2.1.1. Hydrodynamic models: gas components

In the case of galaxies extracted from hydrodynamical simulations, a population of particles or cells trace the underlying distribution of a fluid (such as the gas in a galaxy). Properties of the fluid are computed across a volume, described by the smoothing ‘kernel’ or cell size, centred at the given location. In order to ensure that we reproduce this smoothing in our data cubes and recover the underlying fluid properties appropriately within our images, we use an over-sampling method to visualise this kernel volume.

This means that, when we generate a mock observation of the gas component, we must project particles with adaptive sizes onto a fixed grid of pixels. As discussed in Borrow & Kelly (Reference Borrow and Kelly2021), there are many methods of doing this. However, many of the simple methods result in inaccuracies and artefacts due to the projection of spherical kernels onto a rectangular grid.

The smoothed particle hydrodynamic (SPH) kernel projection method is outlined in Borrow&Kelly (Reference Borrow and Kelly2021) (a flavor of which is used in Dolag et al. Reference Dolag, Hansen, Roncarelli and Moscardini2005). We have taken the sub-sampling regime described in these papers and redesigned them for use in SimSpin. Particles are treated as Monte Carlo tracers of the field. The basic features of this algorithm are stated below:

1. 1. Each SPH particle read in contains information about its ‘smoothing length’, h, across which hydrodynamical equations have been computed for the fluid represented at that particle position. In the case of AMR codes, the equivalent information about the ‘cell size’ is computed from the mass and density of the cell, as described below.

2. 2. We randomly sample sph_spawn_n tracer particles within a sphere centred on the true SPH particle position.

3. 3. Each tracer particle is associated with a numerical weight as described by the relevant SPH kernel. All weights for an individual SPH particle will sum to one in order to conserve mass within the system.

4. 4. These new tracer particles replace the original SPH particle. They gain all the properties of the original particle, but a weighted fraction of the total mass according to the weight assigned using the kernel.

This results in a new table of particle properties. The new table will contain ‘sph_spawn_n’ times as many rows as the original component of SPH particles. The number of particles it is necessary to spawn will be dependent on the underlying number density of the input model, the desired telescope properties and projected distance to the object. We recommend adjusting this value until each pixel in the mock images contains a minimum of 200 particles to avoid statistical particle noise from dominating the resulting kinematics. Once this table of over-sampled gas particles has been computed, the processing of these observations with build_datacube() will be very quick due to the $\mathcal{O}(n)$ computation used to grid particles into pixels. For this reason, we perform the smoothing at the point of making the SimSpin input file, rather than at the build_datacube() step.

When using this option, we attempt to ensure that the projection kernel corresponds to the kernel used for the SPH calculations within the simulation. For supported hydrodynamic simulations, we provide a smoothing kernel to best match the one used in the original model. These are selected automatically based on the metadata contained within the input file.

Most SPH simulations use a flavour of the Wendland kernel outlined in Wendland (Reference Wendland1995). The $C^{2}$ Wendland kernel, used in Eagle (Schaller et al. Reference Schaller2015), is a spherically symmetric kernel, W(r,h), which has the form:

(1) \begin{equation} W(r,h) = \begin{cases} \dfrac{21}{2 \pi}(1 - r/h)^4 (4r/h + 1),& \text{if }\ 0 \leq r/h < 1\\[7pt] 0, & \text{if }\ r/h \geq 1 \end{cases}\end{equation}

Here, r denotes the distance from the particle to another position at which the weight is calculated and h denotes the smoothing length of a particle. For each simulation, this smoothing length, h, is a value given by requiring that the weighted number of nearest neighbouring particles, $N_{neigh}$ , is a pre-defined constant:

(2) \begin{equation} N_{neigh} = \frac{4 \pi h_i^3}{3} \sum_j W\left(|x_i - x_j|, h_i \right).\end{equation}

For the Eagle simulation, $N_{neigh} = 48$ , but this will vary for each SPH simulation. This smoothing length is computed for each particle throughout the simulation, as this value will obviously be dependent on the local number density of particles. The smoothing length, h, is commonly stored as a parameter within the output files. We can use this parameter to then determine the radius across which each individual gas particle should be over-sampled.

The $C^{6}$ Wendland kernel used in Magneticum (Teklu et al. Reference Teklu2015) has the form:

(3) \begin{equation} W(r,h) = \begin{cases} \dfrac{1365}{64 \pi}(1 - r/h)^8 \times \\(1 + 8 r/h + 25 (r/h)^2 + 32 (r/h)^3),& \text{if }\ 0 \leq r/h < 1\\[8pt] 0, & \text{if }\ r/h \geq 1 \end{cases}\end{equation}

In Magneticum, the smoothing lengths have been computed with $N_{neigh}=64$ (Beck et al. Reference Beck2016), but again, the raw h for each particle is given in the output for this simulation.

