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Open Access
Issue
A&A
Volume 709, May 2026
Article Number L5
Number of page(s) 6
Section Letters to the Editor
DOI https://doi.org/10.1051/0004-6361/202658906
Published online 05 May 2026

© The Authors 2026

Licence Creative CommonsOpen Access article, published by EDP Sciences, under the terms of the Creative Commons Attribution License (https://creativecommons.org/licenses/by/4.0), which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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1. Introduction

The dynamical evolution of protoplanetary disks is key to understanding planet formation. Disks exhibit many interesting dynamical processes, including decoupled dust/gas dynamics (e.g., Weidenschilling 1977), planet–disk interactions (Kley & Nelson 2012) gravito- and pure hydrodynamic instabilities (Kratter & Lodato 2016), magneto- and radiation driven flows and instabilities (e.g., Balbus & Hawley 1991; Bai & Stone 2013). Huge strides have been made towards understanding these both from a theoretical standpoint and observationally thanks to high-resolution, high-sensitivity facilities such as VLT/SPHERE and ALMA, which have revealed substructures such as gaps, rings, spirals and discrete clumps (e.g., ALMA Partnership et al. 2015; Andrews et al. 2018; Huang et al. 2024) that have been predicted to arise from dynamical processes (e.g., Dipierro et al. 2015).

There is growing interest in the environmental impacts upon planet-forming disks in star-forming regions. For example, infalling material may replenish the disk (e.g., Gupta et al. 2024; Hühn & Dullemond 2025) and stellar fly-bys can truncate disks (e.g., Clarke & Pringle 1993; Heller 1995; Cuello et al. 2023). There is also the process of “external photoevaporation”, whereby UV radiation (particularly from massive stars) heats and drives winds from the outer regions of disks (e.g., Yorke & Welz 1996; Winter & Haworth 2022). Most research into external photoevaporation has been focused on winds and mass loss rates (e.g., Johnstone et al. 1998; Adams et al. 2004; Haworth et al. 2018, 2023; Aru et al. 2024), implications for disk evolution and lifetimes (e.g., Scally & Clarke 2001; Winter et al. 2018; Concha-Ramírez et al. 2019; Coleman & Haworth 2022), implications for planet formation (e.g., Winter et al. 2022; Qiao et al. 2023; Hallatt & Lee 2025; Qiao et al. 2026) and trying to understand the prevalence and timescales of given levels of irradiation (e.g., Fatuzzo & Adams 2008; Qiao et al. 2022; Anania et al. 2025). However, there are other effects of external irradiation that have been considered, including upon the disk chemistry (Walsh et al. 2013; Boyden & Eisner 2023; Keyte & Haworth 2025).

One aspect of external disk irradiation that has not been considered in detail is the dynamical impact of external heating upon the disk itself. A shadowing of the outer disk by the inner disk has been shown to result in temperature asymmetries that lead to dynamical evolution (Montesinos et al. 2016; Cuello et al. 2019; Su & Bai 2024; Qian & Wu 2024; Zhang & Zhu 2024; Ziampras et al. 2025a; Zhu et al. 2025). When a disk is externally irradiated and subject to asymmetric heating, similar dynamical consequences could be stimulated in addition to the mass loss in the wind, though their impact is yet to be studied.

In this paper we use vertically integrated 2D (i.e., coplanar with the disk) multifluid radiation hydrodynamical simulations with PLUTO to make the first exploration of the dynamical impact of asymmetric externally irradiation upon the disk. Our physical framework and setup largely follows that of Ziampras et al. (2025a), with the addition of a nonaxisymmetric external irradiation source incident edge-on with respect to the disk, with all additions and modifications detailed in Appendix A. In Sect. 2 we present our results, followed by a discussion in Sect. 3 and a summary in Sect. 4.

2. Results

The disk state for our fiducial, strongly irradiated model after 100 kyr of evolution is shown in Fig. 1, where we plot the perturbed gas surface density, the temperature, and the mm-grain dust surface density, shown from left to right. Azimuthally averaged profiles of the gas surface density, its radial perturbations, and the disk temperature are shown in Fig. 2. From these two figures, it becomes clear that the strong nonaxisymmetric heating from the external source has a profound and immediate effect on the disk structure in multiple ways.

