The study of the projective properties of geometric figures.
射影几何学
Example sentencesExamples
His work in geometry included a study of conics, quadrics and projective geometry.
In Catania he taught projective geometry and descriptive geometry.
He began a teaching career in 1870 in a secondary school in Milan, then two years later he went to the University of Rome to teach descriptive and projective geometry.
Under their direction he laid the basis for the important work he was later to achieve in the fields of foundations of geometry, projective geometry, topology, differential invariants and spinors.
He was promoted a number of times, to extraordinary professor in differential geometry, then extraordinary professor in projective geometry, then of analytic geometry.
He united projective geometry and metrical geometry which is dependent on sizes of angles and lengths of lines.
After graduating, he continued working for his doctorate at Trinity on projective geometry.
His time for research was now limited but he still made important contributions undertaking research on infinitesimal geometry, projective geometry and the differential geometry of curves and surfaces.
This latter book develops the subject of projective geometry without using the concept of distance and it bases projective geometry on a minimal set of axioms.
This impressive work extended apolarity theory as introduced by Reye to projective geometry in several dimensions using the theory of rational curves.
This treatise represented a major step forward in understanding the geometry of perspective and it was a major contribution towards the development of projective geometry.
It contained a number of projective geometry theorems, including Pascal's mystic hexagon.
His most important work was on differential projective geometry where he used the absolute differential calculus.
One could certainly consider this work as laying the foundations for the theory of descriptive and projective geometry.
Servois worked in projective geometry, functional equations and complex numbers.
He was one of the greatest contributors to projective geometry.
Pappus of Alexandria is the last of the great Greek geometers and one of his theorems is cited as the basis of modern projective geometry.
He made substantial contributions to projective geometry and wrote an important book on the topic.
During his imprisonment he studied projective geometry.
Enriques was appointed to the University of Bologna where he taught projective geometry and descriptive geometry.
Definition of projective geometry in US English:
projective geometry
noun
The study of the projective properties of geometric figures.
射影几何学
Example sentencesExamples
It contained a number of projective geometry theorems, including Pascal's mystic hexagon.
This impressive work extended apolarity theory as introduced by Reye to projective geometry in several dimensions using the theory of rational curves.
Pappus of Alexandria is the last of the great Greek geometers and one of his theorems is cited as the basis of modern projective geometry.
After graduating, he continued working for his doctorate at Trinity on projective geometry.
His time for research was now limited but he still made important contributions undertaking research on infinitesimal geometry, projective geometry and the differential geometry of curves and surfaces.
Under their direction he laid the basis for the important work he was later to achieve in the fields of foundations of geometry, projective geometry, topology, differential invariants and spinors.
Enriques was appointed to the University of Bologna where he taught projective geometry and descriptive geometry.
One could certainly consider this work as laying the foundations for the theory of descriptive and projective geometry.
This latter book develops the subject of projective geometry without using the concept of distance and it bases projective geometry on a minimal set of axioms.
He was one of the greatest contributors to projective geometry.
He made substantial contributions to projective geometry and wrote an important book on the topic.
In Catania he taught projective geometry and descriptive geometry.
Servois worked in projective geometry, functional equations and complex numbers.
This treatise represented a major step forward in understanding the geometry of perspective and it was a major contribution towards the development of projective geometry.
He began a teaching career in 1870 in a secondary school in Milan, then two years later he went to the University of Rome to teach descriptive and projective geometry.
He was promoted a number of times, to extraordinary professor in differential geometry, then extraordinary professor in projective geometry, then of analytic geometry.
During his imprisonment he studied projective geometry.
His work in geometry included a study of conics, quadrics and projective geometry.
His most important work was on differential projective geometry where he used the absolute differential calculus.
He united projective geometry and metrical geometry which is dependent on sizes of angles and lengths of lines.