Mathematische Zeitschrift

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Mathematische Zeitschrift is a peer-reviewed mathematics journal established in 1918 that publishes original research in pure and applied mathematics. Founded in the wake of World War I, the journal has appeared alongside periodicals such as Acta Mathematica, Annals of Mathematics, Journal für die reine und angewandte Mathematik, Bulletin of the American Mathematical Society and Inventiones Mathematicae, and has featured work by figures comparable to David Hilbert, Felix Klein, Emmy Noether, Hermann Weyl and Otto Toeplitz. Over its history the journal has intersected with institutions like University of Göttingen, Humboldt University of Berlin, ETH Zurich, Princeton University and University of Bonn.

History

The journal was launched in 1918 by mathematicians active in Germany and quickly became part of a European serial landscape that included Mathematical Reviews, Zentralblatt MATH, Comptes Rendus de l'Académie des Sciences, Journal de Mathématiques Pures et Appliquées and Crelle's Journal. Early contributors and correspondents included names associated with Berlin Mathematical Society, German Mathematical Society, Königsberg University, University of Leipzig and University of Munich, and the periodical witnessed debates among scholars linked to Hilbert's Problems, Noether's theorems, Weierstrass's analysis and Riemannian geometry. Throughout the 20th century it published submissions from émigré mathematicians affiliated with Institute for Advanced Study, University of Cambridge, University of Chicago and Columbia University, reflecting migrations tied to events such as World War II and institutions like American Mathematical Society and Royal Society. Postwar reconstruction saw exchanges with publishers and indexes including Springer-Verlag, Elsevier, Wiley, MathSciNet and Scopus.

The journal's stated scope encompasses research areas related to algebra, analysis, geometry, topology, number theory and mathematical physics, in conversation with work published in Transactions of the American Mathematical Society, Journal of the London Mathematical Society, Duke Mathematical Journal, Annales Scientifiques de l'École Normale Supérieure and Proceedings of the London Mathematical Society. Editorial policy emphasizes original proofs and rigor consistent with standards established by editorial practices at Princeton University Press, Cambridge University Press, Oxford University Press and learned societies such as Deutsche Mathematiker-Vereinigung and Royal Society of London. Peer review is managed to align with guidelines from organizations like Committee on Publication Ethics and indexing criteria used by Web of Science, MathSciNet and Zentralblatt MATH. The journal accepts submissions in German and English and solicits articles consonant with research agendas seen at conferences organized by International Congress of Mathematicians, European Mathematical Society, Society for Industrial and Applied Mathematics and regional meetings at Institute Henri Poincaré.

The journal is published by Springer Science+Business Media on a monthly schedule and is distributed through channels used by major academic libraries such as Library of Congress, British Library, Bibliothèque nationale de France and university consortia at Harvard University, University of Oxford, University of Cambridge and Sorbonne University. It is indexed in repositories and services like MathSciNet, Zentralblatt MATH, Web of Science, Scopus and CrossRef and complies with identifiers employed by International Standard Serial Number and Digital Object Identifier systems. Archival access links the journal to digital libraries and initiatives such as JSTOR, Project Euclid, SpringerLink and institutional repositories at Princeton University Library and Bayerische Staatsbibliothek.

The journal has published influential papers that contributed to developments related to algebraic geometry, analytic number theory, operator algebras, spectral theory and differential topology, alongside work resonant with research from Grothendieck, Serre, Atiyah, Bott, Langlands, Katz, Deligne, Mumford, Hodge and Thurston. Articles in the journal have been cited in contexts involving breakthroughs connected to Poincaré conjecture, Riemann hypothesis, Modular forms, Langlands program, Index theorem and problems pursued at centers such as Courant Institute, Max Planck Institute for Mathematics, Institut des Hautes Études Scientifiques and Clay Mathematics Institute. Specific contributions include original proofs, counterexamples and expository surveys that informed later work by researchers at University of Paris, Princeton University, Stanford University, Massachusetts Institute of Technology and California Institute of Technology.

The journal is regarded within the mathematical community for maintaining rigorous standards comparable to long-standing publications like Acta Mathematica, Annals of Mathematics, Journal of the American Mathematical Society and Inventiones Mathematicae, and it figures in citation analyses conducted via MathSciNet, Web of Science and Scopus. Its influence is reflected in the careers of contributors who held posts at University of Göttingen, ETH Zurich, Princeton University, University of Cambridge and Harvard University and in the adoption of results across fields tied to research programs at European Research Council, National Science Foundation, Simons Foundation and Max Planck Society. Reception in bibliometric and historical studies situates the journal among influential European mathematical periodicals that shaped 20th- and 21st-century research agendas discussed at International Congress of Mathematicians and in retrospectives by institutions such as German Historical Institute.

Category:Mathematics journals