p$$ p $$‐Adic phase transitions for countable state Potts model

Mukhamedov, Farrukh; Khakimov, Otabek

doi:10.1002/mma.9307

Math Methods in App Sciences

2023

DOI: 10.1002/mma.9307

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p$$ p $$‐Adic phase transitions for countable state Potts model

Farrukh Mukhamedov

Otabek Khakimov

Abstract: The statistical mechanical models with finitely many spin values have several applications in many areas of natural science. One of the most studied models is the Potts model, which has a rich structure of physical phenomena. However, countable analog of the mentioned model has not been deeply studied yet. In the present paper, we are going to construct generalized ‐adic Gibbs measures (for the countable state ‐adic Potts model on a Cayley tree) by investigating non‐linear ‐adic dynamical systems on the seq… Show more

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2024

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On set of p-adic Gibbs measures for the countable state 1D SOS model

Khakimov,

Mukhamedov

2024

J. Phys. A: Math. Theor.

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Previous studies mainly focused on the p-adic Potts model with countable spin values, demonstrating that this model has only one p-adic Gibbs measure. Furthermore, it was shown that the model exhibits a phase transition in the set of generalized Gibbs measures. A challenge remained to find a countable spin p-adic model where the set of all p-adic Gibbs measures would include at least two elements. In this paper, we have examined the one-dimensional p-adic SOS model and demonstrated that the set of all p-adic Gibbs measures has continuum cardinality. This phenomenon has not been observed in countable state p-adic Potts models. Our result addresses the aforementioned problem affirmatively. To establish this finding, we employed a p-adic dynamical system related to the p-adic Gibbs measure through the renormalization group technique. Our analysis confirms the occurrence of a phase transition for the model in question.

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On set of p-adic Gibbs measures for the countable state 1D SOS model

Khakimov,

Mukhamedov

2024

J. Phys. A: Math. Theor.

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show abstract

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p$$ p $$‐Adic phase transitions for countable state Potts model

Cited by 1 publication

References 50 publications

On set of p-adic Gibbs measures for the countable state 1D SOS model

On set of p-adic Gibbs measures for the countable state 1D SOS model

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