Aleksei Pogorelov
Aleksei Vasil'evich Pogorelov, was a Soviet and Ukrainian mathematician. Specialist in the field of convex and differential geometry, geometric PDEs and elastic shells theory, the author of the novel school textbook on geometry and university textbooks on analytical geometry, on differential geometry, and on foundations of geometry.
Pogorelov's uniqueness theorem and the Alexandrov–Pogorelov theorem are named after him.
Biography
Born March 3, 1919 in Korocha, Kursk Governorate in a peasant family. In 1931, because of the collectivization, the parents of A.V. Pogorelov escaped from the village to Kharkiv, where his father become a worker at the construction of the Kharkiv tractor plant. In 1935, A.V. Pogorelov won the first prize at the Mathematical Olympiad in Kharkiv State University. After high school graduation in 1937, he entered the mathematical department of the Kharkiv State University. He was the best student at the department.In 1941, after involving of the Soviet Union into the Second World War, Aleksei Vasil'evich was sent for 11 months study to N.Y. Zhukovsky Air Force Engineering Academy. During his studies, the students periodically were sent for several months to the front as technicians for the airplane service. After the Red Army Victory over Nazi near Moscow, the training continued for a full term. After academy graduation, he worked at N.Y. Zhukovsky Central Aero-hydrodynamic Institute as a design engineer. The desire to complete university education and specialize in geometry professionally led A.V. Pogorelov to Moscow State University. By recommendation of I.G. Petrovsky and a well-known geometer V.F. Kagan, Aleksei Vasil'evich met A.D. Aleksandrov – the founder of the theory of non-smooth convex surfaces. There were many new questions concerning this theory. Aleksandr Danilovich proposed to give an answer to one of them to A.V. Pogorelov. In a year the problem was solved and A.V. Pogorelov was enrolled to the graduate school of the Mechanics and Mathematics Department of Moscow State University. Nikolai Efimov became his scientific advisor on topics of Aleksandrov theory. After defending his Ph.D. thesis in 1947, he was demobilized and moved to Kharkiv, where he started to work at the Institute of Mathematics of Kharkov State University and the Geometry Department of the university. In 1948 he defended his doctoral thesis. In 1951 he became the Corresponding Member of the Academy of Sciences of Ukraine, in 1960 he became the Corresponding member of the USSR Academy of Sciences. In 1961 he became an Academician of the Academy of Sciences of Ukraine. In 1976, he became an Academician of the USSR Academy of Sciences. From 1950 to 1960 he was the Head of the Geometry Department at Kharkiv State University. From 1960 to 2000 he was the Head of the Geometry Division at the Verkin Institute for Low Temperature Physics and Engineering of the National Academy of Sciences of Ukraine.
Since 2000 he lived in Moscow and worked at the Steklov Mathematical Institute.
He died on December 17, 2002 and was buried in Moscow at the Nikolo-Arkhangelsk cemetery.
In 2015, one of the streets in Kharkiv was named after Academician A.V. Pogorelov.
In 2007, National Academy of Sciences of Ukraine founded the Pogorelov Award for the achievements in the field of geometry and topology.
One of the asteroids is named after A.V. Pogorelov: .
Awards
- The Stalin Prize of the Second Level for works on the theory of convex surfaces, presented in the paper "Uniquely Definition of Convex Surfaces" and in a series of papers published in "Proceedings of the USSR Academy of Sciences"
- Lenin Prize – for the results in geometry "in the large"
- Lobachevsky International Prize - for the paper "Some questions of geometry in the large in Riemannian space"
- The Krylov Prize of the Academy of Sciences of the Ukrainian SSR
- The State Prize of the Ukrainian SSR
- N. N. Bogolubov Prize of the NAS of Ukraine
- The State Prize of Ukraine
- Two Lenin Orders
- Order of the Labor Banner
- Order of the Patriotic War of the II degree
Scientific interests
- is this immersion unique up to rigid motion?
- if the metric given on the sphere is a regular one and of positive Gaussian curvature, is it true then that the surface with this metric is regular?
- G. Minkowski proved an existence theorem for a closed convex surface with the Gaussian curvature given as a function of a unit normal under some natural condition on this function; the open question was: if the function is regular on a sphere, is the surface regular itself?
- Let F1 and F2 be two closed convex isometric surfaces in the three-dimensional Euclidean space or in a spherical space. Then the surfaces coincide up to the rigid motion.
- A closed convex surface in a space of constant curvature is rigid outside flat domains on it. This means that the surface admits only trivial infinitesimal bendings.
- If the metric of a convex surface is regular of regularity Ск, k≥2, in a space of constant curvature К* and the Gaussian curvature of the surface satisfies К>К*, then the surface is Ск-1,α.
