Existence of Excitatory and Inhibitory Oscillators in The Small World Network and Its Dynamic Effect on Network Synchronization
Subject Areas : Majlesi Journal of Telecommunication DevicesTayebeh Nikfard 1 , Ravindra Kumar 2
1 - Department of Physics, Mobarakeh Branch, Islamic Azad University, Mobarakeh, Iran
2 - Department of Physics, Radha govind University, Ramgarh 829122, India
Keywords: inhibitory oscillators , dynamic effect , small-world network, synchronization was investigated,
Abstract :
synchronization was investigated in Watts-Strogats small world network with inhibited and excitable oscillators. According to the Kuramoto model in the small world network, with the increase in the limited number of inhibited oscillators, the synchronization in the system will be accompanied by network defects, and with their increase, the synchronization will also increase, and after reaching its maximum value, it will begin to decrease. That is, with a certain ratio of inhibitory oscillators to excitation depending on the coupling strength, network synchronization is maximum. As the coupling strength of the oscillators increases, the interval of the number of inhibitions for which the network is in synchronization decreases. This result is not related to a specific small world network and has been observed by repeating it in different small world networks. Excitatory and inhibitory oscillators are in phase up to a certain percentage of inhibitory oscillators in the network (depending on the coupling strength).
[1] Solé, Ricard V, Corominas-Murtra, Bernat, Valverde, Sergi, and Steels, Luc. “Language networks: Their structure, function, and evolution. Complexity,” 15(6):20–26, 2010.
[2] Newman, MEJ. “The structure and function of complex networks,” siam re-view, 45, 167–256. Cerca con Google, 2003.
[3] Watts, Duncan J and Strogatz, Steven H. “Collective dynamics of ‘small-world’networks,” nature, 393(6684):440, 1998.Plasma Sci. [Online]. 21(3), pp. 876-880. Available:
[4] Strogatz, Steven H and Stewart, Ian. “Coupled oscillators and biological synchronization,” Scientific American, 269(6):102–109, 1993.
[5] Keane, Andrew, Dahms, Thomas, Lehnert, Judith, Suryanarayana, Sachin Aralasurali, Hövel, Philipp, and Schöll, Eckehard. “Synchronisation in networks of delay-coupled type-i excitable systems,” The European Physical Journal B, 85(12):407, 2012.
[6] Miyano, Takaya and Tsutsui, Takako. “Data synchronization in a network of coupled phase oscillators,” Physical review letters, 98(2):024102, 2007.
[7] Díaz-Guilera, Albert, Gómez-Gardenes, Jesús, Moreno, Yamir, and Nekovee, Maziar. “Synchronization in random geometric graphs,” International Journal of Bifurcation and Chaos, 19(02):687–693, 2009.
[8] Rohden, Martin, Sorge, Andreas, Timme, Marc, and Witthaut, Dirk. “Self-organized synchronization in decentralized power grids,” Physical review letters, 109(6):064101, 2012.
[9] Winfree, Arthur T. “Biological rhythms and the behavior of populations of coupled oscillators,” Journal of theoretical biology, 16(1):15–42, 1967.
[10] Kuramoto, Yoshiki. “Chemical oscillations, waves, and turbulence,” Courier Corporation, 2003.
[11] Kuramoto, Yoshiki. “Self-entrainment of a population of coupled non-linear oscillators,” in International symposium on mathematical problems in theoretical physics, pp. 420–422. Springer, 1975.
[12] Y. kuramoto: “Chemical oscillations, waves, and turbulence, springer-verlag,” berlin and new York, 1984, viii+ 156, 25× 17cm, 9,480 ff (springer series in synergetics, vol. 19). 40(10):817–818, 1985.
Majlesi Journal of Telecommunication Devices Vol. 13, No. 1, March 2024
Existence of Excitatory and Inhibitory Oscillators in The Small World Network and Its Dynamic Effect on Network Synchronization
Tayebeh Nikfard1, Ravindra Kumar2
1- Department of Physics, Mobarakeh Branch, Islamic Azad University, Mobarakeh, Iran.
Email: nikfardtayebeh@gmail.com (Corresponding author)
2-Department of Physics, Radha govind University, Ramgarh 829122, India.
Email: Ravindk@gmail.com
ABSTRACT: Synchronization was investigated in Watts-Strogats small world network with inhibited and excitable oscillators. According to the Kuramoto model in the small world network, with the increase in the limited number of inhibited oscillators, the synchronization in the system will be accompanied by network defects, and with their increase, the synchronization will also increase, and after reaching its maximum value, it will begin to decrease. That is, with a certain ratio of inhibitory oscillators to excitation depending on the coupling strength, network synchronization is maximum. As the coupling strength of the oscillators increases, the interval of the number of inhibitions for which the network is in synchronization decreases. This result is not related to a specific small world network and has been observed by repeating it in different small world networks. Excitatory and inhibitory oscillators are in phase up to a certain percentage of inhibitory oscillators in the network (depending on the coupling strength).
KEYWORDS: Kuramoto, Synchronization, Small world network, Inhibitory oscillator, Excitatory oscillator |
Since 1950, network science has become a living and interdisciplinary field. Today, networks play an important role for research in various fields, including social sciences, economics and psychology, biology, physics and mathematics [1,2] and as a forward-looking concept, it is used to describe the interactions of many systems. Several network models have been developed that have statistical properties consistent with real-world networks. In particular, we can mention random networks or René camp, small world network in network science.