Thumbnail: Fig. 1. Refer to the following caption and surrounding text. Fig. 1.

Heatmaps of the perturbed gas density ΔΣgg, 0 (panel b), temperature, T (c), and mm-grain dust density, Σd (d), after 100 kyr of evolution in our model with external irradiation, showing prominent spiral structures in gas, along with the disk’s colder, shadowed farside and rings in the dust distribution. Gas density perturbations are also shown at an earlier state (10 kyr) in panel a. A black-and-white dotted circle marks the exponential tapering radius of the disk at 100 au. The dashed line in the middle panel indicates the τ = 1 surface towards the external source (here at a distance of 0.1 pc towards the right, with a luminosity of 2 × 105 L), albeit computed with several underlying simplifications in Appendix A.1.

The temperature structure (panel c of Fig. 1) shows a clear asymmetry between the irradiated (right) and shadowed (left) sides of the disk, with the shadowed region roughly bounded by the τ = 1 surface towards the external source (dashed line in panel c of Fig. 1, see Eq. (A.5)). The boundary between the internally and externally heated regions at around 40 au is also visible by eye in the figure. This temperature structure is established very early on in the simulation (within the first few orbits at 100 au) and persists throughout, with only minor fluctuations due to the dynamics induced by this very heating asymmetry. From the bottom panel of Fig. 2, we can see that the temperature contrast between the irradiated and shadowed sides of the disk is such that the temperature on the shadowed side remains close to the initial profile (i.e., heated by irradiation from the central star), whereas the irradiated side features a roughly constant temperature of ∼17 K beyond ∼40 au. This flattening of the temperature profile is in agreement with previous studies of externally irradiated disks (e.g., Haworth 2021).

Thumbnail: Fig. 2. Refer to the following caption and surrounding text. Fig. 2.

Azimuthally averaged radial profiles of the gas surface density (top) and temperature (bottom) as a function of time. Top: gas density perturbations, which, although at the few % level, grow throughout the simulation runtime due to the spirals induced by external irradiation. Bottom: the shaded region marks the temperature variation between the irradiated (upper bound) and shadowed (lower bound) sides of the disk.

As a result of the nonaxisymmetric temperature, the gas surface density Σg (panel a and b of Fig. 1) features prominent spiral arms of amplitude ΔΣgg, 0 ≳ 0.2 developing within the first 10 kyr, which persist throughout the simulation runtime. These spirals are launched due to the azimuthal modulation of the radial pressure gradient caused by the external heating source, with the mechanism detailed in Ziampras et al. (2025a) and Zhu et al. (2025). As noted in these studies (see also Su & Bai 2024; Qian & Wu 2024), the spiral arms carry an angular momentum flux that is deposited at the edge of the shadowed region with a radial spacing set by the sound speed profile of the disk (Ziampras et al. 2025a). This process results in weak, but persistent radial modulations in the gas surface density (see also Fig. 2), and ultimately leads to the formation of rings and gaps in the dust surface density (right panel of Fig. 1) due to dust trapping within the gas pressure maxima. This finding is in line with the aforementioned studies of shadow-induced spirals and rings, and suggests that external irradiation can also lead to similar substructures in protoplanetary disks.

At the same time, the disk seems to develop a lopsided structure, with the shadowed side away from the external source being denser than the irradiated side. This is likely related to the radial temperature profile being flatter on the irradiated side but maintaining its power-law shape within the shadow (see also Fig. 2), which leads to a weaker radial pressure gradient on the irradiated side. This in turn results in a faster azimuthal flow there due to the gas being less pressure-supported and thus closer to its Keplerian speed, and culminates in a redistribution of mass towards the shadowed side of the disk. This behavior is also evident in the rings in dust surface density, which show a slight eccentricity with their apastron pointing towards the shadowed side of the disk.

We stress that the degree of dynamical evolution, as discussed at length in Appendix A.1, is quite sensitive to the intensity and geometry of the heating rate attributed to the external source. To address this, we carried out simulations with two additional models. Their results highlight that our fiducial model, while it remains the most interesting dynamically, should be interpreted as an upper limit to the effects of external irradiation unless demonstrated otherwise by more self-consistent 3D radiative transfer models. The additional configurations correspond to a) a weaker external irradiation flux by a source at dext = 1 pc (effectively reducing Fext by a factor of 100 to 103G0), and b) a smaller, less massive disk with a total gas mass of ≈0.01 M that is truncated at 40 au. The latter is motivated by the expectation that external photoevaporation, being a continuous process, will likely truncate the disk and reduce its mass over time. Thus, this model can be thought of as a later evolutionary stage of the fiducial model.