The theorems proved by Pogorelov formed the basis for his nonlinear theory of thin shells. This theory is concerned with those elastic states of the shell which differ significantly comparing to the original form. Under such deformations, the middle surface of a thin shell undergoes bending with preservation of the metric. This makes it possible, by using theorems proved by Pogorelov for convex surfaces, to investigate loss of stability and the over critical elastic state of convex shells under a given strain. Such shells are the most common elements of modern designs.
Results 1) and 2) were generalized for regular surfaces in a Riemannian space. In addition, the Weyl problem for Riemannian space was solved: it was proved that a regular metric of Gaussian curvature greater than some constant c on a two-dimensional sphere can be isometrically immersed into a complete three-dimensional Riemannian space of curvature
A closed convex hypersurface is uniquely defined not only by the metric but also by the Gaussian curvature as a function of unit normals. Moreover, the hypersurface is uniquely determined up to a parallel transport. This was proved by G. Minkowski. But is the hypersurface regular under the condition that the Gaussian curvature K is a regular function of a unit normal? Pogorelov proved that if positive function K belongs to the class Сk, k≥3, then the support function will be of regularity class Сk+1,v, 0
The hardest part of the proof of the theorem was to obtain a priori estimates for the derivatives of the support function of a hypersurface up to third order inclusively. Pogorelov's method of a priori estimates was used by S.-T. Yau to obtain a priori estimates for solutions of complex Monge-Ampere equations. This was the main step in the proof of the existence of Calabi-Yao manifolds, which play an important role in theoretical physics. A Monge-Ampère equation has the form
A priori estimates in the Minkowski problem are a priori for the solution of the Monge-Ampère equation with the function
At that time there was no approach to studying this completely nonlinear equation. A. V. Pogorelov has created the theory of the Monge-Ampère equation by using the geometric methods. First, going from polyhedra, he proved the existence of generalized solutions under natural conditions on the right-hand side. After that he has found the a priori estimates for the derivatives up to the third order inclusively for the regular solutions. Using the a priori estimates, he has proved the regularity of strictly convex solutions, the existence of solutions of the Dirichlet problem and their regularity. The Monge-Ampère equation is an essential component of the Monge-Kantorovich transport problem; it is used in conformal, affine, Kähler geometries, in meteorology and in financial mathematics. A.V. Pogorelov once said about the Monge-Ampère equation: this is a great equation with which I had the honor to work.
One of the most conceptual works of A. V. Pogorelov refers to the cycle of works about smooth surfaces of bounded external curvature. A.D. Aleksandrov created a theory of general metric manifolds that naturally generalize Riemannian manifolds. In particular, he introduced the class of two-dimensional manifolds of bounded curvature. They exhaust the class of all metrized two-dimensional manifolds that admit, in a neighborhood of each point, a uniform approximation by Riemannian metrics with absolute integral curvature bounded in aggregate.
Naturally, the question arose about the class of surfaces in three-dimensional Euclidean space carrying such a metric with preservation of connections between the metric and the extrinsic geometry of the surface. Partially answering this question, A.V. Pogorelov introduced the class of С1-smooth surfaces with the requirement on the area of a spherical image to be bounded, taking into account the multiplicity of the covering in some neighborhood of each point of the surface. Such surfaces are called surfaces of bounded extrinsic curvature.
For such surfaces there is also a very close connection between the intrinsic geometry of the surface and its extrinsic shape: a complete surface with a bounded extrinsic curvature and a nonnegative intrinsic curvature is either a closed convex surface or an unbounded convex surface; a complete surface with zero intrinsic curvature and bounded extrinsic curvature is a cylinder.
The first work of A. V. Pogorelov on surfaces of bounded extrinsic curvature was published in 1953. In 1954, J. Nash published the paper on С1-isometric immersions, which was improved by N. Kuiper in 1955. It follows from these studies that a Riemannian metric defined on a two-dimensional manifold, under very general assumptions, admits a realization on a С1-smooth surface in a three-dimensional Euclidean space. Moreover, this realization is carried out as freely as a topological immersion into the space of the manifold on which the metric is given. Hence it is clear that for С1-surfaces, even with a good intrinsic metric, it is impossible to preserve the connections between the intrinsic and extrinsic curvatures. Even in case if a С1-surface carries a regular metric of positive Gaussian curvature, then this does not imply the local convexity of the surface. This emphasizes the naturalness of the class of surfaces of bounded external curvature introduced by A. V. Pogorelov.
A. V. Pogorelov solved Hilbert's fourth problem, set by D. Hilbert at the II International Congress of Mathematicians in Paris in 1900. He found all, up to isomorphism, realizations of the systems of axioms of classical geometries if one omits the congruence axioms containing the concept of angle and supplement these systems with the axiom of "triangle inequality".
A. V. Pogorelov was one of the first who has proposed a new idea in the construction of a cryoturbogenerator with superconducting field winding and took an active part in technical calculations and creation of corresponding industrial samples.
Selected publications
- . Moscow: Mir Publishers...