Real-world networks such as brain networks, electrical networks, etc. [3] are characterized by a high clustering coefficient. Also, despite the large size, there is often a relatively short path between both nodes. Strugats presented a model with small-world network [3] that exhibits both features, small shortest path length and high clustering factor. These features are known as the small world feature, which consists of a regular network and is rewired with the probability 𝑝 of edges, which is from 0.005 to 0.05 and is between the regular network (𝑝 = 0) and the random network (𝑝 = 1).
One of the main topics of network dynamics is synchronization [4,5]. Synchronization can be seen in many different contexts. In computer science, such as synchronization has been used to extract data in a large database [6]. Other applications in engineering where synchronization or asynchrony are important, such as wireless communication networks [7] and electric networks [8].
By simulating his model, Winfrey [9] found that spontaneous synchronization appears as a threshold process, a phenomenon similar to phase transition, and in his studies and Kuramoto [10], it is stated that the start of synchronization in Oscillating populations represent phase transitions; Below the transition point, the individual movement of oscillators in a group is uncorrelated. As their interactions become stronger, the connections between the dynamic modes of the oscillators in one part of the set are established and the frequencies of these oscillators become the same. Near the transition point, the size of the coherent oscillator group is small, but the group grows and the number of interacting oscillators increases.
The size of this group can be chosen as a synchronization parameter. Based on Winfrey's method, The Kuramoto model consists of a population of phase oscillators whose interaction is determined by differential equations [11,12] and expresses the rotation of oscillators with heterogeneous natural frequency that are coupled in the form of phase difference sinusoids.
The paper is organized as follows. In Sect. II, we define the model and the numerical methods of quantifying the synchronization. Sect. III represents the results and discussion and sect. IV is devoted to the concluding remarks.
2. MODEL AND METhOD We used the Kuramoto model in a network with N oscillators at the nodes of the network, which include two groups. One group (excitatory oscillators) has positive coupling and tries to be in phase with its neighbor, and another group (inhibitory oscillators) tries to be in the opposite phase (π) with it. Therefore, in the Kuramoto equations:
Fig. 3. (Color online) The probability density function of the phase of inhibitory and excitatory oscillators for (a) p 0.03,(b)p=0.09 and (c)p=0.18 in a small world networks of N=1000 oscillators, mean degree 〈k〉=10 and Q=0.5. p is the fraction of inhibitory to excitatory oscillators.
The phase density of the oscillators after the network reached a stable state, separately (inhibitory and excitatory) is drawn in Fig. 3 for Q=0.5 in the small world network for the percentages presented respectively in Fig. 2. As can be seen in these figures for the percentage of inhibition oscillators that we observed network defects, the phase density diagrams of inhibition and excitation oscillators are in phase.
4. CONCLUSION In summary, using the Kuramato model in the small world network and defining inhibitory and excitatory oscillators, we found that the excitatory and inhibitory oscillators are always in phase. We also observed an increase in synchrony by increasing the fraction of inhibitors in the SW network, where the number of inhibitory oscillators to maximize synchrony depends on the coupling strength of the oscillators.
REFERENCES [1] Solé, Ricard V, Corominas-Murtra, Bernat, Valverde, Sergi, and Steels, Luc. “Language networks: Their structure, function, and evolution. Complexity,” 15(6):20–26, 2010. [2] Newman, MEJ. “The structure and function of complex networks,” siam re-view, 45, 167–256. Cerca con Google, 2003. [3] Watts, Duncan J and Strogatz, Steven H. “Collective dynamics of ‘small-world’networks,” nature, 393(6684):440, 1998.Plasma Sci. [Online]. 21(3), pp. 876-880. Available: [4] Strogatz, Steven H and Stewart, Ian. “Coupled oscillators and biological synchronization,” Scientific American, 269(6):102–109, 1993. [5] Keane, Andrew, Dahms, Thomas, Lehnert, Judith, Suryanarayana, Sachin Aralasurali, Hövel, Philipp, and Schöll, Eckehard. “Synchronisation in networks of delay-coupled type-i excitable systems,” The European Physical Journal B, 85(12):407, 2012. [6] Miyano, Takaya and Tsutsui, Takako. “Data synchronization in a network of coupled phase oscillators,” Physical review letters, 98(2):024102, 2007. [7] Díaz-Guilera, Albert, Gómez-Gardenes, Jesús, Moreno, Yamir, and Nekovee, Maziar. “Synchronization in random geometric graphs,” International Journal of Bifurcation and Chaos, 19(02):687–693, 2009. [8] Rohden, Martin, Sorge, Andreas, Timme, Marc, and Witthaut, Dirk. “Self-organized synchronization in decentralized power grids,” Physical review letters, 109(6):064101, 2012. [9] Winfree, Arthur T. “Biological rhythms and the behavior of populations of coupled oscillators,” Journal of theoretical biology, 16(1):15–42, 1967. [10] Kuramoto, Yoshiki. “Chemical oscillations, waves, and turbulence,” Courier Corporation, 2003. [11] Kuramoto, Yoshiki. “Self-entrainment of a population of coupled non-linear oscillators,” in International symposium on mathematical problems in theoretical physics, pp. 420–422. Springer, 1975. [12] Y. kuramoto: “Chemical oscillations, waves, and turbulence, springer-verlag,” berlin and new York, 1984, viii+ 156, 25× 17cm, 9,480 ff (springer series in synergetics, vol. 19). 40(10):817–818, 1985.
Paper type: Research paper DOI: 10.30486/MJTD.1402.901843 Related articles
The rights to this website are owned by the Raimag Press Management System. |