The resulting disk states after 100 orbits at R0 (100 kyr for the left panel, 25 kyr for the right panel) are shown in Fig. 3, where we plot the dust surface density similar to Fig. 1. We find that there is no substructure whatsoever visible in the dust distribution of the model with dext = 1 pc, while the truncated disk features several rings similar to the fiducial model, albeit more circular and with a weaker contrast.

Thumbnail: Fig. 3. Refer to the following caption and surrounding text. Fig. 3.

Dust-surface-density heatmaps after 100 orbits at R0 in two additional models. Left: placing the external source at a distance of 1 pc rather than the fiducial 0.1 pc led to no noticeable substructure after 100 orbits (100 kyr). Right: a less massive, smaller disk shows substructure in the form of circular rings after 100 orbits at R0 = 40 au (25 kyr), albeit less prominent than in the fiducial model.

Finally, we produced synthetic ALMA observations of our fiducial model after 10 and 100 kyr of evolution by computing the intensity at λ = 1.3 mm (ν = 230 GHz) as

I ν = B ν ( T ) ( 1 e κ ν Σ d ) , κ 1.3 mm = 3.06 cm 2 / g , Mathematical equation: $$ \begin{aligned} I_\nu = B_\nu (T)\left(1 - e^{-\kappa _\nu \Sigma _{\rm d}}\right), \quad \kappa _{1.3\,\mathrm{mm}} = 3.06\,\mathrm{cm}^2/\mathrm{g}, \end{aligned} $$(1)

with κ1.3 mm computed using optool (Dominik et al. 2021) with DIANA-standard composition. The source was placed at a distance of 400 pc. We then convolved the resulting intensity maps with a Gaussian beam of FWHM 20 mas and overlaid Gaussian noise with an RMS of 10 μJy/beam. The resulting images are shown in the left panel of Fig. 4, with the rings clearly visible in continuum emission on the right. For our fiducial model, while the gas density and temperature had already developed features within the first 10 kyr of evolution (see Fig. 1), rings in the mm dust continuum required at least ∼30 kyr to become visible.

Thumbnail: Fig. 4. Refer to the following caption and surrounding text. Fig. 4.

Synthetic ALMA observations at 1.3 mm of our model, loosely mimicking a source at 400 pc distance, after 10 (left) and 100 kyr (right) of evolution. Rings only become visible after ∼30 kyr for this model.

3. Discussion

We briefly highlight the relevance of our findings in the context of modeling externally irradiated disks and relating such models to observable signatures and past observations. We also discuss the dynamical implications of an off-plane external heating source.

3.1. Applications to observed systems and limitations

Several disks in strongly irradiated environments have been observed to feature substructures of dynamical origin, including the ringed disks around SO 1274 and SO 844 (Huang et al. 2024) in σ Orionis, the nonaxisymmetric disk around ISO-Oph 2 (Casassus et al. 2023), and the seemingly warped proplyd 114-426 in Orion (McCaughrean et al. 1998; Miotello et al. 2012). Our results could point to applications (at least to an extent, given the underlying simplifications and assumptions laid out in Appendix A.1) in such systems and encourage further exploration of this possibility with future work.

However, it is important to stress the limitations of both the mechanism explored here and the applicability of our models to the aforementioned systems. Possibly the most glaring difference between our model and the disks presented in Huang et al. (2024) is the strength of the external irradiation flux, with our fiducial model being subject to a flux of ∼105G0. Meanwhile, the disks in σ Orionis are exposed to a significantly weaker flux of ∼102.3G0. Although we would expect that some level of nonaxisymmetric perturbations will be present even at lower fluxes, it is unclear whether the mechanism explored here can lead to prominent substructures within the lifetime of the disk, especially when considering mass loss due to external photoevaporation (e.g., Ansdell et al. 2017, for σ Orionis).