Finally, in the case of Gadget2 SPH simulations, and for visualisation of AMR/cell model implementations, we use the M4 cubic spline kernel to smooth gas distributions across our image grid. In particular, for mesh-based codes, we do not have a smoothing length for a given cell. As an approximation, we use the quoted cell density and mass to compute an ‘effective’ smoothing length at a position at the centre of the cell (at the position where cell properties are given).

(4) \begin{equation} h_i = 2 \frac{3}{4 \pi} \left( M_i / \rho_i\right)^{1/3}\end{equation}

where the effective smoothing length, h, for a given cell, i, is the mass within that cell, $M_i$ , divided by the density of the cell, $\rho_i$ . A spherical distribution is assumed so that the system can be observed fairly from any angle without observing discontinuities at low density locations.

We then use a simplest appropriate kernel, the M4 cubic spline kernel, as an approximation of the behaviour of the gas within a given cell:

(5) \begin{equation} W(r,h) = \begin{cases} \dfrac{1}{4 \pi} \left((2 - r/h)^3 - (1 - r/h)^3\right), & \text{if }\ 0 \leq r/h < 1\\[8pt] 0, & \text{if }\ r/h \geq 1 \end{cases}\end{equation}

This approximation is used for visualisation of HorizonAGN and IllustrisTNG simulations.

It is also important to remember that within true observations of these systems, only gas within specific phases would be observable by an integral field unit. At the point of constructing the SimSpin file, we record the basic attributes of all gas particles within the simulation in a list element ‘gas_part’. At the point of building a mock observation from this information, cold, dense gas can be filtered to produce a comparable set of kinematic maps to observables.

2.1.2. Hydrodynamical simulations: stellar components

Within a hydrodynamical model, stars from in dense, cold gas and their age, metallicity and birth mass are tracked as they evolve through time in the simulation. We use these parameters to tag each stellar particle with a spectral template. These can later be adjusted to reflect the line-of-sight velocity within a given pixel, the distance to the projected object through cosmological dimming, and wavelength resolution of a given telescope.

There are currently three options to choose from for spectral templates used to associate spectra with individual stellar particles, which are listed in Table 1. These prepared templates have been taken from ProSpect, a generative spectral energy distribution code (Robotham et al. Reference Robotham2020), for which these templates have been prepared using a Chabrier initial mass function (Chabrier Reference Chabrier2003). We give this selection of options as a user may wish to focus on a different science question with one set of templates better suited than the other, e.g. for observations using higher spectral resolution instruments, the high-resolution template options will be necessary, but these may be avoided in other cases due to the increased memory requirements and computation. This suite of templates is also a reflection of those commonly used within the literature for exploring stellar kinematics. As this changes with time, we intend to update and expand this selection of template libraries in future versions of the code.

Table 1. Demonstrating the resolution properties of the variety of spectral templates available in SimSpin, including the GalexEV (Bruzual & Charlot Reference Bruzual and Charlot2003) (hereafter BC03) and E-MILES (Vazdekis et al. Reference Vazdekis, Koleva, Ricciardelli, Röck and Falcón-Barroso2016) as prepared for the ProSpect code (Robotham et al. Reference Robotham2020). It is useful to be aware that the resolution of mock data is built upon templates with finite resolution themselves.

When selected, the spectral templates within the chosen library are used to tag each stellar particle with an associated spectrum. Here, the requirement to select the correct template for the science in question is made clear. E-MILES templates are higher spectral resolution ( $\Delta \lambda = 0.9$ Å with $\sigma_{\text{LSF}} = 2.51$ Å) in comparison to the variable spectral resolution $\Delta \lambda = 1$ to 50 Å with $\sigma_{\text{LSF}} = 3$ Å for the BC03 templates. However, the grid of possible age and metallicity combinations is more sparse in the E-MILES template set, with 636 combinations in comparison to the 1326 available for the BC03 templates. Depending on the science in question, you may value higher spectral resolution, or higher age-metallicity resolution.

The assigned spectrum for a given age-metallicity stellar particle is computed as a weighted interpolation of the four template spectra that surround that particle within the age and metallicity grid of the chosen template. An index for the age and metallicity, as well as the assigned weights based on the location of the particle relative to the template bins, are then stored against the spectral_weights list element in the file. Given the template, recorded in the header of the file, these weights can then be used to construct a unique spectrum for each age-metallicity combination during the build of the mock data cube.

