Peer Review Process

This journal is a single blind refereed journal. It means that the names of the reviewers are hidden from the authors. The review of a paper normally will be done within 4 months.

 

 Submission

 

The manuscripts must be submitted via

 

http://kjm-math.org/

 

Acknowledgement of the receipt and the notification of the editorial decision on publication will be sent by the system via email. All editorial correspondences should be addressed to the editors-in-chief at kjm@um.ac.ir

 

 

Referee process

 

This journal uses single-blind peer review,in the sense that the reviewer name(s) will not be revealed to the author(s).

 

Submitted papers must be correct, original, nontrivial, and well written in the scope of journal, and with deep results. If the language used is very poor, then the manuscript will be rejected. A submitted paper will be refereed in the traditional way by at least one referee. KJM tries to make the decision within 4 months after submission, but this primarily depends on the referees. If you have not received a notice of the decision after 4 months, you may contact the editor in chief by e-mail. If necessary, the corresponding author will be asked to revise the manuscript according to the referee report(s). The editorial board reserves the right to make reasonable modifications to the wording in a manuscript.

 

 

Language

English

 

 

Galley proof

 

The page proofs of each paper will be sent to the corresponding author, who is responsible for checking and approving the article on behalf of all coauthors. A limited number of typographical corrections are anticipated and extensive revisions may be reviewed again.

 

Open access

 

KJM is an open access journal. 

 

 

 

Publication charge

 

There is no publication or page charge associated with this journal. The journal is financially supported by TMRG, a non-profit organization (in cooperation with Department of Pure Mathematics at Ferdowsi University of Mashhad, and The Center of Excellence in Analysis on Algebraic Structures).