To that end, we can qualitatively draw a parallel to our supplementary model with the external source placed at a distance of 1 pc from the disk (left panel in Fig. 3). In this cas, we found that this reduction of the external flux to ∼103G0 yielded weak perturbations in the gas surface density but no observable substructures in the dust over 100 kyr. While this suggests that the mechanism explored here is not necessarily the dominant driver of the observed substructures in σ Orionis, we note that a more detailed exploration of the parameter space in addition to more sophisticated modeling is needed to fully understand the relevance of this mechanism for the observed systems, as our models are not meant to be their direct analogs.

3.2. 3D effects and self-shielding

In this work we limited our models to a 2D, vertically integrated framework, assuming that the external heating source lies within the disk plane. While this approach enables a first look at the dynamical impact of external irradiation, it represents a rather ideal situation where the top-down symmetry of the disk is maintained. In practice, starlight from the external source could impinge on the disk at an arbitrary angle (see, e.g., Ricci et al. 2008), shifting the location of the disk midplane as one hemisphere is preferentially heated. This could then induce significant vertical motion in the form of a warp in the disk, complicating its dynamical evolution (see, e.g., Rabago et al. 2024; Kimmig & Dullemond 2024; Zhang et al. 2025) and driving likely observable features (e.g., Kimmig & Villenave 2025). In fact, it has been suggested that the seemingly warped structure in the Orion 114-426 disk (Miotello et al. 2012) could be driven by asymmetric external irradiation/photoevaporation. This possibility will be explored with followup work, using 3D radiation hydrodynamical simulations.

Furthermore, Gárate et al. (2024) found that disk substructures can delay dust loss under external photoevaporation by enhancing dust trapping and shielding. Their perturbation strengths of ΔΣg0 ∼ 0.25 exceed ours (∼0.1 at 100 kyr, see Fig. 2), but our structures are expected to grow with continued asymmetric heating (Ziampras et al. 2025a; Zhu et al. 2025). This makes it plausible that similar feedback could operate in our scenario.

4. Summary

In this work, we have explored the dynamical impact of external irradiation on protoplanetary disks with 2D hydrodynamical simulations, including dust–gas dynamics, radiation transport, and an asymmetric heating term due to an in-plane nearby massive star. Our results can be summarized as follows:

  • We have demonstrated, for the first time, that if external irradiation can drive even modest asymmetric external heating of protoplanetary disks, this can lead to prominent dynamical effects within the disk, including the formation of pronounced spiral arms in gas, concentric rings and gaps in dust, and a noticeably lopsided redistribution of mass within the disk.

  • The mechanism behind these dynamics is a direct analog of the shadow-induced spirals and rings studied in disks with a misaligned inner component shadowing the outer disk. The primary difference here is the disk itself is the source of the shadowing against the external heat source.

  • These dynamics could lead to observable signatures in mm continuum emission, potentially related to those seen by ALMA in strongly irradiated regions such as σ Orionis, although this connection remains tentative.

Our findings suggest that external irradiation, in addition to driving photoevaporative winds, can lead to asymmetric heating and, if so, can then exert significant dynamical effects on the structure of protoplanetary disks in a manner that cannot be captured by axisymmetric models. This could have important implications for both disk evolution and planet formation in strongly irradiated environments, and it encourages further investigation with future studies. In particular, given the complex radiative transfer and dynamics of the disk–wind system, which we have simplified here, it remains to be proven in future works whether this mechanism could be expected to be significant for real systems.

Data availability

Data from our numerical models are available upon reasonable request to the corresponding author.

Acknowledgments

We thank the referee for their careful review and constructive comments that significantly improved the manuscript. AZ acknowledges funding by STFC grant ST/T000341/1 and ST/X000931/1, and from the European Union under the European Union’s Horizon Europe Research and Innovation Programme 101124282 (EARLYBIRD). LQ and TJH acknowledge UKRI guaranteed funding for a Horizon Europe ERC consolidator grant (EP/Y024710/1). TJH also acknowledges a Royal Society Dorothy Hodgkin Fellowship. This research utilized Queen Mary’s Apocrita HPC facility, supported by QMUL Research-IT (http://doi.org/10.52x81/zenodo.438045). The equipment was funded by BEIS capital funding via STFC capital grants ST/K000373/1 and ST/R002363/1 and STFC DiRAC Operations grant ST/R001014/1. Views and opinions expressed are those of the authors only. All plots in this paper were made with the Python library matplotlib (Hunter 2007).

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Appendix A: Physics and numerics

Here we detail the physical and numerical framework of our simulations, highlighting the differences with respect to Ziampras et al. (2025a). We also describe our implementation of external irradiation heating, as well as our initial and boundary conditions.

A.1. Physics

We consider a razor-thin protoplanetary disk orbiting a star with mass M = 1 M and luminosity L = 1 L, such that the Keplerian frequency at distance R is Ω K = G M / R 3 Mathematical equation: $ \Omega_{\mathrm{K}}=\sqrt{\mathrm{G}M_\star/R^3} $, with G the gravitational constant. The disk mainly consists of gas with adiabatic index γ = 7/5, mean molecular weight μ = 2.353, surface density Σg, vertically integrated internal energy density e, and a velocity field ug, with a pressureless dust component with surface density Σd and velocity ud. Via the perfect gas closure relation we can define the vertically integrated pressure P = (γ − 1)e, the isothermal sound speed c s = P / Σ g Mathematical equation: $ c_{\mathrm{s}}=\sqrt{P/\Sigma_{\mathrm{g}}} $, and the temperature T = μcs2/ℛ, with ℛ being the perfect gas constant. The disk is exposed to irradiation from an external source located at a distance dext from the central star, emitting a flux Fext with bolometric luminosity Lext.

Our physical framework largely follows that of Ziampras et al. (2025a), with a few modifications that we highlight in this section. In particular, we solve the Navier–Stokes equations for both gas and mm-grain dust components, coupled via a drag term in the Epstein regime (Weidenschilling 1977). We further include heating via viscosity and irradiation (both internal and external), as well as cooling via surface losses and a simplified treatment of the in-plane radiative flux. With that in mind, the only differences between our current framework and that of Ziampras et al. (2025a) are found in the energy equation, expressed as

d e d t = γ e · u g + Q visc + Q irr + Q cool + Q rad + Q ext , Mathematical equation: $$ \begin{aligned} \frac{\mathrm{d}e}{\mathrm{d}t}=-\gamma e\nabla \cdot \boldsymbol{u}_{\rm g}+Q_{\rm visc}+Q_{\rm irr} + Q_{\rm cool} + Q_{\rm rad}\prime + Q_{\rm ext}, \end{aligned} $$(A.1)

where Qvisc, Qirr, and Qcool are the viscous heating, internal irradiation heating, and surface cooling terms, respectively (as defined in Ziampras et al. 2025a). Here, Qrad′ captures in-plane cooling via a simple β-cooling approach

Q rad = Σ g c v T T 0 β Ω K , T 0 = 90 R au 3 / 7 K , Mathematical equation: $$ \begin{aligned} Q_{\rm rad}\prime = -\Sigma _{\rm g}c_{\rm v} \frac{T - T_0}{\beta }\Omega _{\rm K}, \quad T_0 = 90\,R_{\rm au} ^{-3/7}\,\mathrm{K}, \end{aligned} $$(A.2)

where T0 is the initial temperature profile of the disk given by a balance between Qirr and Qcool, and β follows the prescription for in-plane cooling of Ziampras et al. (2023) with

β = Ω K η ( H 2 + l rad 2 3 ) , η = 16 σ SB T 3 3 κ R ρ mid 2 c v , l rad = 1 κ P ρ mid . Mathematical equation: $$ \begin{aligned} \beta = \frac{\Omega _{\rm K}}{\eta }\left(H^2 + \frac{l_{\rm rad}^2}{3}\right), \quad \eta = \frac{16\sigma _{\rm SB} T^3}{3\kappa _{\rm R}\rho _{\rm mid}^2c_{\rm v}}, \quad l_{\rm rad} = \frac{1}{\kappa _{\rm P} \rho _{\rm mid}}. \end{aligned} $$(A.3)

In the above, cv is the specific heat capacity at constant volume, σSB is the Stefan–Boltzmann constant, κR and κP are the Rosseland and Planck mean opacities, respectively, with κR = κP = κ given by the opacity model of Bell & Lin (1994), H = csK is the pressure scale height and ρ mid = Σ g / ( 2 π H ) Mathematical equation: $ \rho_{\mathrm{mid}}=\Sigma_{\mathrm{g}}/(\sqrt{2\pi}H) $ is the midplane gas density. We note that this approach is mostly valid in the context of temperature perturbations (e.g., Miranda & Rafikov 2020; Ziampras et al. 2023), which is the case in the model discussed here. Equation (A.2) then practically approximates radiative losses as such perturbations decay, and T0 acts as an analytically available profile that corresponds to the equilibrium solution and effectively a temperature floor in the shadowed and illuminated disk sides, respectively.

