2009
DOI: 10.4134/jkms.2009.46.5.907
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A Note on the Unstability Conditions of the Steenrod Squares on the Polynomial Algebra

Abstract: Abstract. We extend some results involved the action of the Steenrod operations on monomials and get some corollaries on the hit problem. Then, by multiplying some special matrices, we obtain an efficient tool to compute the action of these operations. PreliminariesIn 1947, Steenrod [21] introduced the Steenrod squares Sq k in terms of cocycles in simplicial cochain complex by modifying the Alexander-Ĉech-Whitney formula for the cup product construction. Serre [16] showed that they generate all stable operati… Show more

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Cited by 8 publications
(7 citation statements)
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“…Peterson [32], Wood [63], Singer [48], and Priddy [45] laid the first foundation for the study of the hit problem and pointed out its relationship to several classical problems in the homotopy theory such as cobordism theory of manifolds, modular representation theory of the general linear group, and stable homotopy type of classifying spaces of finite groups. Later, many researchers have been interested in discovering these hit problems (see Boardman [4], Crabb and Hubbuck [10], Janfada and Wood [19], Janfada [20,21], Kameko [22], Mothebe et. al.…”
Section: Introduction and Statement Of Resultsmentioning
confidence: 99%
“…Peterson [32], Wood [63], Singer [48], and Priddy [45] laid the first foundation for the study of the hit problem and pointed out its relationship to several classical problems in the homotopy theory such as cobordism theory of manifolds, modular representation theory of the general linear group, and stable homotopy type of classifying spaces of finite groups. Later, many researchers have been interested in discovering these hit problems (see Boardman [4], Crabb and Hubbuck [10], Janfada and Wood [19], Janfada [20,21], Kameko [22], Mothebe et. al.…”
Section: Introduction and Statement Of Resultsmentioning
confidence: 99%
“…Peterson [31], Wood [62], Singer [47], and Priddy [44] laid the first foundation for the study of the hit problem and pointed out its relationship to several classical problems in the homotopy theory such as cobordism theory of manifolds, modular representation theory of the general linear group, and stable homotopy type of classifying spaces of finite groups. Later, many researchers have been interested in discovering these hit problems (see Boardman [4], Crabb and Hubbuck [10], Janfada and Wood [18], Janfada [19,20], Kameko [21], Mothebe et. al.…”
Section: Introduction and Statement Of Resultsmentioning
confidence: 99%
“…By these, it seems likely that an explicit description of Q ⊗q n for general q will appear in the near future. Hit problems for the symmetric polynomials have been investigated by the works of Janfada and Wood (see [11,12,13,14]). The following Kameko maps [20] are often used in studying the hit problem: For each n ≥ 0, the down Kameko map Sq 0 : (P q ) 2n+q → (P q ) n is a surjective linear map defined on monomials by Sq 0 (f ) = g if f = 1≤i≤q x i g 2 and Sq 0 (f ) = 0 otherwise.…”
Section: Outline Of Main Resultsmentioning
confidence: 99%