Lê Minh Hà scite author profile

2 ) be the algebraic transfer, which is defined by W. Singer as an algebraic version of the geometrical transfer. It has been shown that the algebraic transfer is highly nontrivial and, more precisely, that T r k is an isomorphism for k = 1, 2, 3. However, Singer showed that T r 5 is not an epimorphism. In this paper, we prove that T r 4 does not detect the nonzero element gs ∈ Ext 4,12·2 s A (F 2 , F 2 ) for every s ≥ 1. As a consequence, the localized (Sq 0 ) −1 T r 4 given by inverting the squaring operation Sq 0 is not an epimorphism. This gives a negative answer to a prediction by Minami.

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Lambda algebra and the Singer transfer

Chơn

Hà

2010

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On May spectral sequence and the algebraic transfer

Chơn

Hà

2011

manuscripta math.

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On the May spectral sequence and the algebraic transfer II

Chơn¹,

Hà²

2014

Topology and its Applications

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We study the algebraic transfer constructed by Singer [19] using the May spectral sequence technique. We show that the two squaring operators defined by Kameko [8] and Nakamura [16] on the domain and range respectively of our E 2 version of the algebraic transfer are compatible. We also prove that the two Sq 0 -families n i ∈ Ext 5,36·2 i A (Z/2, Z/2), i ≥ 0, and k i ∈ Ext 7,36·2 i A (Z/2, Z/2), i ≥ 1, are in the image of the algebraic transfer.

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Sub-Hopf algebras of the Steenrod algebra and the Singer transfer

Hà¹

2007

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Lê Minh Hà

On the behavior of the algebraic transfer

Lambda algebra and the Singer transfer

On May spectral sequence and the algebraic transfer

On the May spectral sequence and the algebraic transfer II

Sub-Hopf algebras of the Steenrod algebra and the Singer transfer

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