicity, upper monotonicity, lower local uniform monotonicity and upper local uniform monotonicity are characterized.
文摘In this paper, we discuss some basic properties of the Orlicz-Bochner sequence space l_M(X) and its subspace h_M(X). We present the equivalent definition of h_M(X), the sufficient and necessary conditions under which l_^(M) (X) is complete, and l_M(X) and h_M(X) are separable respectively, and also give the sufficient condition that h_M(X) has a basis. All these results generalize the results for the classical Orlicz sequence spaces.
基金Supported by NSFC(10571014),NSFC(10571156)the growth foundation of JXNU (1983)the doctor founda-tion of JXNU.
文摘The boundedness of maximal Bochner-Riesz operator B^δ* and that of maximal commutator B^bδ*, generated by this operator and Lipschitz function on the classical Morrey space and generalized Morrey space are established.
基金supported by NSFC (NO. 11201003)Education Committee of Anhui Province (NO. KJ2011A138 and NO. KJ2012A133)
文摘In this paper, we will use a method of sharp maximal function approach to show the boundedness of commutator [b,TR^δ] by Bochner-Riesz operators and the function b on weighted Morrey spaces L^p,k (ω) under appropriate conditions on the weight w, where b belongs to Lipschitz space or weighted Lipschitz space.
文摘Let w be a Muckenhoupt weight and Hwp (JRn) be the weighted Hardy space. In this paper, by using the atomic decomposition of Hwp(Rn), we will show that the Bochner-Riesz operators TRδ are bounded from Hwp(Rn) to the weighted weak Hardy spaces WHwp (Rn) for 0 〈 p 〈 1 and δ = n/p- (n + 1)/2. This result is new even in the unweighted case.
