Dr Giorgio Poggesi
Senior Lecturer and ARC DECRA Fellow
School of Mathematical Sciences
College of Science
Eligible to supervise Masters and PhD - email supervisor to discuss availability.
Dr Giorgio Poggesi is an Australian Research Council (ARC) Discovery Early Career Researcher Award (DECRA) Fellow whose research focuses on analysis and partial differential equations (PDEs), with special attention to geometric aspects of PDEs.Giorgio studied Mathematics at Università di Firenze (Italy), where he obtained his bachelor's and master's degrees with 110/110 cum laude in 2013 and 2015, respectively, receiving the "Best Degree Award" in the Pure Mathematics category. He was awarded his PhD in Mathematics "cum laude" at Università di Firenze in 2019.He worked at The University of Western Australia (UWA) from August 2019 to May 2025, where he was a Level C research-intensive academic and served as one of the two representatives of the Department of Mathematics and Statistics on the PMC (School of Physics, Mathematics, and Computing) Research Committee. In September 2022 he was awarded an ARC DECRA for his project "Partial Differential Equations: geometric aspects and applications". In February 2023 he was awarded a J G Russell Award from the Australian Academy of Science. In September 2024 he was awarded the 2024 UWA PMC Research Award (School of Physics, Mathematics & Computing early-career research award).In May 2025, he was appointed as a continuing academic at Level C (Senior Lecturer) at the University of Adelaide.
| Date | Position | Institution name |
|---|---|---|
| 2025 - ongoing | Senior Lecturer | University of Adelaide |
| Year | Citation |
|---|---|
| 2026 | Dipierro, S., Gonçalves da Silva, J., Poggesi, G., & Valdinoci, E. (2026). Fractional De Giorgi conjecture in dimension 2 via complex-plane methods. Journal of Differential Equations, 453, 34 pages. |
| 2025 | Dipierro, S., Gonçalves da Silva, J., Poggesi, G., & Valdinoci, E. (2025). A quantitative Gidas-Ni-Nirenberg-type result for the p-Laplacian via integral identities. Journal of Functional Analysis, 289(10), 111108-1-111108-38. Scopus1 |
| 2025 | Poggesi, G. (2025). Bubbling and quantitative stability for Alexandrov's Soap Bubble Theorem with L1-type deviations. Journal Des Mathematiques Pures Et Appliquees, 204, 103784. Scopus1 WoS1 |
| 2024 | Pacella, F., Poggesi, G., & Roncoroni, A. (2024). Optimal quantitative stability for a Serrin-type problem in convex cones. Mathematische Zeitschrift, 307(4). |
| 2024 | Poggesi, G. (2024). SOAP BUBBLES AND CONVEX CONES: OPTIMAL QUANTITATIVE RIGIDITY. Transactions of the American Mathematical Society, 377(9), 6619-6668. Scopus9 |
| 2024 | Poggesi, G. (2024). Remarks about the mean value property and some weighted Poincaré-type inequalities. Annali di Matematica Pura ed Applicata, 203(3), 1443-1461. Scopus2 WoS2 |
| 2024 | Magnanini, R., & Poggesi, G. (2024). Quantitative symmetry in a mixed Serrin-type problem for a constrained torsional rigidity. Calculus of Variations and Partial Differential Equations, 63(1), 23-1-23-26. Scopus7 WoS7 |
| 2024 | Dipierro, S., Poggesi, G., Thompson, J., & Valdinoci, E. (2024). THE ROLE OF ANTISYMMETRIC FUNCTIONS IN NONLOCAL EQUATIONS. Transactions of the American Mathematical Society, 377(3), 1671-1692. Scopus4 |
| 2024 | Magnanini, R., Molinarolo, R., & Poggesi, G. (2024). A General Integral Identity with Applications to a Reverse Serrin Problem. Journal of Geometric Analysis, 34(8). |
| 2024 | Dipierro, S., Poggesi, G., Thompson, J., & Valdinoci, E. (2024). Quantitative stability for overdetermined nonlocal problems with parallel surfaces and investigation of the stability exponents. Journal Des Mathematiques Pures Et Appliquees, 188, 273-319. |
| 2023 | Magnanini, R., & Poggesi, G. (2023). Interpolating estimates with applications to some quantitative symmetry results. Mathematics in Engineering, 5(1), 1-21. Scopus11 |
| 2023 | Ciraolo, G., Dipierro, S., Poggesi, G., Pollastro, L., & Valdinoci, E. (2023). SYMMETRY AND QUANTITATIVE STABILITY FOR THE PARALLEL SURFACE FRACTIONAL TORSION PROBLEM. Transactions of the American Mathematical Society, 376(5), 3515-3540. Scopus10 |
| 2022 | Cavallina, L., Poggesi, G., & Yachimura, T. (2022). Quantitative stability estimates for a two-phase Serrin-type overdetermined problem. Nonlinear Analysis Theory Methods and Applications, 222, 112919. Scopus6 |
| 2022 | Dipierro, S., Poggesi, G., & Valdinoci, E. (2022). Radial symmetry of solutions to anisotropic and weighted diffusion equations with discontinuous nonlinearities. Calculus of Variations and Partial Differential Equations, 61(2). Scopus19 |
| 2022 | Magnanini, R., & Poggesi, G. (2022). The location of hot spots and other extremal points. Mathematische Annalen, 384(1-2), 1-39. Scopus9 |
| 2021 | Dipierro, S., Poggesi, G., & Valdinoci, E. (2021). A quantitative rigidity result for a two-dimensional Frenkel–Kontorova model. Physica D Nonlinear Phenomena, 419, 132871. Scopus2 |
| 2021 | Dipierro, S., Poggesi, G., & Valdinoci, E. (2021). A Serrin-type problem with partial knowledge of the domain. Nonlinear Analysis Theory Methods and Applications, 208, 112330. Scopus12 |
| 2020 | Magnanini, R., & Poggesi, G. (2020). Nearly optimal stability for Serrin’s problem and the Soap Bubble theorem. Calculus of Variations and Partial Differential Equations, 59(1). Scopus32 |
| 2020 | Magnanini, R., & Poggesi, G. (2020). Serrin's problem and Alexandrov's soap bubble theorem: Enhanced stability via integral identities. Indiana University Mathematics Journal, 69(4), 1181-1205. Scopus43 |
| 2019 | Magnanini, R., & Poggesi, G. (2019). On the stability for Alexandrov’s Soap Bubble theorem. Journal D Analyse Mathematique, 139(1), 179-205. Scopus48 |
| 2019 | Poggesi, G. (2019). Radial symmetry for p-harmonic functions in exterior and punctured domains. Applicable Analysis, 98(10), 1785-1798. Scopus23 |
| Year | Citation |
|---|---|
| 2021 | Magnanini, R., & Poggesi, G. (2021). An Interpolating Inequality for Solutions of Uniformly Elliptic Equations. In Springer Indam Series (Vol. 47, pp. 233-245). Springer International Publishing. DOI Scopus6 |
| 2018 | Cabré, X., & Poggesi, G. (2018). Stable solutions to some elliptic problems: Minimal cones, the Allen-Cahn equation, and blow-up solutions. In Lecture Notes in Mathematics (Vol. 2220, pp. 1-45). Springer International Publishing. DOI Scopus12 |
| Year | Citation |
|---|---|
| 2016 | Magnanini, R., & Poggesi, G. (2016). Littlewood’s fourth principle. In Springer Proceedings in Mathematics and Statistics Vol. 176 (pp. 149-158). Springer International Publishing. DOI Scopus1 |
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