「Geometry」の共起表現一覧(1語右で並び替え)2ページ目
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of the International Journal of Computational | Geometry and Applications. |
has spanned representation theory, algebraic | geometry and mathematical physics. |
e of quantum gravity and the relation between | geometry and quantum field theories. |
International Journal of Computational | Geometry and Applications (IJCGA) |
ntal contributions to the field of analytical | geometry and was a pioneer in the investigations of ca |
In computational | geometry and geometric graph theory, a β-skeleton or b |
le deficit is defined similarly in hyperbolic | geometry and is likewise proportional to area. |
Fomenko Integrability and Nonintegrability in | Geometry and Mechanics. |
d Geography, Foreign Languages, Pre-Calculus, | Geometry, and Algebra 2. |
Avis is a professor in computational | geometry and applied mathematics in the School of Comp |
erger's algorithm, in computational algebraic | geometry and computational commutative algebra |
ildren, teaching lessons on basic arithmetic, | geometry, and drawing through a series of interactive |
maticians, working in the fields of topology, | geometry and ergodic theory. |
und around a tube to create a tangential flow | geometry and to reduce membrane fouling. |
Here his text on the sulvasutras dealt with | geometry, and extended the treatment of the Pythagorea |
cation at Tiverton, Rhode Island, and studied | geometry and applied mathematics on his own. |
e extended the curriculum to include algebra, | geometry and Latin, they named the school the Diocleti |
er scientist who specializes in combinatorial | geometry and number theory. |
robotics, 3D computer graphics, computational | geometry, and interactive computer simulation. |
The | geometry and kinematics of this gaseous circumstellar |
under the general headings of noncommutative | geometry and quantum geometry. |
The term "projective | geometry" is sometimes used to indicate the generalise |
The courses Integrated Algebra', | Geometry, and Algebra II/Trigonometry are required cou |
each characteristics, specifically the breach | geometry and formation time, were estimated by Yochum |
al graphs, introducing the connection between | geometry and the physical world that became a second c |
The furnace was re-lined to the new | geometry and found to be much more efficient, and No. |
nd the International Journal of Computational | Geometry and Applications. |
lity of an accelerated mass to warp lightbeam | geometry and lightbeam-based coordinate systems, is re |
She is co-author of the book Submanifold | Geometry and Critical Point Theory and an editor of th |
ekker, 1985, ISBN 0-8247-7437-X) explores the | geometry and topology of low-dimensional manifolds. |
dation state prefers a different coordination | geometry, and binds preferentially to different ligand |
atics and physics, in particular differential | geometry and general relativity, a warped geometry is |
reas of combinatorics, graph theory, discrete | geometry, and number theory. |
allow exploration of the connections between | geometry and algebra. |
e extremely close to discovering non-Eucliean | geometry and was a logician. |
tandard includes standardized definitions for | geometry and topology, data quality, coordinate system |
rboux made several important contributions to | geometry and mathematical analysis (see linear PDEs fo |
ermination of cell division site based on the | geometry and polarity of the cells. |
ibility polygons are studied in computational | geometry and find their applications in motion plannin |
He studied | geometry and architecture with Juan de Herrera, the ar |
Hindi, Kannada, History, Geography, Algebra, | Geometry, and Science. |
hysics, including number theory, differential | geometry and particle physics. |
This relationship between local | geometry and coupling constant is of great value throu |
holds the Isaias Nizri Chair in Computational | Geometry and Robotics. |
oon return to approximately the same relative | geometry, and a nearly identical eclipse will occur. |
ifferential and Integral Calculus, Analytical | Geometry and Trigonometry, Spherical Trigonometry, Ana |
Mass analyzers are typically Mattauch-Herzog | geometry, and use either photosensitive plates for ion |
In Riemannian | geometry and general relativity, the trace-free Ricci |
art in the work of “International Society for | Geometry and Graphics” (ISGG). |
