2.1. Classification of shocks

Shocks can be classified based on their upstream and downstream velocity relative to the characteristic speeds of the system (see Table 1). For correct classification, the velocity must be in the shock frame, that is, a frame of reference where the shock is stationary, for example, the de Hoffmann–Teller frame (de Hoffmann & Teller, Reference de Hoffmann and Teller1950), where the electric field is zero either side of the shock. In the de Hoffmann–Teller frame, it is possible to derive an equation that gives all possible steady-state transitions as a function of the upstream (u) and downstream (d) Alfvén Mach numbers, and the upstream plasma-β and angle of magnetic field (Hau & Sonnerup, Reference Hau and Sonnerup1989).

Table 1. Possible stable magnetohydrodynamic shock transitions based on the upstream and downstream states

Note: Transitions of the form u > d are entropy-forbidden, so not listed here.

2.2. Identification technique

To automatically identify shocks in our simulations, we use the following procedure:

1. 1. Identify shock candidates based on the divergence of the velocity field ($ \nabla \cdot \mathbf{v}<0 $ is a necessary condition for a shock).

2. 2. Calculate the parallel and perpendicular unit vectors based on the maximum density gradient. The list of possible shocks is then filtered by checking the density gradient along a line perpendicular to the shock front. If the shock candidate is not a local maxima or minima of the perpendicular density gradient, then it is not the center of the feature and is discarded. This prevents the numerical (and physical) finite width of the shock resulting in multiple detections.

3. 3. Estimate the shock frame from the steady-state conservation of mass equation. In the de Hoffman–Teller shock frame, the conservation of mass equation becomes $ {\left[\rho {v}_{\perp}\right]}_d^u=0 $. To transfer the simulation laboratory frame to the shock frame, we need the shock velocity $ {v}_s $. By rewriting the mass conservation including this constant shock velocity as $ {\left[\rho \left({v}_{\perp }+{v}_s\right)\right]}_d^u=0 $, where $ {v}_{\perp } $ is directly from the simulation, we can estimate the shock velocity by rearranging as $ {v}_s=\frac{\rho^d{v}_{\perp}^d-{\rho}^u{v}_{\perp}^u}{\rho^u-{\rho}^d} $.

4. 4. Compare the upstream and downstream Mach numbers to calculate the shock transition.

There are a number of assumptions that go into this identification technique, with the strongest being that the shocks are steady-state. In a highly dynamic simulation, this may prevent transient shocks being detected as readily and could lead to erroneous shock detection. As such, our identification procedure is likely an underestimate of the number of shocks in the system. Furthermore, we include additional checks to confirm the compressibility is greater than unity for all shocks, and that there is a reversal in the magnetic field across the interface for the intermediate shocks.

2.3. MHD simulation

To test this shock detection code, we use the OT shock vortex (Orszag & Tang, Reference Orszag and Tang1979). The OT initial conditions produce a decaying compressible turbulent system starting from the following initial conditions:

$$ {\displaystyle \begin{array}{l}{v}_x=-{v}_0\sin \left(2\pi y\right),\quad (1)\qquad \rho =25/\left(36\pi \right),\quad (4)\quad \\ {v}_y={v}_0\sin \left(2\pi x\right),\qquad (2)\qquad P=5/\left(12\pi \right),\quad (5) \\ {}{B}_x=-{B}_0\sin \left(2\pi y\right),\quad (3)\qquad {v}_0=1, \qquad\qquad(6)\\ {} {B}_y={B}_0\sin \left(4\pi y\right),\qquad(4)\quad {B}_0=1/\sqrt{4\pi },\quad\quad (7)\end{array}} $$

for density $ \rho $, pressure P, velocity $ \mathbf{v}=\left[{v}_x,{v}_y,0\right] $, and magnetic field $ \mathbf{B}=\left[{B}_x,{B}_y,0\right] $. The OT vortex has been well studied in the literature (Dahlburg & Picone, Reference Dahlburg and Picone1989; Jiang & Wu, Reference Jiang and Wu1999; Parashar et al., Reference Parashar, Shay, Cassak and Matthaeus2009; Picone & Dahlburg, Reference Picone and Dahlburg1991; Uritsky et al., Reference Uritsky, Pouquet, Rosenberg, Mininni and Donovan2010). The initial conditions are evolved in 2D for ideal MHD equations using the fourth-order central-difference solver in the (PIP) code (Hillier et al., Reference Hillier, Takasao and Nakamura2016), which has been used previously to study shocks (e.g., Snow & Hillier, Reference Snow and Hillier2021). The simulations are performed using 1,024 × 1,024 cells with periodic boundary conditions.