1. |
A Remark on Fields with Unramified Compositum |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 1-2
J. H. Smith,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.1
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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2. |
Representation of Ordered Vector Spaces with the Riesz Decomposition Property |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 3-10
Richard C. Metzler,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.3
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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3. |
Comparison Theorems for Almost Periodic Functions |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 11-19
M. L. Cartwright,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.11
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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4. |
Correction to “Two Theorems on Whitehead Products” |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 20-20
John W. Rutter,
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摘要:
The general Jacobi (or Witt) identity on page 510 of [1] is written down incorrectly.† The correct version isτ[[−b,a],c]b+ τ2[[−c, b], a]c+ τ3[[−a, c], b]a= 0.Theorem 1 is correct as stated†, but its proof should read as follows:The commutators[[−b,a],c]band[[a, b], c]differ in[S(A × B × C), X]by[[a,b],[−c,b]]c; that is[[−b, a], c]b=[[a, b], c]+ [[a, b], [−c, b)]c.Since [a, b] and [−c, b]both lie in the image of the abelian group[S((A × C) × B), X],the element[[a, b], [−c, b]cis zero in[S(A × B × C), X]. Similarly[[−c, b], a]c=[[b, c], a]and[[−a, c], b]a= [[c, a], b]which proves the identity[[a, b], c]+ τ2[[b, c], a]+ τ1[[c, a], b] = 0.The result stated in Theorem 1 now follows since[S(A × B × C), X]is abelian.Finally I note that a direct proof of Theorem 1 is obtained from the Zassenhaus identity[[a, b], c]+ [[c, a], b]+ [[b, c], a]= [a, b] + [b, a]c+ [c, a] + [b, a]+ [b, c]a+ [a, c] + [a, b]c+ [c, b]a.Any two of the terms on the right‐hand side commute as above, for example[a, c]and[a, b]cboth lie in the image of the commutative group[S(A × ( B × C)), X]
ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.20-s
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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5. |
Two‐Generator Conditions for Polycyclic Groups |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 21-29
J. F. Humphreys,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.21
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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6. |
Measures of Hausdorff Type |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 30-34
Roy O. Davies,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.30
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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7. |
On a Limit Point Criterion of Weyl |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 35-36
James S. W. Wong,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.35
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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8. |
Group Rings and Lower Central Series |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 37-40
A. H. M. Hoare,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.37
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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9. |
The Curve of Genus 2 with Reducible Integrals |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 41-42
Patrick Du Val,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.41
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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10. |
Indecomposable Representations of the Group (P,p) Over Fields of Characteristicp. |
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Journal of the London Mathematical Society,
Volume s2-1,
Issue 1,
2016,
Page 43-50
D. L. Johnson,
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ISSN:0024-6107
DOI:10.1112/jlms/s2-1.1.43
出版商:Oxford University Press
年代:2016
数据来源: WILEY
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