How to submit preprints
Visiting guests and members of MPIM can submit proposals to our preprint series. These submissions will be checked by an institute member and, if appropriate, included in our database. A hard copy of all submissions will be collected in the library.
To submit an article, please email the PDF file and its (La)TeX-source to preprint@mpim-bonn.mpg.de. We do not have a special document template, please use one of the standard AMS classes, e.g. amsart. The preprint cover and number will be added by us.
In addition, please fill the attached preprint form, which confirms your consent to publish the article on our website. The filled form should be signed and placed in the letter-box labeled "preprints", transferred by traditional mail, or sent to preprint@mpim-bonn.mpg.de.
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The MPIM preprint series
Preprint | Author(s) | Title | Download(s) |
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2020-65 | On the universal extensions in Tannakian categories | ||
2020-64 | Second moment of $\mathrm{GL}(n) \times \mathrm{GL}(n)$ Rankin-Selberg $L$-functions | ||
2020-63 | Separaration of periods of quartic surfaces | ||
2020-62 | On the differential form spectrum of geometrically finite orbifolds | ||
2020-61 | An estimate of canonical dimension of groups based on Schubert calculus | ||
2020-60 | A type theory for strictly unital $\infty$-categories | ||
2020-59 | A 3-categorical perspective on $G$-crossed braided categories | ||
2020-58 | Semisimple 4-dimensional topological field theories cannot detect exotic smooth structure | ||
2020-57 | New upper bounds for spherical codes and packings | ||
2020-56 | Smooth locus of twisted affine Schubert varieties and twisted affine Demazure modules | ||
2020-55 | On the Kontsevich geometry of the combinatorial Teichmüller space | ||
2020-54 | Combinatorics of double Grothendieck polynomials | ||
2020-53 | The conformal group of a compact simply connected Lorentzian manifold | ||
2020-52 | Higher Airy structures and topological recursion for singular spectral curves | ||
2020-51 | Algebraic $K$-theory and Grothendieck-Witt theory of monoid schemes | ||
2020-50 | Group completion in the $K$-theory and Grothendieck-Witt theory of proto-exact categories | ||
2020-49 | Surjective separating maps on noncommutative $L^p$-spaces | ||
2020-48 | Non-vanishing square-integrable automorphic cohomology classes - the case $GL(2)$ over a central division algebra | ||
2020-47 | Eisenstein series for rank one unitary groups and some cohomological applications | ||
2020-46 | Eisenstein series and the top degree cohomology of arithmetic subgroups of $SL_n/\mathbb{Q}$ | ||
2020-45 | Projective spaces as orthogonal modular varieties | ||
2020-44 | Weyl invariant Jacobi forms: a new approach | ||
2020-43 | On factorization of separating maps on noncommutative $L^p$-spaces | ||
2020-42 | Constructing local models for Lagrangian torus fibrations | ||
2020-41 | Lower bounds for moments of zeta and $L$-functions revisited |
Publications of institute members and guests
Preprints on arXiv
Guests and institute members are encouraged to add a report number of the form MPIM-Bonn-<year>
to their submissions. This helps us to track down MPIM publications.
List of preprints on arXiv
MPIM preprint series
The MPIM preprint series was established in 1983 shortly after the institute itself. Browse and search the MPIM preprints or learn how to submit preprints.
Institutional Repository - PuRe
The MPG institutional repository (PuRe) currently contains most of the peer-reviewed publications of MPIM researchers since 1997 and preprints since 2020. If your paper is not listed in PuRe, please send an email to the library team at library@mpim-bonn.mpg.de.
Information on Open Access option for MPIM researchers
For more detailed information please contact librarian Anu Hirvonen.
Hirzebruch Collection
The Hirzebruch Collection is a media archive that collects documents, images, videos, and other resources related to the work and life of the MPIM's founding director Prof. Dr. Friedrich Hirzebruch (1927-2012). His work largely influenced the development of modern mathematics and through his personal efforts and achievements he contributed in an essential way to the reconstruction of mathematics research in Germany after World War II.
The collection is an ongoing process. Contributions of original documents such as personal photographs or video recordings of talks are welcome.
Manifold Atlas Project
The mission of the Manifold Atlas is to empower and engage topologists, geometers, historians and philosophers to organize and create knowledge about manifolds and the study of manifolds. Here you can find more information about the project.
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