「dynamical」の共起表現(1語右で並び替え)

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「dynamical」の共起表現一覧(1語右で並び替え)

dynamical

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It has a dynamical age of 104 years.
ance simply states that the metric itself is dynamical and its equation of motion does not involve
providing a philosophical commentary on the dynamical approach, culminating in his 1998 paper in B
own as one of the foremost proponents of the dynamical approach, and even as an advocate of anti-re
ns is best known for his theoretical work on dynamical astronomy in our Solar System.
American Astronomical Society, Division for Dynamical Astronomy (1991)
awarded the Brouwer Award by the Division on Dynamical Astronomy of the American Astronomical Socie
The Division on Dynamical Astronomy is a branch of the American Astron
Brouwer Award of the Division on Dynamical Astronomy of the American Astronomical Socie
s "outstanding contributions to the field of Dynamical Astronomy".
ze outstanding contributions to the field of Dynamical Astronomy, including celestial mechanics, as
H stretching is made anharmonic and thus the dynamical behavior is well described.
Dynamical billiards
Dynamical billiards, in which case the covering is cou
uantum field theory in curved spacetime, the dynamical Casimir effect has been used to better under
liptic Survey (DES) defines centaurs using a dynamical classification scheme, based on the behavior
James Jeans discovers that the dynamical constants of motion determine the distributi
erials, complex dynamic networks, non-linear dynamical control, self-organizing behavior, evolution
astrophysics; Structure formation paradigms; Dynamical dark energy; Varying fundamental constants
In the absence of clear-cut dynamical data on the motions of stars in the bulge, t
antum computation against decoherence, using dynamical decoupling, one of the only proposals to dat
He has also made major contributions to dynamical decoupling, in particular the invention (wit
Using the dynamical definition of a centaur, (44594) 1999 OX3 is
Consequently, there are no additional dynamical degrees of freedom, as in say f(R) gravity.
Toward the Chiral Limit of QCD: Quenched and Dynamical Domain Wall Fermions", in Vancouver 1998, Hi
body perturbation theory (the GW method) and dynamical electronic correlations within the random ph
orbital precession and proper motions at the dynamical equinox of B1950.0.
ion in order to obtain a fast solving of the dynamical event.
utativity of the averaging procedure and the dynamical evolution of space-time.
her carried out projections of its long term dynamical evolution, and found a good probability that
d the meltwater spurs multiple radiative and dynamical feedback processes that accelerate ice disin
If we "promote" this constant to a dynamical field, what we would get is the dilaton.
d to describe the geometry is itself a local dynamical field, with its own equation of motion.
lues mean correlations between particles and dynamical fluctuations.
During the formation of planetary systems, dynamical friction between the protoplanet and the pro
When galaxies interact through collisions, dynamical friction between stars causes matter to sink
Dynamical friction is a term in astrophysics related t
The full Chandrasekhar dynamical friction formula for the change in velocity
cells indicate that they have characteristic dynamical functions.
B. Hasslacher, DA Meyer, "Modeling dynamical geometry with lattice gas automata", (1998).
Dynamical groups, infinite dimensional field equations
apes of exozodiacal dust clouds can show the dynamical influence of extrasolar planets, and potenti
From then on, he proposes, its dynamical influence gradually increased, thus being re
A rich collection of dynamical input-output mapping is a crucial advantage
their parent stars, strongly suggesting that dynamical interactions rather than planetary migration
rmed in the core, but that it got ejected by dynamical interactions.
The base for these dynamical invariants are the recurrence rate and the d
the choice of the embedding parameters, some dynamical invariants as correlation dimension, K2 entr
In statistical orbital mechanics, a body's dynamical lifetime refers to the mean time that a smal
the 5:2 resonance with Jupiter's orbit with dynamical lifetimes of 1-100 Ma.
Centaurs have short dynamical lifetimes due to perturbations by the giant
operation formalism (also known as a quantum dynamical map), which is a linear, completely positive
etworks generated by the Ulam method [8] for dynamical maps.
chairman of The International Commission on Dynamical Meteorology established in its current form
Before this, dynamical models of supersymmetry breaking were being
xperimental and theoretical understanding of dynamical optical processes in semiconductor systems."
e more often than not one has to use thermal dynamical or macroscopic techniques to see their effec
parallax method, Spectroscopic parallax, and Dynamical parallax
the S3 can only expand or contract: the only dynamical parameter is overall size of the S3, paramet
B. Smith who were exploring cognition from a dynamical perspective, i.e., applying the tools of dyn
The theory describes dynamical phenomena which occur on objects modelled by
Dynamical plane with critical orbit falling into 3-per
outstanding contributions to a wide range of dynamical problems in both solar-system and galactic d
it does not require an understanding of the dynamical process by which proteins fold.
mong the states representing the scheme of a dynamical process.
