Graduated in Bachelor of Mathematics from the Institute of Mathematical and Computing Sciences of the University of São Paulo (ICMC-USP). He is currently studying for a master's degree in Mathematics and is a FAPESP scholarship holder at the same institute, in the area of #8203;#8203;Differential Geometry. He carried out an academic exchange at the University of Porto, Portugal, during the first semester of 2020 and was a FAPESP fellow in two Scientific Initiation projects. Additionally, he carried out a BEPE research internship at the University of Granada, Spain, during the first semester of 2023. (Source: Lattes Curriculum)
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The theory of minimal surfaces, and more generally, constant mean curvature surfaces in the 3-dimensional Euclidean space has its roots in the calculus of variations developed by Euler and Lagrange in the 18th century and in later investigations by Enneper, Riemann, Weierstrass, among others, in the 19th century. Many of the global questions and conjectures that arose in this classical su…
This research project concern a first study about the maximum principle and some geometric applications. More precisely, we will study the Alexandrov's Theorem and a theorem about classification of properly embedded CMC-surfaces of finite topology in the Euclidean space.
This project of scientific initiation proposes to introduce the student to the Differential Geometry through the study of some relevant topics in the theory of the surfaces in the three-dimensional Euclidean space. Specifically, we will study the fundamental stages of the history of the minimal surfaces.
Elliptic special Weingarten surfaces had an outgrowth in the 90's thanks to the work of Rosenberg and Sa Earp, where they proved that this family satisfies the maximum principle, interior and boundary. The goal of this project is to study elliptic special Weingarten surfaces of minimal type and finite total curvature in the 3-dimensional homogeneous spaces with isometry group of dimension…
| 3 / 3 | Completed scholarships in Brazil |
| 1 / 1 | Completed scholarships abroad |
| 4 / 4 | All Scholarships |
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