In the current version of SimSpin, v2.6.0, we do not modify the spectra of young stars to reflect attenuation due to birth clouds. However, we note that this is an important extension to the code that will be added in the future and should be noted if your input model is dominated by younger stellar populations.

2.1.3. N-body models

Within isolated N-body models, stellar particles are treated as collisionless and move only under the force of gravity. Unlike their hydrodynamic partners, these stars are initialised with a given 6D distribution. In particular, for Gadget models, particles can be separated into two different distributions to reflect the bulge and disk of a galaxy.

Within SimSpin, we can generate mock data cubes of these kinds of models using these bulge and disk tracer particles as stars. For Gadget-like formatted files, disk particles are listed under PartType2 and bulge particles under PartType3. We assume that these populations all represent stellar material and summarise their attributes within the star_part list of the SimSpin file.

Of course, because these stars are not evolved hydrodynamically throughout the course of the simulation, these stellar particles will not contain age, metallicity, or birth mass information. For this reason, we give the user the choice of specifying the star formation history of the bulge and disk stars within the code (i.e. via the bulge_age, bulge_Z, disk_age, and disk_Z input parameters). Currently, this will allocate a single age/metallicity value for all bulge stars and all disk stars respectfully. It would be trivial to modify this to assign a more physically motivated range for each population. The age and metallicity information is then used to assign spectra to these particles as described for hydrodynamical systems in Section 2.1.2.

The type of the input simulation is recorded within the metadata of the file, but otherwise should result in a file that can be processed in an identical fashion to the hydrodynamical examples.

2.1.4. Alignment choice

By default, the input galaxy simulation will be aligned in this function such that the semi-major axis of an ellipsoid fit to the stellar component is oriented with the x-axis of the reference frame, and the minor axis of the fitted ellipsoid is oriented with the z-axis. This provides consistency for multiple observations made at a variety of inclination angles. However, in the case that a full cluster, galaxy group, or a particularly ‘clumpy’ galaxy with lots of substructure is requested for observation, this alignment will be strongly affected by this non-axisymmetric structure.

Hence, SimSpin gives the user the option to define a single location around which to centre the system (centre) and define a half-mass value in solar masses at which the shape of the galaxy will be measured (half_mass). If unspecified, the code will evaluate the alignment about the median stellar particle position with an iteratively fit ellipsoid that has grown to contain half the total stellar mass in the input file.

This alignment is done using the method described in the work of Bassett & Foster (Reference Bassett and Foster2019), which in turn is based on the work from Li et al. (Reference Li2018) and Allgood et al. (Reference Allgood2006). We first assume that the initial distribution of stellar particles is an ellipsoid with axis ratios $p = q$ (i.e. a sphere, where $p = b/a$ and $q = c/a$ , with a, b and c representing the axes lengths in decreasing size such that $a > b > c$ and $p > q$ , by necessity). This ellipsoid is grown from the median position of all stellar particles within the file (or from the position specified by centre) until it contains half the total stellar mass within the file (or the threshold mass described by the specified half_mass parameter input). Once this limit is reached, we use the stellar particles within the region to measure the reduced inertia tensor.

The reduced inertia tensor, I, is computed:

(6) \begin{equation} I_{i,j} = \sum_n{\frac{M_n x_{i,n} x_{j,n}}{r^2_n}},\end{equation}

where we perform this sum for n stellar particles within the ellipsoid with given positions, $x_n$ , weighted by individual stellar particle masses, $M_n$ , which may vary within the simulation and $r_n$ , the 3D radius of that particle from the centre as described by,

(7) \begin{equation}r_n = \sqrt{x_n^2 + y_n^2 / p^2 + z_n^2 / q^2}.\end{equation}

The eigenvalues and eigenvectors of this tensor, $I_{ij}$ give the orientation and distribution of matter within the ellipsoid. Specifically, p and q are given by the square-root of the ratios between the intermediate and largest eigenvalues (b and a) and the smallest and largest eigenvalues (c and a) respectively.

Table 2. A list of predefined parameters for each telescope() ‘type’ available in v2.6.0. A number of these parameters are variables that the user can further specify, which have been emphasised in bold below.

The ellipsoid is then deformed to match the distribution of stellar particles. The whole system is reoriented such that the major axis of the distribution identified is now aligned with the major axis of the ellipsoid. We then begin the procedure again, this time growing an ellipsoid with new a, b, and c reflecting the matter distribution of the stellar particles contained. This is repeated until the axis ratios p and q stabilise over ten iterations.

