「projective」の共起表現一覧(1語右で並び替え)
該当件数 : 84件
olomorphic vector bundle over a non-singular | projective algebraic variety admits a Hermitian-Einstei |
Fano worked on | projective and algebraic geometry; the Fano plane, Fano |
ar spaces can be seen as a generalization of | projective and affine planes, and more broadly, of 2-(v |
d in general by Adolf Kneser in 1912 using a | projective argument. |
Recently launched programmes | Projective Cities, Design+Make and Interprofessional St |
ay also mean specifically a convex cone or a | projective cone. |
cle and describing it as the Levi graph of a | projective configuration discovered by Zacharias. |
for graphs, digraphs, combinatorial designs, | projective configurations, polyhedra, graph embeddings |
gle and the complete quadrilateral both form | projective configurations; in the notation of projectiv |
Steinitz's 1894 thesis was on the subject of | projective configurations; it contained the result that |
They are also known as | projective designs. |
He studied | projective differential geometry under Prof. |
His research interests included | projective differential geometry and topology. |
therian local ring with maximal ideal m, the | projective dimension of the residue field A/m. |
the supremum of the set of | projective dimensions of all finite A-modules; |
The | projective dual of a complete quadrangle is a complete |
an space, but only in certain others such as | projective elliptic space. |
A | projective frame on n-dimensional projective space is a |
Defining affine (and | projective) geometries as configurations of points and |
The name affine geometry, like | projective geometry and Euclidean geometry, follows nat |
s extended as a definition of noncommutative | projective geometry by Michael Artin and J. J. Zhang, w |
as become necessary to augment the axioms of | projective geometry with Fano's axiom that the diagonal |
solute, and hyperbolic geometry (but not for | projective geometry). |
In | projective geometry, the complex projective line includ |
lgebra, geometry, trigonometry, probability, | projective geometry, pre-calculus and calculus. |
of intermediacy (or "betweenness") but, like | projective geometry, omitting the basic notion of measu |
In | projective geometry, Levi graphs are a form of bipartit |
tion problem, the graph isomorphism problem, | projective geometry, Hamiltonian cycles, planarity, gra |
In mathematics, specifically | projective geometry, a complete quadrangle is a system |
from many disciplines, including optics and | projective geometry. |
to Rome to work at the chair of Analytic and | Projective Geometry. |
important for the subsequent development of | projective geometry. |
Klein model of hyperbolic space, relating to | projective geometry. |
s Extension problems in intuitionistic plane | Projective geometry. |
Quantum mechanics may be modelled on a | projective Hilbert space, and the categorical product o |
lly conceptual developments from his work on | projective identification - from the "minutely split 'p |
er in a form of an ego-defense system called | projective identification." |
together with an affine or, more generally, | projective map π mapping Q onto P. |
This leads to an ideal | projective measurement. |
ment is best thought of as the ideal quantum | projective measurement. |
In 1984, N. Karmarkar proposed a | projective method for linear programming. |
emann surfaces in , C. S. Seshadri's work on | projective modules over polynomial rings and M. S. Nara |
of toric varieties, where it corresponds to | projective normality of the toric variety determined by |
N. Moschovakis, with a dissertation entitled | Projective Ordinals and Countable Analytic Sets. |
A | projective plane has non-orientable genus one. |
Freedman, Michael H.; Meyer, David A.: | Projective plane and planar quantum codes. |
An intuitive understanding of the complex | projective plane is given by Edwards (2003), which he a |
Locally, the | projective plane has all the properties of spherical ge |
ee vertices considered at infinity (the real | projective plane at infinity) correspond directionally |
Let X be the complex | projective plane with its standard symplectic form (cor |
ive Euler characteristic: the sphere and the | projective plane (Coxeter 80). |
s, colored by their order of overlap in each | projective plane. |
quilateral triangle faces form a rudimentary | projective plane. |
is an embedding of Petersen graph on a real | projective plane. |
gonal embedding of the Petersen graph in the | projective plane. |
K4 (the complete graph with 4 vertices) on a | projective plane. |
ed to that of the sphere is that of the real | projective plane; it is obtained by identifying antipod |
orics includes an important paper of 1943 on | projective planes: he also worked on block designs. |
ned point on the sphere), they do not define | projective polyhedra by the quotient map from 3-space ( |
It can be realized as a | projective polyhedron (a tessallation of the real proje |
It can be realized as a | projective polyhedron (a tessellation of the real proje |
mid without its base.It can be realized as a | projective polyhedron (a tessallation of the real proje |
an Euler characteristic of 1 and is hence a | projective polyhedron, yielding a representation of the |
nfused with the demicube - the hemicube is a | projective polyhedron, while the demicube is an ordinar |
y the tetrahemihexahedron is topologically a | projective polyhedron, as can be verified by its Euler |
cardinals that all games with winning set a | projective set are determined (see Projective determina |
Real | projective space RPn is essential since the inclusion |
complex hyperplane does not separate complex | projective space into two components, because it has co |
ple a smooth complex hypersurface in complex | projective space of dimension n will be a manifold of d |
quintic - i.e. a quintic hypersurface in the | projective space . |
umford regularity of a coherent sheaf F over | projective space Pn is the smallest integer r such that |
set A of hyperplanes in a linear, affine, or | projective space S. Questions about a hyperplane arrang |
an space, thus effectively regarding it as a | projective space. |
Its symmetry group is the | projective special linear group L2(11), so it has 660 s |
Its symmetry group is the | projective special linear group L2(19), so it has 3420 |
supersymmetry algebra, harmonic superspace, | projective superspace |
of the definition: some authors restrict to | projective surfaces, and some allow surfaces with Du Va |
tor head is far more stable than traditional | projective systems. |
arrower developed a scale, based on a set of | projective techniques, that effectively predicted which |
For the | projective theory see quadric (projective geometry). |
o complete quadrilaterals, there is a unique | projective transformation taking one of the two configu |
onograph entitled Quantitative Arithmetic of | Projective Varieties. |
The | projective variety defined by this graded ring is calle |
こんにちは ゲスト さん
ログイン |
Weblio会員(無料)になると 検索履歴を保存できる! 語彙力診断の実施回数増加! |
こんにちは ゲスト さん
ログイン |
Weblio会員(無料)になると 検索履歴を保存できる! 語彙力診断の実施回数増加! |