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Journal of the London Mathematical Society

ISSN: 0024-6107 年代：2016
当前卷期：Volume s2-46 issue 2 [ 查看所有卷期 ]

年代：2016

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1.	Integer Sum Sets Containing Long Arithmetic Progressions
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 193-201 G. A. Freiman, H. Halberstam, I. Z. Ruzsa, Preview \| PDF (482KB)
	ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.193 出版商:Oxford University Press 年代:2016 数据来源: WILEY
2.	Correction to ‘Weyl Sums and Diophantine Approximation’
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 202-204 R. C. Baker, Preview \| PDF (113KB)
	ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.202 出版商:Oxford University Press 年代:2016 数据来源: WILEY
3.	Hilbertian Fields and Free Profinite Groups
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 205-227 Moshe Jarden, Alexander Lubotzky, Preview \| PDF (1702KB)
	ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.205 出版商:Oxford University Press 年代:2016 数据来源: WILEY
4.	Minimal Elements of the Poset of a Hammock
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 228-238 Changchang Xi, Preview \| PDF (567KB)
	ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.228 出版商:Oxford University Press 年代:2016 数据来源: WILEY
5.	Finite Groups Have Many Conjugacy Classes
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 239-249 L. Pyber, Preview \| PDF (617KB)
	摘要: We prove that every group of orderncontains at least ɛ logn/(log logn)8conjugacy classes for some fixed ɛ>0. This essentially settles an old problem of Brauer. ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.239 出版商:Oxford University Press 年代:2016 数据来源: WILEY
6.	Pure Symplectic Spinors in the Fock Representation
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 250-268 P. L. Robinson, Preview \| PDF (1129KB)
	摘要: We describe explicitly the space of smooth vectors and its antidual space of symplectic spinors for the Fock representation of a separable complex Hilbert space. Further, we show that a strongly positive polarization annihilates a complex line of pure symplectic spinors if and only if it satisfies a Hilbert‐Schmidt condition. Throughout, we use the complex‐wave model of the Fock representation due to Segal. ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.250 出版商:Oxford University Press 年代:2016 数据来源: WILEY
7.	Complex Measures on Projections in Von Neumann Algebras
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 269-279 L. J. Bunce, J. D. Maitland Wright, Preview \| PDF (645KB)
	ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.269 出版商:Oxford University Press 年代:2016 数据来源: WILEY
8.	Extrapolation of Weighted Norm Inequalities from End‐Point Spaces to Banach Lattices
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 280-294 José García‐Cuerva, Preview \| PDF (874KB)
	摘要: The meaning of extrapolation is that all the boundedness properties of an operator in a large class of spaces are contained in certain weighted norm inequalities where only the weight changes. Here we start from weightedL∞or BMO at one end or from weightedH1at the other, which may be considered the dual case. We obtain boundedness in large classes of Banach lattices. ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.280 出版商:Oxford University Press 年代:2016 数据来源: WILEY
9.	A Note on the Boundary Behaviour of Harmonic Functions
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 295-300 J. L. Fernández, J. G. Llorente, Preview \| PDF (322KB)
	ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.295 出版商:Oxford University Press 年代:2016 数据来源: WILEY
10.	Two Weight Mixed Ф‐Inequalities for the Hardy Operator and the Hardy‐Littlewood Maximal Operator
	Journal of the London Mathematical Society, Volume s2-46, Issue 2, 2016, Page 301-318 Lai Qinsheng, Preview \| PDF (776KB)
	摘要: Letw(x), v(x)be a pair of weight functions. In this paper, under appropriate conditions on Young's functions Ф1, Ф2we characterize the inequalityΦ2−1(∫0∞Φ2(Tf(x))w(x)dx)⩽CΦ1−1(∫0∞Φ1(f(x))v(x)dx)for the Hardy operatorT, and the inequalityΦ2−1(∫RnΦ2(M(fv)(x))w(x)dx)⩽CΦ1−1(∫RnΦ1(f(x))v(x)dx)for the Hardy‐Littlewood maximal operatorM, as well as the corresponding weak type inequalities. ISSN:0024-6107 DOI:10.1112/jlms/s2-46.2.301 出版商:Oxford University Press 年代:2016 数据来源: WILEY

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