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Bulletin des Sciences Mathématiques (BDSM)

Publisher :

Elsevier Masson SAS

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Peer reviewed only
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Open Access
  • Mathematics (General)
e-ISSN :

1952-4773

Issue Frequency :

Monthly

Impact Factor :

1.3

p-ISSN :

0007-4497

Est. Year :

1998

Mobile :

171165500

Country :

France

Language :

English, French

APC :

YES

Impact Factor Assignee :

Google Scholar

Journal Descriptions

Articles in French and English For more information on our journals visit: https://www.elsevier.com/mathematics Founded in 1870, by Gaston Darboux, the Bulletin publishes original articles covering all branches of pure mathematics. During the last few years the Bulletin has published contributions by T. Aubin, H. Bauer, R. Beals, L. De Branges, L. Carleson, A. Chang, G. Choquet, J. Dixmier, J.P. Demailly, L. Ehrenpreis, P. Erdös, B. Gaveau, P. Greiner, A. Koranyi, T. Levasseur, P. Malliavin, H. Moscovici, O.G. Pisier, H. Rosenberg, E. Stein, M. Talagrand, A. Tognoli, A. Varchenko, N. Varopoulos, A. Weinstein, H. Widom, M. Yor. Benefits to authors We also provide many author benefits, such as free PDFs, a liberal copyright policy, special discounts on Elsevier publications and much more. Please click here for more information on our author services Please see our Guide for Authors for information on article submission. This journal has an Open Archive. All published items, including research articles, have unrestricted access and will remain permanently free to read and download 48 months after publication. All papers in the Archive are subject to Elsevier's user license.


Bulletin des Sciences Mathématiques (BDSM) is :

International, Peer-Reviewed, Open Access, Refereed, Mathematics (General) , Online or Print, Monthly Journal

UGC Approved, ISSN Approved: P-ISSN - 0007-4497, E-ISSN - 1952-4773, Established in - 1998, Impact Factor - 1.3

Not Provide Crossref DOI

Indexed in Scopus, WoS

Not indexed in DOAJ, PubMed, UGC CARE

Indexing

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Elsevier

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Publications of BDSM

  • dott image March, 2021

Construction of MRA and non-MRA wavelet sets on Cantor dyadic group

W. C. Lang determined wavelets on Cantor dyadic group by using Multiresolution analysis method. In this paper we have given characterization of wavelet sets on Cantor dyadic group which prov...

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