Journal of the
Korean Mathematical Society
JKMS

ISSN(Print) 0304-9914 ISSN(Online) 2234-3008

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The following are papers that have received final approval and are awaiting to be published. They are listed in the order of their initial submission date.
Papers are published in the order of their initial submission date and will be made available under “Current Issue” once scheduled to be included in a print issue.

Note: Please understand the below list is not in the exact publishing order of the papers as the list does not include papers under internal reviewing process nor those that have not been galley proofed by the authors.

Final published versions of all papers are available under “All Issues” and also under “Current Issue” for papers included in the current issue.

* Paper information have been automatically generated from the information submitted by authors in the online submission system.
  • Online first article June 25, 2024

    Associated primes and nilpotent associated primes of skew inverse Laurent series rings

    Azadeh Hajaliakbari and Ahmad Moussavi

    Abstract : Let R be an associate ring with an identity, σ be an automorphism and δ a σ-derivation of R. In this article we describe all (nilpotent) associated primes of the skew inverse Laurent series ring R((x−1; σ, δ)) in terms of the (nilpotent) associated primes of R.

  • Online first article June 21, 2024

    On the unresolved conjecture for the algebraic transfers over the binary field

    Đặng Võ Phúc

    Abstract : Let us consider the binary field $\mathbb Z/2.$ An important problem of algebraic topology is to determine the cohomology ${\rm Ext}_{\mathcal A}^{h, *}(\mathbb Z/2, \mathbb Z/2)$ of the Steenrod ring $\mathcal A.$ This remains open for all homological degrees $h\geq 6.$ The algebraic transfer of rank $h$, defined by W.M. Singer in [Math. Z. 202 (1989), 493-523], is a $\mathbb Z/2$-linear map that plays a crucial role in describing the Ext groups. The conjecture proposed by William Singer, namely that the algebraic transfer is one-to-one, has only been verified for ranks $h

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September, 2024
Vol.61 No.5

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