CMS/CAIMS Books in Mathematics is a collection of monographs and graduate-level textbooks published in cooperation jointly with the Canadian Mathematical Society- Societé mathématique du Canada and the Canadian Applied and Industrial Mathematics Society-Societé Canadienne de Mathématiques Appliquées et Industrielles and Springer. This series offers authors the joint advantage of publishing with two major mathematical societies and with a leading academic publishing company. The series publishes works in all areas of mathematics from the very pure to the highly applied. Books in this series will appeal to all mathematicians, students and established researchers. All works are peer-reviewed to meet the highest standards of scientific literature. The series replaces the CMS Books in Mathematics series that successfully published over 45 volumes in 20 years CMS Books in Mathematics.
Karl Dilcher, Dalhousie University, Halifax, Canada
Frithjof Lutscher, University of Ottawa, Ottawa, Canada
Nilima Nigam, Simon Fraser University, Burnaby, Canada
Keith Taylor, Dalhousie University, Halifax, Canada
Ben Adcock, Simon Fraser University, Burnaby, Canada
Martin Barlow, The University of British Columbia, Vancouver, Canada
Heinz Bauschke, The University of British Columbia, Kelowna, Canada
Matt Davison, Western University, London, Canada
Leah Edelstein-Keshet, The University of British Columbia, Vancouver, Canada
Niky Kamran, McGill University, Montreal, Canada
Mikhail Kotchetov, Memorial University, St. John’s, Canada
Raymond Spiteri, University of Saskatchewan, Saskatoon, Canada
If you are interested to publish with us, feel free to contact any of the editors listed above.
If you would prefer to publish something shorter we also have a Briefs in Mathematics series, which feature research monographs between 50-125 pages:
SpringerBriefs in Mathematics
showcases expositions in all areas of mathematics and applied mathematics. Manuscripts presenting new results or a single new result in a classical field, new field, or an emerging topic, applications, or bridges between new results and already published works, are encouraged. The series is intended for mathematicians and applied mathematicians. All works are peer-reviewed to meet the highest standards of scientific literature.
Titles from this series are indexed by Scopus, Web of Science, Mathematical Reviews, and zbMATH.