「Dynamical」の共起表現一覧(1語右で並び替え)
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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. |
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