42 research outputs found

    Interacting Tachyon: generic cosmological evolution for a tachyon and a scalar field

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    We study the cosmological evolution of a tachyon scalar field T with a Dirac-Born-Infeld type lagrangian and potential V(T) coupled to a canonically normalized scalar field \phi with an arbitrary interaction term B(T,\phi) in the presence of a barotropic fluid \rb, which can be matter or radiation. The force between the barotropic fluid and the scalar fields is only gravitational. We show that the dynamics is completely determine by only three parameters L1 = - V_T/ V^{3/2}, L2= - B_T /B^{3/2} and L3 =-B_{\phi}/B. We determine analytically theconditions for \lm_i under which the energy density of T, \phi and \rb have the same redshift. We study the behavior of T and \phi in the asymptotic limits for L_i and we show the numerical solution for different interesting cases. The effective equation of state for the tachyon field changes due to the interaction with the scalar field and we show that it is possible for a tachyon field to redshift as matter in the absence of an interaction term B and as radiation when B is turned on. This result solves then the tachyonic matter problem.Comment: 13 pages, 5 figure

    The Mass, Normalization and Late Time behavior of the Tachyon Field

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    We study the dynamics of the tachyon field TT. We derive the mass of the tachyon as the pole of the propagator which does not coincide with the standard mass given in the literature in terms of the second derivative of V(T)V(T) or Log[V(T)]Log[V(T)]. We determine the transformation of the tachyon in order to have a canonical scalar field ϕ\phi. This transformation reduces to the one obtained for small T˙\dot T but it is also valid for large values of T˙\dot T. This is specially interesting for the study of dark energy where T˙1\dot T\simeq 1. We also show that the normalized tachyon field ϕ\phi is constrained to the interval T2TT1T_2\leq T \leq T_1 where T1,T2T_1,T_2 are zeros of the original potential V(T)V(T). This results shows that the field ϕ\phi does not know of the unboundedness of V(T)V(T), as suggested for bosonic open string tachyons. Finally we study the late time behavior of tachyon field using the L'H\^{o}pital rule.Comment: 9 pages, 10 figure

    Using perturbation methods and Laplace–Padé approximation to solve nonlinear problems

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    WOS: 000328081500009In this paper, the perturbation method and Pade transformation are used to provide an approximate solution of elliptic integrals of the second kind and of complete integrals of the first kind. Besides, we used the obtained results to calculate an analytic expression for the period of a simple pendulum. The method has an acceptable accuracy for high values of the initial amplitude, compared to the relative error < 1.7% for initial angles theta <= 70 degree

    Analytical Solutions for Systems of Singular Partial Differential-Algebraic Equations

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    This paper proposes power series method (PSM) in order to find solutions for singular partial differential-algebraic equations (SPDAEs). We will solve three examples to show that PSM method can be used to search for analytical solutions of SPDAEs. What is more, we will see that, in some cases, Padé posttreatment, besides enlarging the domain of convergence, may be employed in order to get the exact solution from the truncated series solutions of PSM

    Analytical Solutions for Systems of Singular Partial Differential-Algebraic Equations

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    This paper proposes power series method (PSM) in order to find solutions for singular partial differential-algebraic equations (SPDAEs). We will solve three examples to show that PSM method can be used to search for analytical solutions of SPDAEs. What is more, we will see that, in some cases, Padé posttreatment, besides enlarging the domain of convergence, may be employed in order to get the exact solution from the truncated series solutions of PSM

    HPM Approximations for Trajectories: From a Golf Ball Path to Mercury’s Orbit

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    In this work, we propose the approximated analytical solutions for two highly nonlinear problems using the homotopy perturbation method (HPM). We obtained approximations for a golf ball trajectory model and a Mercury orbit’s model. In addition, to enlarge the domain of convergence of the first case study, we apply the Laplace-Padé resummation method to the HPM series solution. For both case studies, we were able to obtain approximations in good agreement with numerical methods, depicting the basic nature of the trajectories of the phenomena

    Application of HPM to Solve Unsteady Squeezing Flow of a Second-Grade Fluid between Circular Plates

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    In this article, Homotopy Perturbation Method (HPM) is used to provide two approximate solutions to the nonlinear differential equation that describes the behaviour for the unsteady squeezing flow of a second grade fluid between circular plates. Comparing results between approximate and numerical solutions shows that our results are capable to provide an accurate solution and are extremely efficient
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