All particles within the input simulation file are aligned with the major axis, a, along the x-axis of the volume and the minor axis, c, aligned with the z-axis using this method. In the majority of cases, we find that this is suitable for finding the underlying shape of the galaxy in question and aligning the object within the frame. In a data set of 1835 galaxies taken from the IllustrisTNG50-1 simulation (Nelson et al. Reference Nelson2019; Pillepich et al. Reference Pillepich2019), a comparison between the alignment found by the mgefit.find_galaxy function (Cappellari Reference Cappellari2002) and SimSpin revealed that 92.3% (1693/1835) of the alignments agreed within ten degrees. Caution is advised when making mock observations of ellipticals or galaxies undergoing merger interactions, as a visual analysis of the farthest outliers found most fell under these categories.

The steps laid out in this subsection allow us to correctly re-orient the galaxy to the user specified inclination and twist projection at the stage of building the mock data cubes. In cases where the semi-major axis is not well defined, this can be adjusted for purpose with some experimentation of the alignment parameters, centre and half_mass.

Once this SimSpin file is created for one simulated object, it can be used many times for observations. This file contains all of the multi-dimensional information from the simulation file, with an additional set of tagged properties for SimSpin to construct each cube.

2.2.1. Telescope choice

telescope(

type="IFU”,

fov=15,

aperture_shape="circular”,

wave_range=c(3700,5700),

wave_centre, wave_res=1.04,

spatial_res=0.5,

filter="g”, lsf_fwhm=2.65,

signal_to_noise = NA

)

SimSpin has a number of predefined IFU telescopes, for which the required field-of-view, spectral and spatial resolutions have been taken from the available literature. In Table 2, we describe the values associated with these defaults and their appropriate references.

For a number of these choices, there are further selections that can be made. For example, the ‘MaNGA’ telescope has a variable field-of-view size that the user can select. If a specific telescope ‘type’ is not covered by the available options, the parameters can be fully specified by using the type = ‘IFU’. This requires the user to describe the remaining parameter options of the telescope, including the field-of-view size in arcseconds, the shape of the field-of-view, the wavelength range and central wavelength in Å, the wavelength resolution in Å, the spatial resolution in arcseconds, and the associated line spread function (LSF) of the instrument in Å. Two parameters can be further altered by the user when using the predefine telescope types: the filter, and the minimum level of signal-to-noise.

The available filters in SimSpin v2.6.0 include the SDSS u, g, r, i and z filters (Fukugita et al. Reference Fukugita1996; Doi et al. Reference Doi2010). Each of these data tables are stored as an rda file optimally compressed using xz compression such that they are lazy loaded with the package. The associated documentation gives the location from which these data have been collected. As with the predefined telescope types, the list of available filters may grow in time. Any updates will be listed on the live documentation website. These filters are then ready to be used in the build_datacube() function.

The signal-to-noise specified will be implemented in spectral and kinematic data cubes when a minimum signal-to-noise value is specified. Following the mathematical implementation of noise to cubes given in Nanni et al. (Reference Nanni2022) we similarly scale the level of Gaussian perturbation added to each spectrum based on the total flux measured within an integrated spectrum:

(8) \begin{equation} \frac{dF_i}{F_i} = \frac{\sqrt{\tilde{F}}}{S/N \times \sqrt{F_i}},\end{equation}

where $dF/F$ is the fractional perturbation of flux within a given spaxel i, $S/N$ is the requested parameter given in the telescope() function, and $\tilde{F}$ is the median pixel flux from the observation. At each spaxel, we draw a random number from a Gaussian distribution, scaled by this $dF/F$ , and add this perturbation as a function of wavelength to each spectrum. For kinematic cubes, this perturbation is applied to the observed fluxes alone.

With the telescope() elements defined, parameters can be precomputed. The number of spatial pixels, sbin, required to fill the diameter of the field-of-view (FOV) is computed and stored for gridding purposes. When combined with the coordinate information for a simulation at the build_datacube() stage, we can use the following simple equation to label each particle with a corresponding pixel in the FOV of the telescope. We bin the particle data along the x- and y-axes respectively ( $x_{\text{bin}}$ and $y_{\text{bin}}$ ) labelling each bin with an integer value from 1 to sbin and then combine these using,

(9) \begin{equation} \texttt{pixel_pos} = x_{\text{bin}} + (\texttt{sbin} \times y_{\text{bin}}) - \texttt{sbin},\end{equation}

such that every pixel within the FOV has a unique identifier which can be associated with each particle within the model at the build_datacube() stage.