Finally, Qext captures heating from external irradiation, which we model as

Q ext = 2 π H ( · F ext ) | z = 0 , F ext = L ext 4 π d ext 2 e τ d ̂ , Mathematical equation: $$ \begin{aligned} Q_{\rm ext} = -\sqrt{2\pi } H\,\left(\nabla \cdot \boldsymbol{F}_{\rm ext}\right)\big |_{z=0},\quad \boldsymbol{F}_{\rm ext} = \frac{L_{\rm ext}}{4\pi d_{\rm ext}^2} e^{-\tau }\hat{d}, \end{aligned} $$(A.4)

with τ the optical depth between the external source and a given point in the disk, and Lext = 2 × 105 L by default. Assuming that d ext = d ext x ̂ Mathematical equation: $ \boldsymbol{d}_{\mathrm{ext}} = d_{\mathrm{ext}} \hat{x} $, that is, the external source is located in-plane along the x-axis, and that it lies far enough such that the rays can be considered parallel to each other when reaching the disk, we can write τ at a distance x = Rcos(ϕ) from the central star as

τ ( x ) = d ext x κ ρ d x . Mathematical equation: $$ \begin{aligned} \tau (x) = \int _{d_{\rm ext}}^{x} \kappa \,\rho \,\mathrm{d}x\prime . \end{aligned} $$(A.5)

The opacity κ used here is once again computed using the model of Bell & Lin (1994). This choice of an infrared opacity is motivated by the fact that the external UV irradiation (to which Bell & Lin 1994, would not apply) is attenuated in the wind before it penetrates the disk. Heating of the disk itself due to external irradiation hence comes from infrared emission from the warm photodissociation region (PDR) in the wind (Rowan-Robinson 1980; Keyte & Haworth 2025; ?), where for the sake of simplicity we assume that this corresponds to the full bolometric luminosity of Lext = 2 × 105 L from the external source, here a nearby O-type star.

We stress that this approach is approximate – to the point of simplistic—compared to detailed radiative transfer, photochemistry and thermal balance, but captures the presence of a nonaxisymmetric heating rate (here, from an external source) while striking a reasonable balance between simplifying the complicated thermochemistry at the PDR and maintaining a parameterizable setup that nevertheless yields reasonable temperatures within the disk when compared to previous models (e.g., Haworth 2021). As it is therefore unclear whether the resulting heating rate generally under- or overestimates the temperature output from a fully self-consistent thermochemical calculation, we believe that it is sufficient given the exploratory nature of this work. Nevertheless, this work should be viewed as asking what the dynamical impact is if an externally induced temperature asymmetry is established, and the important next step is to undertake full radiation hydrodynamics in a range of external irradiation scenarios (e.g., UV-to-bolometric flux ratios) to determine under what conditions such an asymmetry is genuinely produced. At present, given that our estimate of the heating rate comes from thermal reemission, which is intrinsically more isotropic than direct illumination, we expect that the level of nonaxisymmetry of the heating rate corresponds to an upper limit compared to a full, 3D radiative transfer model.

To compute τ in practice, we first constructed a 3D model of our disk on a Cartesian grid assuming vertical Gaussian stratification (i.e., ρ(R, z) = ρmid(R) ez2/2H2 with a vertically isothermal profile), performed ray tracing from the external source to each cell to compute τ, and then interpolated the resulting τ(x, y) heatmap back onto our 2D polar grid. This procedure is carried out using a Python script once, at the beginning of each simulation, assuming that the vertical structure of the disk does not change significantly during the simulation runtime. As we will see in Sect. 2, this approximation becomes less accurate for very strong external irradiation due to both significant vertical expansion of the disk and the development of non-axisymmetric structures that would feed back onto the optical depth calculation. Nevertheless, as we intend for this work to be a first exploration of the dynamical impact of external irradiation on protoplanetary disks, we leave a more self-consistent treatment of the radiative transfer due to the external source for future studies.