hy, Foreign Languages, Physics, Pre-Calculus, | Geometry, and Algebra 2. |
ndo also wrote theoretical tracts on gravity, | geometry and architecture, occupying himself above all |
Noncommutative | geometry and Number Theory (with Caterina Consani) Vie |
re applications of graph theory, game theory, | geometry and general use of data structures and algori |
be designed that use electrowetting, channel | geometry, and hydrophobic or hydrophilic coatings to a |
rystal structure is 0.541 nm, calculated from | geometry and ionic radii of 0.074 nm (zinc) and 0.184 |
8-1913 began to reoresent his new interest in | geometry and simultaneous perspective. |
Language, Hindi, History, Geography, Algebra, | Geometry, and Science as per the SSC Maharashtra Board |
ons Foundation to found the Simons Center for | Geometry and Physics at Stony Brook, the largest gift |
In mathematics (in particular | geometry and trigonometry) and all natural sciences (i |
cine, astronomy, logic, mathematics including | geometry, and mechanics. |
slim mathematician and astronomer who studied | geometry and in particular tangents to circles. |
He was an excellent student, especially in | geometry and mathematics, and graduated with honors at |
emes, including a series on Music, Astronomy, | Geometry, and Philosophy. |
In mathematics, especially in | geometry and topology, an ambient space is the space s |
various problems of number theory, algebraic | geometry and analysis on locally symmetric spaces. |
approximation can be applied to the electrode | geometry and ohmic drop distortion is minimal. |
s, ANSA maintains the association between CAD | geometry and the FE mesh. |
001), Electric Steamboat (2004), Rigid String | Geometry and Zelle 148 (2006), Vice Versa, Kalligaphie |
ms are administered in Algebra I, Algebra II, | Geometry, and Biology. |
the philosophy of mathematical fields such as | geometry and probability, quantum mechanics, and the s |
eory, and for expounding the relation between | geometry and field theories that arise through string |
are much smaller than a cutting tool, and the | geometry and orientation of individual grains are not |
able, and so it relies on text to specify the | geometry and toolpaths needed to machine a part. |
oryunov is a Russian mathematician working in | geometry and topology. |
Practical Algebra (1908, 1910) and Analytical | Geometry and Curve Tracing (1907; revised edition, 191 |
ncluding function minimization, computational | geometry, and combinatorial counting. |
d Chicago where he "encountered the elemental | geometry and organic ornamentation of Gill and Wright' |
scientific articles about classical algebraic | geometry and abstract algebra. |
Differential | geometry and topology |
ormerly the arXiv moderator for computational | geometry and discrete mathematics. |
arithmic form, effective methods, Diophantine | geometry and Diophantine analysis. |
German mathematician who worked on algebraic | geometry and invariant theory. |
In differential | geometry and mathematical physics (especially string t |
flow theory in combinatorial optimization, to | geometry, and to physics. |
In | geometry, and less formally, in most fractal art softw |
Stecchini's analysis of the | geometry and methods for constructing the Great Pyrami |
ped polygons are of interest in computational | geometry and its applications such as motion planning |
ematician, known for his work in the field of | geometry, and in particular for the complex manifold a |
In algebraic | geometry and string theory, the phenomenon of wall-cro |
hey point out that he was an expert in metric | geometry, and "metric geometry was too challenging to |
He worked in differential | geometry and Riemannian geometry. |
lies on the mathematical methods of spherical | geometry and the measurements of astrometry. |
an mathematician, known for work in algebraic | geometry and diophantine geometry, and many expository |
physical education and mathematics, including | geometry, and coached the Minden High School Crimson T |
arch has been in the subject of computational | geometry and combinatorial algorithms; she is known fo |
Busemann's theorem is a theorem in Euclidean | geometry and geometric tomography. |
ds of advanced complex analysis and algebraic | geometry and it is 72 pages long. |
at the interface between analysis, topology, | geometry, and physics. |
ician researching algorithms in computational | geometry and related areas. |
e published a series of textbooks on algebra, | geometry and trigonometry, analytical geometry, and ca |
opology as homotopy theory, but some areas of | geometry and topology (such as surgery theory, particu |
male colleges and academies, studied algebra, | geometry, and trigonometry; Latin and Greek; English l |
In | geometry and combinatorics, an arrangement of hyperpla |
Teflic acid has octahedral | geometry and, Ignoring its bent Te-O-H bond, has point |
compound has a trigonal bipyramidal molecular | geometry and, in solution, exists as a mixture of two |
mathematics, who introduced him to Riemannian | geometry and, more generally, to differential geometry |
r (pre-algebra), Mercury (algebra I), Gemini ( | geometry), Apollo (algebra II), and Discovery (compreh |
It had 8MB RAM, 16MB ROM, a | geometry application, 240x320 display, Hitachi SH3 pro |
agnetic field, showing that its intensity and | geometry are very similar to the large-scale solar mag |
A source of examples from | geometry are the line graphs of the graphs of simple p |
s) or for situations where the loading or the | geometry are complex. |
raditional geometric forms ascribed to sacred | geometry are the sine wave, the sphere, the vesica pis |
Pop's research concerns algebraic | geometry, arithmetic geometry, and Galois theory. |
an exist in two isomeric forms with differing | geometry around the pentenyl double bond, cis-jasmone |
zschild vacuum (which describes the spacetime | geometry around a spherical mass), |
It has tetrahedral molecular | geometry around the sulfur atom, and is regarded to be |
and cis,cis-muconic acid which differ by the | geometry around the double bonds. |
Born in Paris, Restout studied drawing, | geometry, art history and painting at the Bazot Studio |
crystallography, focusing both on the overall | geometry as well as the O---O distances, which reveals |
Fractal | geometry, as defined in 1983 by Benoit Mandelbrot, emp |
assical and contemporary methods of algebraic | geometry, as well as nonassociative algebra. |
Descriptive | Geometry, as applied to the Drawing of Fortifications |
The ancient Greeks considered | geometry as just one of several sciences, and held the |
d of Algorithmica, Discrete and Computational | Geometry, as well as Computational Geometry: Theory an |
near point is a necessary tool of birational | geometry, as soon as algebraic surfaces are considered |
elino-Camelia to the study of non-commutative | geometry as a feasible theory of quantum spacetime. |
c. 300 BC - Euclid's Elements expound | geometry as a system of theorems following logically f |
was an important precursor to noncommutative | geometry as later developed by Alain Connes among othe |
The metric standard used the same thread | geometry as the USS standard but differed in that the |
on of number series was related to objects of | geometry as well as cosmogony. |
In | geometry, as a polygon in the unitary plane, which has |
s may appear in the ball's description of the | geometry as abrupt points, barriers and singularities. |
mmer, Logick, Rhetorick, Musick, Arithmetick, | Geometry, Astronomy,' Lond. |
udents at this level; this assumes mastery of | Geometry at the freshman level. |
n, when her father was appointed Professor of | Geometry at the University of London, and she attended |
d, he succeeded Edmond Halley as professor of | geometry at Oxford University in 1742 and was elected |
rned to Turin in 1852, when he taught applied | geometry at the technical institute. |
He held the Savilian Chair of | Geometry at the University of Oxford from 1797 to 1809 |
t the Institute for Gravitational Physics and | Geometry at Penn State. |
In 1919, Onicescu went to study | geometry at the University of Rome, under the guidance |
He was a professor of algebraic | geometry at the University of Duisburg-Essen. |
om 1882 he was also a professor of analytical | geometry at the Bridges and Roads' School in Bucharest |
n 1619 he was appointed Savilian professor of | geometry at Oxford, and resigned his professorship of |
nions that remain adopt a linear coordination | geometry at copper. |
He held the Savilian Chair of | Geometry at the University of Oxford from 1970 to 1995 |
om 1995 to 1996 he held the Savilian Chair of | Geometry at Oxford University and Fellow of New Colleg |
mathematician: he held the Savilian Chair of | Geometry at the University of Oxford in 1765. |
on 15 November 1643 was elected Professor of | Geometry at Gresham College, in the place of John Grea |
The | geometry at xenon is square planar, consistent with VS |
