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Anne Boutet de Monvel

From Wikipedia, the free encyclopedia

Anne-Marie Boutet de Monvel (née Berthier, born 1948, also published as Anne-Marie Berthier and Anne-Marie Boutet de Monvel-Berthier)[1] is a French applied mathematician and mathematical physicist, and a professor emerita in the University of Paris, affiliated with the Institut de mathématiques de Jussieu – Paris Rive Gauche.[2]

Books

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Boutet de Monvel is the author of Spectral theory and wave operators for the Schrödinger equation (Pitman, 1982).[3] With Werner Amrein and Vladimir Georgescu she is the co-author of Hardy type inequalities for abstract differential operators (American Mathematical Society, 1987)[4] and -groups, commutator methods and spectral theory of -body Hamiltonians (Birkhäuser, 1996).[5]

For many years she was co-editor-in-chief of the book series Progress in Mathematical Physics, following its relaunch by Birkhäuser in 1999.[6]

Recognition

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She was named a Fellow of the American Mathematical Society, in the 2022 class of fellows, "for contributions to mathematical physics, particularly Schroedinger operator theory, and to the theory of integrable systems".[7]

Personal life

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Boutet de Monvel was married to Louis Boutet de Monvel (1941–2014), also a mathematician.[8]

References

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  1. ^ Birth name and year from idRef authority control record, accessed 2021-11-05
  2. ^ Emérites, Institut de mathématiques de Jussieu, retrieved 2021-11-05
  3. ^ Reviews of Spectral theory and wave operators for the Schrödinger equation: Boris Pavlov, MR0668353; A. Ramm, Zbl 0484.35002
  4. ^ Reviews of Hardy type inequalities for abstract differential operators: H. Triebel, MR0912640; J. Wloka, Zbl 0633.35009
  5. ^ Review of -groups, commutator methods and spectral theory of -body Hamiltonians: H. Baumgärtel, MR1388037
  6. ^ "Relaunch! Progress in Mathematical Physics" (PDF), Notices of the American Mathematical Society (advertisement), 48 (2), front matter, February 2001
  7. ^ 2022 Class of Fellows of the AMS, American Mathematical Society, retrieved 2021-11-05
  8. ^ Simon, Barry (2019), Loewner's theorem on monotone matrix functions, Grundlehren der mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences], vol. 354, Springer, Cham, p. 357, doi:10.1007/978-3-030-22422-6, ISBN 978-3-030-22421-9, MR 3969971
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