He is best known for his research on dynamical processes in cosmology and galaxy formation/
ntum mechanical based method for controlling dynamical processes with light, employing quantum inte
he underlying electrochemical and fluid flow dynamical processes continued, principally in Russia,
m systems, fluids and soft condensed matter, dynamical processes, theoretical biology, econophysics
ematics and computer science, structural and dynamical properties of self-engineered networks, and
nd molecular thermodynamics, the kinetic and dynamical properties of the hydrogen bond in dynamic s
articular attention for their structural and dynamical properties.
The presence of dynamical quarks would slightly alter these data, but
ses of the lightest glueballs in QCD without dynamical quarks.
The evolution of the scale factor is a dynamical question, determined by the equations of gen
osal in molecular systems and mechanisms for dynamical selectivity and specificity".
aves, shock waves, combustion, magneto-fluid dynamical shock waves, relativistic flows, quantum fie
ton was the first scientist to recognize the dynamical significance of Kepler's second law.
Dynamical simulations suggest that if the mass gradien
Dynamical simulations covering a period of 107 years s
In the case of dynamical spacetimes, the problem may be divided into
astronomy, particularly for his work on the dynamical stability of galaxies."
iring assumptions about their composition or dynamical state.
induced dissociation, and the foundations of dynamical stereochemistry.
e degree of Ph.D in 1973 for his work on the dynamical structure of Tornadoes.
The model has a rich dynamical structure.
A recent dynamical study by Andrea Milani and collaborators has
This conclusion is based on a dynamical study of a small star cluster in which shoul
by Jacques Hadamard in 1898, it is the first dynamical system to be proven chaotic.
More technically, consider the continuous dynamical system described by the ODE
that any chaotic set in a bounded continuous dynamical system corresponds to a periodic orbit in a
pace of an invertible discrete or continuous dynamical system with evolution operator
In dynamical system theory an oscillator is called isochr
He showed that a sufficient condition for a dynamical system to relax to equilibrium is for it to
tool for investigating the properties of the dynamical system (M,φ).
The first discovered example of a dynamical system displaying such self-organized critic
"halo" orbits, do not exist in a full n-body dynamical system such as the solar system.
an input signal is fed into a fixed (random) dynamical system called reservoir and the dynamics of
ource alternative to commercial packages for dynamical system modeling and simulation packages such
A period halving bifurcation in a dynamical system is a bifurcation in which the system
s any stochastic process, may be viewed as a dynamical system by endowing it with the shift operato
rotocol or consensus protocol is an unforced dynamical system that is governed by the interconnecti
When a dynamical system fluctuates about some well-defined av
which two fixed points (or equilibria) of a dynamical system collide and annihilate each other.
e model is the first discovered example of a dynamical system displaying self-organized criticality
The phase space associated to a sequential dynamical system with map F: Kn → Kn is the finite dir
a period doubling bifurcation in a discrete dynamical system is a bifurcation in which the system
en set of conditions on a bounded continuous dynamical system that rules out periodic behaviour als
An error correction model is a dynamical system with the characteristics that the dev
systems: when passing to a stochastic graph dynamical system one is generally led to (1) a study o
ost one-to-one map whose image is a symbolic dynamical system of a special kind called a shift of f
The trajectories of this dynamical system correspond to walks in the De Bruijn
, Vilnius photometry, M-Dwarf star analysis, dynamical system analysis, reference support to orbiti
Then 0 is a global attractor of the dynamical system .
Scicos is a graphical dynamical system modeler and simulator.
In mathematics, a measure-preserving dynamical system is an object of study in the abstract
o be the first-ever examination of a chaotic dynamical system, and that Hadamard should be consider
sity of the state of a stochastic non-linear dynamical system, given noisy measurements of the stat
Geometry and Topology; and the more applied Dynamical system, Fluid dynamics, Solid mechanics, Inv
m is stated in terms of matrix cocycles of a dynamical system.
e role of the time-evolution operator of the dynamical system.
gas follow the trajectories in the Hadamard dynamical system.
he co-author of several scientific papers on dynamical systems theory with Prof Allen.
Theoretical study of the dynamical systems associated to reactive chemicals and
Ergodic Theory and Dynamical Systems is a peer-reviewed mathematics journ
These numbers apply to a large class of dynamical systems (for example, dripping faucets to po
eometry, differential equations, topological dynamical systems theory and non-standard analysis.
and Artificial Life (a non-representational, dynamical systems approach); passive dynamic walking;
nced the direction that the modern theory of dynamical systems has taken.
A Markov partition is a tool used in dynamical systems theory, allowing the methods of symb
to model and simulate the dynamics of hybrid dynamical systems (continuous and discrete time) and c
ple genotype selection model" in Diff Eq and Dynamical Systems 1(1):35-50, 1993.