Checks are also performed at this stage such that a user does not waste the time loading in a large simulation file only to have the code fail due to a filter mismatch. We ensure that the requested filter will overlap with the telescope wavelength range coverage and the centre of this wavelength range, if not provided, is computed as the centre of the given range. A further check is made for the variable parameters such as MaNGA field-of-view, that the requested value is one of the available bundle sizes (i.e. 12”, 17”, 22”, 27” or 32”). If not, the closest value larger than the requested parameter will be taken by default and a warning will be issued. Similarly, if a user asks for a MUSE cube with greater than 60” field-of-view, the value will be reduced to a value of 60”. Users will also be able to specify wide-field mode (WFM) in which spaxels are 0.2” or near-field mode (NFM) where spaxels are 0.025” for MUSE. If another value is suggested, the function will default to WFM (as this is the most computationally efficient due to the smaller number of spaxels per arcsecond) and issue a warning to the user that this has occurred.

Further default telescope types will be added in the future to keep up with ongoing developments. The live documentation will reflect any changes made.

2.2.2. Observation strategy choice

observing_strategy(

dist_z = 0.05,

inc_deg = 70,

twist_deg = 0,

pointing_kpc = c(0,0),

blur = T,

fwhm = 1,

psf = “Gaussian"

)

Another necessary ingredient for specifying a mock observation is the description of the conditions in which the model galaxy is observed. How far away is the object? How is it projected on the sky? How severe are the seeing conditions? These properties are specified using the observing_strategy() function.

It is expected that a user may wish to observe the same galaxy at a range of distances, inclinations, and seeing conditions, while the overall properties of the telescope() are more likely to remain fixed.Footnote d

To describe the distance to the observed galaxy model, the user may specify a redshift distance (dist_z), a physical luminosity distance in Mpc (dist_Mpc) or an angular scale distance in kpc per arcsecond (dist_kpc_per_arcsec). When any one of these parameters are specified, the other two are calculated through the S4 Distance class using the Hogg (Reference Hogg1999) methods implemented in the R-package celestial.Footnote e

The inclination and twist parameters define how the model is projected onto the sky. Following the make_simspin_file() function, the system is aligned such that the major axis of the ellipsoid (a) is aligned with the x-axis, while the minor axis (c) is aligned with the z-axis. With this knowledge, we can then use basic trigonometry to incline the ellipsoid to a requested inclination and twist.

The inclination of the object describes the level of rotation about the x-axis defined in degrees. We use the definition that inc_deg $= 0$ is a face on system, while inc_deg $= 90$ is edge-on. The following mathematics then gives us the coordinates at which the particles would be observed in the y- and z-axis frames.

(10) \begin{align} y^{obs}_i = - y_i \text{sin}\left(\frac{\pi}{180} \texttt{inc_deg}\right) + z_i \text{cos}\left(\frac{\pi}{180} \texttt{inc_deg}\right), \end{align}

(11) \begin{align} z^{obs}_i &= y_i \text{cos}\left(\frac{\pi}{180} \texttt{inc_deg}\right) + z_i \text{sin}\left(\frac{\pi}{180} \texttt{inc_deg}\right), \end{align}

where the $y^{obs}_i$ and $z^{obs}_i$ denote the observed y and z coordinates of particle i in the rotated frame, and $y_i$ and $z_i$ are the y and z coordinates in the original, fixed ellipsoid frame. The same projections are used for the velocities observed along the rotated y- and z-axis.

Similarly, the ‘twist’ of the object is described as the rotation about the z-axis of the ellipsoid, i.e. the azimuthal projected rotation on the sky, defined also in degrees. Here, twist_deg $= 0$ is an object viewed with the major axis, a, parallel to the $x-$ axis of the projection, while twist_deg $= 90$ would be the ellipsoid viewed from the side, such that a is now aligned with the y axis instead. This is computed using similar trigonometric projections as above,

(12) \begin{align} x^{obs}_i &= x_i \text{cos}\left(\frac{\pi}{180} \texttt{twist_deg}\right) - y_i \text{sin} \left(\frac{\pi}{180} \texttt{twist_deg}\right), \end{align}

(13) \begin{align} y^{obs}_i &= x_i \text{sin} \left(\frac{\pi}{180} \texttt{twist_deg}\right) + y_i \text{cos} \left(\frac{\pi}{180} \texttt{twist_deg}\right). \end{align}

where, as above, the $x^{obs}_i$ denotes the observed x coordinates of particle i in the rotated frame, and $x_i$ is the x coordinate in the original, fixed ellipsoid frame. The same equations are used to project the particle velocities.

These projections are performed in the order discussed, i.e. the galaxy ellipsoid is inclined on the sky using Equations (10)–(11) and then twisted using Equations (12)–(13), such that the object can be observed from any angle across the surface of a sphere. This is useful for exploring the effects of inclination and projection on the recovery of galaxy kinematics (Harborne et al. