Search results for "ordinary differential equation"

showing 10 items of 98 documents

General-relativistic approach to the nonlinear evolution of collisionless matter.

1993

A new general-relativistic algorithm is developed to study the nonlinear evolution of scalar (density) perturbations of an irrotational collisionless fluid up to shell crossing, under the approximation of neglecting the interaction with tensor (gravitational-wave) perturbations. The dynamics of each fluid element is separately followed in its own inertial rest frame by a system of twelve coupled first-order ordinary differential equations, which can be further reduced to six under very general conditions. Initial conditions are obtained in a cosmological framework, from linear theory, in terms of a single gauge-invariant potential. Physical observables, which are expressed in the Lagrangian…

PhysicsClassical mechanicsExact solutions in general relativityGeneral relativityDifferential equationOrdinary differential equationEinstein field equationsLinear systemInitial value problemPerfect fluidAstrophysics::Cosmology and Extragalactic AstrophysicsPhysical review. D, Particles and fields
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Physical model, theoretical aspects and applications of the flight of a ball in the atmosphere. Part I: Modelling of forces and torque, and theoretic…

1991

A model of the forces and the torque operating on a ball that is flying with rotation in the atmosphere of the Earth, and the resulting system of ordinary differential equations, are derived from mechanics and aerodynamics. The system of equations allows the theoretical aspects of the flight of a ball, such as the boundedness of its kinetic energy, the curvature of the orbit or the velocity function, to be investigated using certain transformations of the variables. The solutions of the corresponding ordinary or boundary value problems, computed numerically, are used to treat certain tasks in international ball games, for example, the maximum and minimum velocities of a volleyball service.

PhysicsGeneral MathematicsGeneral EngineeringKinematicsMechanicsAerodynamicsSystem of linear equationsCurvatureClassical mechanicsOrdinary differential equationTorqueAstrophysics::Earth and Planetary AstrophysicsBoundary value problemBall (mathematics)Mathematical Methods in the Applied Sciences
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Dense jet modelling applied to the design of dense effluent diffusers

2004

A model aimed at predicting the behavior of inclined dense jets in a stagnant environment was proposed. The model takes into account four jet parameters (flow rate, density, inclination and diameter) and results in a set of algebraic and ordinary differential equations, which are easily solved by simple (standard) numerical methods. Model results include information on the trajectory, spreading and dilution of the inclined dense jets. Model predictions were compared with experimental data obtained with different nozzle diameters, jet flow rates, jet densities and nozzle inclinations. Despite the wide range encompassed by the experimental data analyzed, model predictions were always found to…

PhysicsJet (fluid)dense effluents diffuser designDifferential equationAstrophysics::High Energy Astrophysical PhenomenaMechanical EngineeringGeneral Chemical EngineeringNumerical analysisinclined dense jet modelNozzleThermodynamicsGeneral ChemistryMechanicsVolumetric flow rateDiffuser (thermodynamics)Ordinary differential equationRange (statistics)General Materials Sciencedense jet dilutionWater Science and Technology
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An Exact Riemann Solver for Multidimensional Special Relativistic Hydrodynamics

2001

We have generalised the exact solution of the Riemann problem in special relativistic hydrodynamics (Marti and Muller, 1994) for arbitrary tangential flow velocities. The solution is obtained by solving the jump conditions across shocks plus an ordinary differential equation arising from the self-similarity condition along rarefaction waves, in a similar way as in purely normal flow. This solution has been used to build up an exact Riemann solver implemented in a multidimensional relativistic (Godunov-type) hydro-code.

PhysicsRoe solverShock wavesymbols.namesakeRiemann problemExact solutions in general relativityOrdinary differential equationMathematical analysissymbolsJumpAstrophysicsRiemann's differential equationRiemann solver
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The exact solution of the Riemann problem with non-zero tangential velocities in relativistic hydrodynamics

2000

We have generalised the exact solution of the Riemann problem in special relativistic hydrodynamics for arbitrary tangential flow velocities. The solution is obtained by solving the jump conditions across shocks plus an ordinary differential equation arising from the self-similarity condition along rarefaction waves, in a similar way as in purely normal flow. The dependence of the solution on the tangential velocities is analysed, and the impact of this result on the development of multidimensional relativistic hydrodynamic codes (of Godunov type) is discussed.