He gave public lectures as professor of | geometry at Gresham College, London from 1620 to 1630. |
He held the Savilian Chair of | Geometry at the University of Oxford from 1631 to 1649 |
from 1794 to 1810, held the Savilian Chair of | Geometry at the University of Oxford from 1810 to 1827 |
all organomercury compounds, the coordination | geometry at mercury is linear. |
In 1892, he became the Savilian Professor of | Geometry at the University of Oxford. |
The Professor of | Geometry at Gresham College, London, gives free educat |
College, Oxford and, as of 2006, professor of | geometry at Gresham College, London, where he has also |
He was a professor of | Geometry at the University of Bucharest and director o |
mathematician: He held the Savilian Chair of | Geometry at the University of Oxford from 1766 to 1797 |
In | geometry, Barrow's inequality states the following: Le |
ting which is built upon a vertical pictorial | geometry based on a golden section rectangle and a squ |
stract has often been applied to differential | geometry before, but the abstract differential geometr |
sh, Art, Music, Speech, Advanced Mathematics, | Geometry, Bible, History, Government, Economics, Biolo |
In differential | geometry, Bochner's formula on curvature from 1946 was |
-intensive and error-prone assembly; flexible | geometry, both for the GEM and the readout pads; and s |
In | geometry, Brocard points are special points within a t |
not only deeply versed in ancient and modern | geometry, but also had a full knowledge of the analyti |
vious once you've "got" it and understand the | geometry, but until then you assume anything sludgy gr |
ers traditionally is concerned with Euclidean | geometry, but triangle centers can also be studied in |
ive plane has all the properties of spherical | geometry, but it has different global properties. |
h is primarily in number theory and algebraic | geometry, but he has occasionally published in other s |
ay to aid him in his studies: one treatise on | geometry by Psellos and two philosophical essays by Jo |
as a definition of noncommutative projective | geometry by Michael Artin and J. J. Zhang, who add als |
asy to maintain and update any changes in the | geometry by simply reworking the updated area instead |
an opportunity to complete both Algebra 1 and | Geometry by the end of their 8th grade year. |
, Concepts of Problem Solving, Algebra I-III, | Geometry, Calculus, Trigonometry, Biology, Physical Sc |
M. Senechal, Quasicrystals and | Geometry, Cambridge University Press, 1995. |
Molecular | geometry can be roughly represented using a structural |
Geometry can be studied by students starting from CASA | |
The maximally extended Schwarzschild | geometry can be divided into 4 regions each of which c |
Fractal | geometry can be found in a number of geophysical pheno |
Mallios says noncommutative | geometry can be considered a special case of ADG, and |
r & dispose of ligands in a given predictable | geometry, can induce a “template effect.” |
lity works for black holes whose near-horizon | geometry can be expressed as a product of AdS3 and a s |
Molecular | geometry can range from the very simple, such as diato |
A track | geometry car work car at Jay Street - Borough Hall. |
In Euclidean | geometry, Carnot's theorem, named after Lazare Carnot |
molecular chain influences the local nuclear | geometry, causing an attenuation (or even reversal) of |
Evolver was written at The | Geometry Center, sponsored by the National Science Fou |
at Moscow State University where he held the | Geometry Chair from 1923 till 1952. |
ay of achieving large-scale wormholes without | geometry change - instead of creating a wormhole from |
ynamical systems, numerical analysis, fractal | geometry, chaos theory, computer graphics, image proce |
90% in | Geometry compared to a state average of 69% |
Elements of | geometry, composed of three books, later edited by Tha |
rks in computational chemistry, computational | geometry, computer animation, industrial engineering, |
ric modeling, image processing, computational | geometry, computer graphics, compression, mesh generat |
face of analytic number theory and arithmetic | geometry concerning the number and distribution of rat |
, the Brascamp-Lieb inequality is a result in | geometry concerning integrable functions on n-dimensio |
In common usage in elementary | geometry, cones are assumed to be right circular, wher |
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