D. Portes scite author profile

We present a study of the ascending vertical motion of a self-propelled body under a uniform gravitational field suffering the action of two different types of air friction forces: linear on the velocity, which is valid for slowly moving bodies, and quadratic on the velocity. We study the special case where the thrust force is a decreasing function of mass, which corresponds to the exponential mass exhaustion rate. We present in detail the analytical solutions for the equations of motion for the two types of air friction, and briefly present some techniques for solving the related ordinary differential equations. This paper is intended for undergraduate physics teachers and for graduate students.

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Perfect transfer of quantum states in a network of harmonic oscillators

Portes¹,

Rodrigues²,

Duarte

et al. 2013

Eur. Phys. J. D

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Abstract. This work presents an exactly soluble scheme to address the problem of optimal transfer of quantum states through a set of s harmonic oscillators composing a network with connected ends as a closed quantum circuit. For this purpose we start from a general quadratic Hamiltonian form. The relationship between the parameters of the Hamiltonian, the network size, and the time interval required for such transfer are explicitly shown. Particular physical realizations of this Hamiltonian, transfer of entangled states, including transfer of states at the expense of a quantum entanglement, are also considered.

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On the transfer of states in coupled systems

Portes

Rodrigues

Duarte

et al. 2003

Physica A: Statistical Mechanics and its Applications

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An exact solvable model of rocket dynamics in atmosphere

Rodrigues

Pinho

Portes

et al. 2009

International Journal of Mathematical Education in Science and

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D. Portes

Quantum states transfer between coupled fields

Modelling the dynamics of bodies self-propelled by exponential mass exhaustion

Perfect transfer of quantum states in a network of harmonic oscillators

On the transfer of states in coupled systems

An exact solvable model of rocket dynamics in atmosphere

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