Shock waves evolution modeling in orion bar PDR

Pomelnikov Ivan A.; Riashchikov Dmitry S.; Mishina Yulia E.; Molevich Nonna E.

Shock waves evolution modeling in orion bar PDR

作者: ¹^,2, ¹^,2, ¹, ¹^,2
隶属关系:
1. Samara National Research University
2. Lebedev Physical Institute
期: 卷 2 (2023)
页面: 206-208
栏目: Иностранный язык в области профессиональной коммуникации
URL: https://journals.eco-vector.com/osnk-sr2023/article/view/409859
ID: 409859

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Background. A photodissociation region (PDR) is a region of the interstellar medium where the chemical and physical properties of the gas are determined by far-ultraviolet (FUV) photons [1]. According to the study [2], the properties of Orion Bar PDR meet the conditions for isentropic instability. It appears when a positive feedback is established between acoustic waves and nonequilibrium heat release [3]. As a result, disturbances evolve into a series of shockwave pulses [4]. The structure that the isentropic instability produces is consistent with the observational data demonstrating the filamentary structure of the medium [5, 6]. The shockwave pulse parameters have already been analytically predicted in [1, 4, 7], but these works do not answer the question of how quickly these structures can emerge. This issue is of significance because the unstable region where wave growth occurs is restricted.

Aim: Numerical modeling of the shockwave pulse evolution and estimation of pulse growth time.

Methods. The parameters of a shockwave pulse depend only on the temperature and density of the medium. The dynamics of acoustic perturbations in a medium can be described by a system of gasdynamic equations:

$\{\begin{cases} \frac{\partial ρ}{\partial t} + d i v (ρ v) = 0; \\ ρ \frac{d v}{d t} + \nabla ρ = 0; \\ C_{V} \frac{d T}{d t} - \frac{k_{B} T}{m ρ} \frac{d ρ}{d t} = - I (ρ, T); \\ p = \frac{k_{B}}{m} ρ T . \end{cases}$

In this work, we have used the model of heat-releasing processes ℑ(ρ,T) proposed in [2]. Observations show that the temperature in the Orion Bar can reach 1000K [5]. Using a stationary condition with ℑ(ρ₀,T₀)=0 and temperature T₀ = 1000 K, one can calculate equilibrium number density in the Orion Bar, which is n₀ = 2.26 × 10⁵ cm⁻³. The initial disturbance for numerical simulations is a Gaussian perturbation in the form:

$ρ = ρ_{0} (1 + a e^{- \frac{x^{2}}{2 σ^{2}}}), ρ = ρ_{0} (1 + γ a e^{- \frac{x^{2}}{2 σ^{2}}}) .$

To model shockwave evolution, we used the Athena MHD code [8].

Results. The modeling shows that the initial disturbance splits into a periodic structure. The wave on the front forms the shockwave pulse, which amplitude we use in the growth time estimation (fig. 1).

Fig. 1. Numerical simulation of shockwave pulse formation

During numerical modeling, the system indicates that the numerical diffusion is considerably higher than it actually is. The diffusion reduces the pulse amplitude. The described effect can be diminished by adjusting the coordinate step (fig. 2, a). We have also described how the characteristic size σ of the initial disturbance influences the pulse growth time (fig 2, b).

Fig. 2. Dependency of shockwave amplitude on time: a) with different grid step and constant characteristic size σ; b) with different characteristic sizes and constant grid step Δx

Conclusions. The growth time of shockwave pulses in PDR with parameters corresponding to Orion Bar has been estimated. Their evolution can be divided into three stages. During the first stage, the perturbations grow at a low rate. At the second stage, there is an explosive growth of the wave amplitude. During the last stage, the growth of pulses slows down until the maximum amplitude is reached. The whole process takes around 50 thousand years.

The study was supported in part by the Ministry of Science and Higher Education of Russian Federation under State assignment to educational and research institutions under Project No. FSSS-2023-0009 and No. 0023-2019-0003.

