Mathematics is the oldest science, and still one of the most important and widely applicable. The mathematical tradition at the Scuola Normale is quite strong, and our PhD program prepares high-level researchers, who routinely go on to teach and do research in very prestigious institutions, in Italy and abroad. Although our program is mostly in pure mathematics, the preparation that one obtains can easily be put to use in a vast range of fields with high scientific and technological content.
One of the characteristics of the Scuola Normale is the constant flow of visitors and post-docs from all over the world; this, together with the financial support offered to our students for visits to research institutes and universities of very high standing, greatly enlarges their research horizons. Also, its limited size favors interaction among students in different disciplines, resulting in a remarkable cultural and personal enrichment.
The mathematical research at the Scuola Normale is concentrated in some of the most significant areas of mathematics at the international level.
- In Calculus of Variations, our main activity is in geometric measure theory, even in metric measure spaces, elliptic and parabolic partial differential equations, optimal mass transport and its applications.
- In Harmonic Analysis the main themes are invariant operators on Lie Groups, singular integrals, Fourier multipliers, and Radon transforms. Methods of commutative and noncommutative harmonic analysis are also applied to complex analysis.
- In Differential Geometry and Global Analysis we treat non-linear problems in Riemannian geometry and geometric evolutions, Riemannian manifolds with special structures, such as solitons of the Ricci flow or quasi-Einstein manifolds, calibrated geometries and varieties with special holonomy, and the geometry of submanifolds.
- In Algebraic Geometry we do research on algebraic stacks, algebraic groups and their actions on algebraic varieties, homogeneous spaces and their equivariant embeddings, particularly symmetric and spherical varieties, and logarithmic geometry.
- In Number Theory the most studied aspects are the applications of geometric methods to the problems of integral points, with particular stress on the effectivity of solutions, heights, and intersection problems in algebraic groups.
- In Dynamical Systems we concentrate on problems of stability of quasi-periodic orbits, on KAM theory, on holomorphic dynamics, on the ergodic theory of continued fractions and on Teichmüller flows.
Teaching is divided into lecture and seminar courses (all held in English). Graduate students in Mathematics will annually agree with the PhD Coordinator a study plan to be presented to the Faculty Board. Such a document will specify the planned research and education activities for the relevant academic year. The courses will be chosen to enlarge the student background and deepen specific aspects related to the PhD Thesis project. PhD students are expected to take at least three courses and to pass the corresponding exams.Students may be asked to follow some course from the Undergraduate program, to fill some gaps in their preparation and these may or may not be in addition to the above three compulsory courses, on a case by case basis. At the end of the first year students are expected, in close consultation with the Coordinator and with approval from the Faculty Board, to choose the Thesis supervisor and project. At the end of the second year, PhD students should present a written report concerning the research done and the results achieved so far, together with any publications produced. The report will be discussed in an oral presentation in front of a panel of experts appointed by the Faculty Board. Upon successful performance, the student will be admitted to the third year.
According to research needs, students are encouraged to spend periods of study and research at Italian and foreign institutions.