Giuseppe Mingione
Born (1972-08-28) 28 August 1972
Nationality Italy
Alma materUniversity of Naples Federico II
Known for
AwardsBartolozzi Prize (2005)
Stampacchia Medal (2006)
Caccioppoli Prize (2010)
Scientific career
Fields
InstitutionsUniversity of Parma
Doctoral advisorNicola Fusco

Giuseppe Mingione (born 28 August 1972) is an Italian mathematician who is active in the fields of partial differential equations and calculus of variations.

Scientific activity

Mingione received his Ph.D. in mathematics from the University of Naples Federico II in 1999 having Nicola Fusco as advisor; he is professor of mathematics at the University of Parma. He has mainly worked on regularity aspects of the Calculus of Variations, solving a few longstanding questions about the Hausdorff dimension of the singular sets of minimisers of vectorial integral functionals and the boundary singularities of solutions to nonlinear elliptic systems.[1] This connects to the work of authors as Almgren, De Giorgi, Morrey, Giusti, who proved theorems asserting regularity of solutions outside a singular set (i.e. a closed subset of null measure) both in geometric measure theory and for variational systems of partial differential equations. These are indeed called partial regularity results and one of the main issues is to establish whether the dimension of the singular set is strictly less than the ambient dimension. This question has found a positive answer for general integral functionals, thanks to the work of Kristensen and Mingione, who have also given explicit estimates for the dimension of the singular sets of minimisers.[2][3] Subsequently, Mingione has worked on nonlinear potential theory obtaining potential estimates for solutions to nonlinear elliptic and parabolic equations. Such estimates allow to give a unified approach to the regularity theory of quasilinear, degenerate equations[4][5][6] and relate to and upgrade previous work of Kilpeläinen, Malý, Trudinger, Wang.

Recognition

Mingione was awarded the Bartolozzi prize in 2005, the Stampacchia medal in 2006 and the Caccioppoli prize in 2010. In 2007 he was awarded an ERC grant.[7] Mingione is listed as an ISI highly cited researcher[8] and was invited to deliver the Nachdiplom Lectures in 2015 at ETH Zürich.[9] He was invited speaker at the 2016 European Congress of Mathematics in Berlin.[10] In 2017 he was appointed Commander of the Order of Merit of the Italian Republic by the President of the Italian Republic.[11]

References

  1. "Regularity of minima: an invitation to the Dark Side of the Calculus of Variations" (PDF). Applications of Mathematics. Retrieved May 6, 2013.
  2. Kristensen, Jan; Mingione, Giuseppe (2006). "The singular set of minima of integral functionals". Archive for Rational Mechanics and Analysis. 180 (3): 331–398. Bibcode:2006ArRMA.180..331K. doi:10.1007/s00205-005-0402-5. S2CID 121550836.
  3. Kristensen, Jan; Mingione, Giuseppe (2007). "The singular set of Lipschitzian minima of multiple integrals". Archive for Rational Mechanics and Analysis. 184 (2): 341–369. Bibcode:2007ArRMA.184..341K. doi:10.1007/s00205-006-0036-2. S2CID 15872181.
  4. "Caccioppoli prize citation". Italian Mathematical Union. Archived from the original on October 11, 2017. Retrieved May 5, 2013.
  5. Mingione, Giuseppe (2010). "Nonlinear aspects of Calderón-Zygmund theory". Jahresbericht der Deutschen Mathematiker-Vereinigung. 112 (3): 159–191. doi:10.1365/s13291-010-0004-5. S2CID 120017610.
  6. Mingione, Giuseppe (2011). "Gradient potential estimates". Journal of the European Mathematical Society. 13 (2): 249–486. doi:10.4171/JEMS/258.
  7. "ERC funded projects". European Research Council. Retrieved May 5, 2013.
  8. "Lists of ISI highly cited researchers". Archived from the original on 2018-05-26. Retrieved 2018-03-01.
  9. "ETH Lectures in Mathematics". Archived from the original on 2019-08-19. Retrieved 2019-08-19.
  10. "List of speakers at the 2016 ECM".
  11. "Prof. Giuseppe Mingione, Commander".
This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.