Ł. T. Stȩpień scite author profile

We derive the Bogomolny decompositions (Bogomolny equations) for: full baby Skyrme model and for its restricted version (so called, pure baby Skyrme model), in (2+0) dimensions, by using so called, concept of strong necessary conditions. It turns out that Bogomolny decomposition can be derived for restricted baby Skyrme model for arbitrary form of the potential term, while for full baby Skyrme model, such derivation is possible only for some class of the potentials.

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Bogomolny equation for the BPS Skyrme model from strong necessary conditions

Stȩpień¹

2016

J. Phys. A: Math. Theor.

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Kinetic limit for a harmonic chain with a conservative Ornstein-Uhlenbeck stochastic perturbation

Komorowski¹,

Stȩpień²

2018

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We consider a one dimensional infinite chain of harmonic oscillators whose dynamics is weakly perturbed by a stochastic term conserving energy and momentum and whose evolution is governed by an Ornstein-Uhlenbeck process. We prove the kinetic limit for the Wigner functions corresponding to the chain. This result generalizes the results of [7] obtained for a random momentum exchange that is of a white noise type. In contrast with [7] the scattering term in the limiting Boltzmann equation obtained in the present situation depends also on the dispersion relation.

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Ł. T. Stȩpień

The Existence of Bogomolny Decompositions for Gauged $O(3)$ Nonlinear ``sigma'' Model and for Gauged Baby Skyrme Models

The existence of Bogomolny decomposition by means of strong necessary conditions

On Bogomolny Decompositions for the Baby Skyrme Models

Bogomolny equation for the BPS Skyrme model from strong necessary conditions

Kinetic limit for a harmonic chain with a conservative Ornstein-Uhlenbeck stochastic perturbation

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