关键词

isentropic instability, interstellar medium, shock waves, photodissociation regions, molecular clouds, unstable medium

全文:

Aim: Numerical modeling of the shockwave pulse evolution and estimation of pulse growth time.

$ρ = ρ_{0} (1 + a e^{- \frac{x^{2}}{2 σ^{2}}}), ρ = ρ_{0} (1 + γ a e^{- \frac{x^{2}}{2 σ^{2}}}) .$

To model shockwave evolution, we used the Athena MHD code [8].

Fig. 1. Numerical simulation of shockwave pulse formation

Fig. 2. Dependency of shockwave amplitude on time: a) with different grid step and constant characteristic size σ; b) with different characteristic sizes and constant grid step Δx

作者简介

Samara National Research University; Lebedev Physical Institute

Email: vanidzepomelnikov@gmail.com

student, group 6306-030301D, Informatics and Cybernetics Institute, Samara National Research University; Engineer, Lebedev Physical Institute

俄罗斯联邦, Samara; Samara

Samara National Research University; Lebedev Physical Institute

Email: ryashchikovd@gmail.com

PhD (Physical and Mathematical Sciences), Associate Professor, Department of Physics, Samara National Research University; Senior Researcher, Lebedev Physical Institute

俄罗斯联邦, Samara; Samara

Samara National Research University

Email: mishina.yue@ssau.ru

PhD (Philology), Associate Professor, Department of Foreign Languages and Russian as a Foreign Language

俄罗斯联邦, Samara

Samara National Research University; Lebedev Physical Institute

编辑信件的主要联系方式.
Email: nonna.molevich@mail.ru

Scientific Adviser, Doctor of Physical and Mathematical Sciences, Professor, Professor of the Department of Physics, Samara National Research University; Leading Researcher, Lebedev Physical Institute

俄罗斯联邦, Samara; Samara

参考

Young Owl R.C., Meixner M.M., Wolfire M., et al. HCN and HCO images of the Orion Bar photodissociation region // Astrophys J. 2000. Vol. 540. P. 886–906. doi: 10.1086/309342
Krasnobaev V.K., Tagirova R.R. Isentropic thermal instability in atomic surface layers of photodissociation regions // Mon Notices Royal Astron Soc. 2017. Vol. 469, No. 2. P. 1403–1413. doi: 10.1093/mnras/stx884
Molevich N.E., Riashchikov D.S. Shock wave structures in an isentropically unstable heat-releasing gas // Phys Fluids. 2021. Vol. 33. ID 076110. doi: 10.1063/5.0053394
Molevich N.E., Zavershinsky D.I., Galimov R.N., Makaryan V.G. Traveling self-sustained structures in interstellar clouds with the isentropic instability // Astrophys Space Sci. 2011. Vol. 334. P. 35–44. doi: 10.1007/s10509-011-0683-0
Joblin C., Bron E., Pinto C., et al. Structure of photodissociation fronts in star-forming regions revealed by Herschel observations of high-J CO emission lines // Astron Astrophys. 2018. Vol. 615. ID A129. doi: 10.1051/0004-6361/201832611
Goicoechea J.R., Pety J., Cuadrado S., et al. Compression and ablation of the photo-irradiated molecular cloud the Orion Bar // Nature. 2016. Vol. 537. P. 207–209. doi: 10.1038/nature18957
Рящиков Д.С., Помельников И.А., Молевич Н.Е. Возмущения сжатия в атомарной зоне фотодиссоциативных областей межзвездного газа // Краткие сообщения по физике Физического института им. П.Н. Лебедева Российской Академии Наук. 2022. Т. 49, № 10. С. 3–9.
Stone M.J., Gardiner A.T., Teuben P., et al. Athena: a new code for astrophysical MHD // Astrophys J Suppl Ser. 2008. Vol. 178. ID 137. doi: 10.1086/588755

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2. Fig. 1. Numerical simulation of shockwave pulse formation

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3. Fig. 2. Dependency of shockwave amplitude on time: a) with different grid step and constant characteristic size σ; b) with different characteristic sizes and constant grid step Δx

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