[comi]

Giovanni Eugenio Comi

Post Doc., Scuola Normale Superiore

Email: giovanni.comi AT sns.it

arxiv id: comi_g_1

orcid id: 0000-0002-1486-3144

Available papers (14):

• G. E. Comi - D. Spector - G. Stefani (Fract. Calc. Appl. Anal.)
  The fractional variation and the precise representative of $BV^{\alpha,p}$ functions (2022)
• G. E. Comi - G. Stefani (J. Math. Anal. Appl.)
  Leibniz rules and Gauss-Green formulas in distributional fractional spaces (2022)
• V. Buffa - G. E. Comi - M. Miranda Jr (Rev. Mat. Iberoamericana)
  On $BV$ functions and essentially bounded divergence-measure fields in metric spaces (2021)
• A. Carbotti - G. E. Comi (Communications on Pure and Applied Analysis)
  A note on Riemann-Liouville fractional Sobolev spaces (2021)
• G. E. Comi (Ph.D. Thesis)
  Refined Gauss-Green formulas and evolution problems for Radon measures (2020)
• G. E. Comi - V. Magnani (Adv. Math.)
  The Gauss-Green theorem in stratified groups (2020)
• E. Bruè - M. Calzi - G. E. Comi - G. Stefani (Accepted Paper: C. R. Math.)
  A distributional approach to fractional Sobolev spaces and fractional variation: asymptotics II (2020)
• G. E. Comi - G. Stefani (Journal of Functional Analysis)
  A distributional approach to fractional Sobolev spaces and fractional variation: existence of blow-up (2019)
• G. Q. Chen - G. E. Comi - M. Torres (Arch. Ration. Mech. Anal.)
  Cauchy fluxes and Gauss-Green formulas for divergence-measure fields over general open sets (2019)
• G. E. Comi - G. Stefani (Accepted Paper: Rev. Mat. Complut.)
  A distributional approach to fractional Sobolev spaces and fractional variation: asymptotics I (2019)
• L. Ambrosio - G. E. Comi (Current Research in Nonlinear Analysis: In Honor of Haim Brezis and Louis Nirenberg)
  Anisotropic surface measures as limits of volume fractions (2018)
• G. E. Comi (Atti Accad. Naz. Lincei Rend. Lincei Mat. Appl.)
  $BMO$-type norms and anisotropic surface measures (2018)
• G. E. Comi - M. Torres (Atti Accad. Naz. Lincei Rend. Lincei Mat. Appl.)
  One-sided approximation of sets of finite perimeter (2017)
• G. E. Comi - K. R. Payne (Adv. Calc. Var.)
  On locally essentially bounded divergence measure fields and sets of locally finite perimeter (2017)

Seminars:

• 3 mar 2022: Seminario MAP: Distributional fractional Sobolev and BV spaces
• 2 mar 2016: Divergence-measure fields: generalizations of Gauss-Green formula with applications

Speaker:

• 16 apr 2019 - 17 apr 2019: Some topics of Geometric Analysis and Geometric Measure Theory
• 30 jun 2017 - 1 jul 2017: From Regensburg to Pisa: two days of Analysis under the leaning tower