Kink-Kink and Kink-Antikink Interactions with Long-Range Tails

Christov, Ivan; Decker, Robert J.; Demirkaya, Aslihan; Gani, Vakhid A.; Kevrekidis, P. G.; Khare, Avinash; Saxena, Avadh

doi:10.1103/physrevlett.122.171601

Cited by 97 publications

(116 citation statements)

References 32 publications

(55 reference statements)

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“…Taking this as a guide, we speculate that corresponding to the power-tower form as given by Eq. (58), the behaviour of φ(x) for large negative x should be of the form the new Manton formalism [16,17], even though developed for integral k is also valid for any real number k. Using this information, one can estimate the force between the (−1, 0) K and the (0, 1) K using the new Manton formalism and show that the KK force would vary like R −9/2 , where R is the distance between the two kinks.…”

Section: Discussionmentioning

confidence: 99%

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Wide class of logarithmic potentials with power-tower kink tails

Khare

Saxena

2020

J. Phys. A: Math. Theor.

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We present a wide class of potentials which admit kinks and corresponding mirror kinks with either a power law or an exponential tail at the two extreme ends and a power-tower form of tails at the two neighbouring ends, i.e. of the forms ette or pttp where e, p and t denote exponential, power law and power-tower tail, respectively. We analyze kink stability equation in all these cases and show that there is no gap between the zero mode and the beginning of the continuum. Finally, we provide a recipe for obtaining logarithmic potentials with power-tower kink tails and estimate kink-kink interaction strength.

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Section: Discussionmentioning

confidence: 99%

“…It is worth pointing out that since for arbitrary m and n, the potential around φ = 0 is of the form φ 2k with k as given by Eq. (64) hence using the new Manton formalism [16,17] one can show that in that case the KK force would go like R −d , where d = 2[1 + m,n + 1/m]. 6.…”

Section: Discussionmentioning

confidence: 99%

Wide class of logarithmic potentials with power-tower kink tails

Khare

Saxena

2020

J. Phys. A: Math. Theor.

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“…As a result, the original partial differential equation (PDE) (2.2) will be transformed into a system of second-order-in-time ordinary differential equations (ODEs), which can be easily solved by using the ode45 function of Matlab (see also refs. [68,69,99]).…”

Section: Kink-antikink Collisionmentioning

confidence: 99%

Collision of two kinks with inner structure

Zhong¹,

Jiang²,

Liu³

et al. 2020

J. High Energ. Phys.

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In this work, we study kink collisions in a scalar field model with scalarkinetic coupling. This model supports kink/antikink solutions with inner structure in the energy density. The collision of two such kinks is simulated by using the Fourier spectral method. We numerically calculate how the critical velocity and the widths of the first three two bounce windows vary with the model parameters. After that, we report some interesting collision results including two-bion escape final states, kink-bion-antikink intermediate states and kink or antikink intertwined final states. These results show that kinks with inner structure in the energy density have similar properties as those of the double kinks.

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“…Notice that linear combination of the kink solution and the antikink tail solution considered here can be used for kinks with short-range tails, as in our case, but this approximation may not work for kinks with long-range tails, see, e.g., [39,[56][57][58][59]].…”

Section: Interaction Of Well Separated Kink and Antikinkmentioning

confidence: 99%

Fischer Tropsch Synthesis: The Promoter Effects, Operating Conditions, and Reactor SynthesisThe authors gratefully acknowledge University of Sistan and Baluchestan for helping and supporting this research.Majid Sarkari:Young Researchers Club, Shiraz Branch, Islamic Azad University, Shiraz, Iran. Farhad Fazlollahi: Department of Chemical Engineering, Science and Research Branch, Islamic Azad University, Fars, Iran. Hossein Atashi: Department of Chemical Engineering, Faculty of Engineering, University of Sis

Sarkari¹,

Fazlollahi²,

Atashi³

2018

Energyo

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The two major effects observed in collisions of the continuum φ 4 kinks are (i) the existence of critical collision velocity v c above which the kinks always emerge from the collision and (ii) the existence of the escape windows for multi-bounce collisions with the velocity below v c , associated with the energy exchange between the kink's internal and translational modes. The potential merger (for sufficiently low collision speeds) of the kink and antikink produces a bion with oscillation frequency ω B , which constantly radiates energy, since its higher harmonics are always within the phonon spectrum. Similar effects have been observed in the discrete φ 4 kink-antikink collisions for relatively weak discreteness. Here we analyze kink-antikink collisions in the regime of strong discreteness considering an exceptional discretization of the φ 4 field equation where the static Peierls-Nabarro potential is precisely zero and the not-too-fast kinks can propagate practically radiating no energy. Several new effects are observed in this case, originating from the fact that the phonon band width is small for strongly discrete lattices and for even higher discreteness an inversion of the phonon spectrum takes place with the short waves becoming low-frequency waves.When the phonon band is narrow, not a bion but a discrete breather with frequency ω DB and all higher harmonics being outside the phonon band is formed. When the phonon spectrum is inverted, the kink and antikink become mutually repulsive solitary waves with oscillatory tails, and their collision is possible only for velocities above a threshold value sufficient to overcome their repulsion.

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Kink-Kink and Kink-Antikink Interactions with Long-Range Tails

Cited by 97 publications

References 32 publications

Wide class of logarithmic potentials with power-tower kink tails

Wide class of logarithmic potentials with power-tower kink tails

Collision of two kinks with inner structure

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