PhysicsShock waveDifferential equationMechanical EngineeringMathematical analysisAstrophysics (astro-ph)Zero (complex analysis)Fluid Dynamics (physics.flu-dyn)FOS: Physical sciencesPhysics - Fluid DynamicsCondensed Matter PhysicsAstrophysicssymbols.namesakeExact solutions in general relativityRiemann problemFlow velocityMechanics of MaterialsOrdinary differential equationsymbolsJump
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Self‐similar problems for modeling the surface chemical reactions with the gravitation

1998

The mathematical model of a chemical reaction which takes place on the surface of the uniformly moving vertically imbedded glass fibre material is considered. The effect of gravitation is taken into account. Boussinesq's and boundary layer fittings allow to derive boundary value problems for self‐similar systems of ordinary differential equations. First Published Online: 14 Oct 2010

PhysicsSurface (mathematics)Mathematical analysisGlass fiber-Chemical reactionGravitationBoundary layerModeling and SimulationOrdinary differential equationQA1-939Surface chemicalBoundary value problemAnalysisMathematicsMathematical Modelling and Analysis
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Modal expansions in lasers outside the uniform-field limit

2003

We show that, in lasers characterized by a slow population dynamics, the expansion of the electric field on longitudinal modes is useful even beyond the uniform-field limit. The dynamical behavior of the laser above the second threshold can be well reproduced by a set of ordinary differential equations, whose integration is much faster than that of the complete Maxwell–Bloch equations. The conditions for the uniform-field limit are also clarified.

Physicseducation.field_of_studyLiénard equationDifferential equationNumerical analysisPopulationStatistical and Nonlinear PhysicsAtomic and Molecular Physics and OpticsSemiconductor laser theoryOrdinary differential equationElectric fieldQuantum electrodynamicsLimit (mathematics)education
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A new algorithm for the kinetic data analysis

2000

Abstract In this paper, a new algorithm for the kinetic data analysis is presented. The main objective of the algorithm is to retrieve the maximum information concerned with a multi-response complex chemical system evolving in time, in order to retrieve the rate constants (calibration problem) or the initial concentration of species. As a difference with other data treatments found in the literature, the algorithm is able to estimate the uniqueness and reliability of the calculated rate constants. This task is carried out by analyzing of the principal components of the sensitivity coefficients with regard to the rate constants. The analysis allows understanding whether the located stationar…

Process Chemistry and TechnologyOdeFunction (mathematics)Stationary pointComputer Science ApplicationsAnalytical ChemistryNumerical integrationMaxima and minimaOrdinary differential equationUniquenessConstant (mathematics)AlgorithmSpectroscopySoftwareMathematicsChemometrics and Intelligent Laboratory Systems
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Existenzsätze für schwach nichtlineare Operatorgleichungen und Anwendung auf Randwertaufgaben mit gewöhnlichen Differentialgleichungen

1979

With Schauder's fixpoint principle we establish an existence theorem for solutions of two simultaneous nonlinear operator equations of the formL iu=Miu, i=1,2, Li linear,M i continous. By applying this result to boundary value problems with ordinary differential equations we generalize results of Conti and Ehrmann in various directions.

Pure mathematicsGeneral MathematicsOrdinary differential equationMathematical analysisExistence theoremNonlinear operator equationsBoundary value problemAlgebra over a fieldFixed pointMathematicsRendiconti del Circolo Matematico di Palermo
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On the structure of the set of solutions of nonlinear equations

1971

Let T be a mapping from a subset of a Banach space X into a Banach space Y. The present paper investigates the nature of the set of solutions of the equation T(x) = y for a given y E Y, i.e. when T-l(y) # 0 ? What are the topological properties of T-l(y)? A prototype for an answer to these questions is given by Peano existence theorem on the connectedness of the set of solutions of an ordinary differential equation in the real case. In its general setting, this problem was first attacked by Aronszajn [l] and Stampacchia [l 11; recently, by Browder-Gupta [5], Vidossich [12] and, above all, Browder [3, Sec. 51 who gives several interesting results in an excellent treatment. Customary, the str…

Pure mathematicsIndependent equationApplied MathematicsProper mapOrdinary differential equationBanach spaceExistence theoremOpen and closed mapsAnalysisDomain (mathematical analysis)MathematicsPeano existence theoremJournal of Mathematical Analysis and Applications
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