; Lyashko, O. V.; Vasli'ev A., V. A. (1993), Dynamical Systems VI: Singularity Theory I, Local and
erally focused on the analysis of stochastic dynamical systems arising in biology, chemistry and ph
or "similar flow", is a concept encompassing dynamical systems which return to a trajectory, as opp
tudying the iterated functions that occur in dynamical systems and fractals.
development of the theory of nonequilibrium dynamical systems and, in particular, on stochastic re
Examples related to dynamical systems arising from number theory, such as
tly residing in the U.S., who specializes in dynamical systems and known for his discovery of focus
iscussed among physicists and researchers in dynamical systems and chaos theory, and as the head of
Dynamical Systems
Cf also dynamical systems theory.
See also: Dynamical systems and List of chaotic maps
In the theory of dynamical systems, Carleson has worked in complex dyna
In mathematics, particularly dynamical systems, a heteroclinic bifurcation is a glo
In the theory of dynamical systems, an isolating neighborhood is a comp
studied numerous topics in pure and applied dynamical systems, including billiards, pattern format
e no wandering domain theorem is a result on dynamical systems, proven by Dennis Sullivan in 1985.
, subshifts of finite type are used to model dynamical systems, and in particular are the objects o
British mathematician known for his work on dynamical systems, specifically models of the time-evo
ialist readers that describes the science of dynamical systems, also known as chaos theory.
As with many deterministic dynamical systems, the baker's map is studied by its a
y of free groups, spectral graph theory, and dynamical systems, especially symbolic dynamics.
ntion to the studies of statistical physics, dynamical systems, sequential sampling algorithms, and
In mathematics, particularly in dynamical systems, a bifurcation diagram shows the pos
mathematics, computer science and medicine: dynamical systems, numerical analysis, fractal geometr
lishment and development of an Institute for Dynamical Systems, where in 1982 he set up a computer
In mathematics, especially in the study of dynamical systems, a hyperbolic equilibrium point or h
mathematics, and in particular the study of dynamical systems, the idea of stable and unstable set
ng bifurcations can also occur in continuous dynamical systems, namely when a new limit cycle emerg
In mathematics, in the area of dynamical systems, a double pendulum is a pendulum wit
In Dynamical Systems, an orbit is called Lyapunov stable
ta theory, combinatorics, discrete geometry, dynamical systems, group theory, harmonic analysis and
eneral formalism used in physics to describe dynamical systems, namely the Hamiltonian formalism.
Applied Analysis and Complex Dynamical Systems,
Ergodic Theory and Dynamical Systems, pp.
- graph/network theory, population modeling, dynamical systems, phylogenetics.
In the theory of dynamical systems, the exponential map can be used as
In discrete dynamical systems, the same bifurcation is often inste
It is a core example in the study of dynamical systems.
ulus of variations, and infinite-dimensional dynamical systems.
ntial equations, differential inclusions and dynamical systems.
d in fixed points and topological aspects of dynamical systems.
logical periodic and fixed point theory, and dynamical systems.
ustrate a significant feature of feedback in dynamical systems.
urnal of Applied Mathematics and the journal Dynamical Systems.
ns especially in astrophysics, as well as on dynamical systems.
lained how certain pictures have arisen from dynamical systems.
orrespond to topologically conjugate pointed dynamical systems.
mputational agent based models and nonlinear dynamical systems.
cal areas of what would become the theory of dynamical systems.
da property; examples include Wada basins in dynamical systems.
ith methods based on the theory of nonlinear dynamical systems.
graph theory, and of certain one-dimensional dynamical systems.
a and by the ANNNI model, as well as in some dynamical systems.
such phenomena are associated with nonlinear dynamical systems.
She has since continued to work in dynamical systems.
d in 1981, the journal publishes articles on dynamical systems.
s most often used in reference to continuous dynamical systems.
Larmor, J. (1897), "On a Dynamical Theory of the Electric and Luminiferous Medi
et out to develop a potential function for a dynamical theory for the transmission of light.
nd bottom, respectively, as evaluated by the dynamical theory of diffraction for the absorption-les
His Dynamical Theory of Crystal Lattices, which was a resu
ies, top and bottom, as distinguished by the Dynamical theory of diffraction with the Bragg diffrac
In 1849 he published a long paper on the dynamical theory of diffraction, in which he showed th
l University where he coauthored the book of Dynamical Theory of Crystal Lattices with Max Born bet
Loschmidt has deduced from the dynamical theory the following remarkable proportion:-
On the dynamical theory of incompressible viscous fluids and
James Clerk Maxwell publishes A Dynamical Theory of the Electromagnetic Field.

1 2 次へ＞