A.2. Numerics

We utilize the PLUTO code (Mignone et al. 2007) to solve the above equations on a 2D polar grid (R, ϕ), spanning R ∈ [5, 500] au and ϕ ∈ [0, 2π], with NR × Nϕ = 1048 × 1427 cells. Combined with a logarithmic radial spacing, this grid setup results in roughly square cells with a resolution of 16 cells per scale height at 100 au. We use the HLLC (Toro et al. 1994) and LeVeque (2004) Riemann solvers for the gas and dust, respectively, with a second-order Runge–Kutta time integrator and piecewise linear spatial reconstruction, the FARGO algorithm (Masset 2000; Mignone et al. 2012), and the implicit drag module described in Ziampras et al. (2025b).

Our initial disk setup corresponds to a disk orbiting at Keplerian speed with a tapered surface density profile

Σ g ( R ) = 1400 ( R R 0 ) 1 e R / R 0 , R 0 = 100 au , Mathematical equation: $$ \begin{aligned} \Sigma _{\rm g}(R) = 1400\,\left(\frac{R}{R_0}\right)^{-1} e^{-R/R_0}, \quad R_0 = 100\,\mathrm{au}, \end{aligned} $$(A.6)

for a total gas mass of ≈0.1 M, and a temperature profile given by Eq. (A.2). The dust component corresponds to mm-sized grains with an initially uniform dust-to-gas ratio of 0.009, assuming that the dust-to-gas ratio in small, opacity-carrying grains is 0.001. We impose a density floor of 10−5 g/cm2 on both dust and gas to avoid numerical issues in low-density regions, although this has no impact on our results. We utilize wave-damping (de Val-Borro et al. 2006) and outflow boundary conditions at the inner and outer radial boundaries, respectively. Finally, we set Lext = 2 × 105 L to mimic irradiation by a θ1 C Ori-like source located at dext = 0.1 pc, and integrate for 100 kyr, or 100 orbits at 100 au.

All Figures

Thumbnail: Fig. 1. Refer to the following caption and surrounding text. Fig. 1.

Heatmaps of the perturbed gas density ΔΣgg, 0 (panel b), temperature, T (c), and mm-grain dust density, Σd (d), after 100 kyr of evolution in our model with external irradiation, showing prominent spiral structures in gas, along with the disk’s colder, shadowed farside and rings in the dust distribution. Gas density perturbations are also shown at an earlier state (10 kyr) in panel a. A black-and-white dotted circle marks the exponential tapering radius of the disk at 100 au. The dashed line in the middle panel indicates the τ = 1 surface towards the external source (here at a distance of 0.1 pc towards the right, with a luminosity of 2 × 105 L), albeit computed with several underlying simplifications in Appendix A.1.
In the text
Thumbnail: Fig. 2. Refer to the following caption and surrounding text. Fig. 2.

Azimuthally averaged radial profiles of the gas surface density (top) and temperature (bottom) as a function of time. Top: gas density perturbations, which, although at the few % level, grow throughout the simulation runtime due to the spirals induced by external irradiation. Bottom: the shaded region marks the temperature variation between the irradiated (upper bound) and shadowed (lower bound) sides of the disk.
In the text
Thumbnail: Fig. 3. Refer to the following caption and surrounding text. Fig. 3.

Dust-surface-density heatmaps after 100 orbits at R0 in two additional models. Left: placing the external source at a distance of 1 pc rather than the fiducial 0.1 pc led to no noticeable substructure after 100 orbits (100 kyr). Right: a less massive, smaller disk shows substructure in the form of circular rings after 100 orbits at R0 = 40 au (25 kyr), albeit less prominent than in the fiducial model.
In the text
Thumbnail: Fig. 4. Refer to the following caption and surrounding text. Fig. 4.

Synthetic ALMA observations at 1.3 mm of our model, loosely mimicking a source at 400 pc distance, after 10 (left) and 100 kyr (right) of evolution. Rings only become visible after ∼30 kyr for this model.
In the text

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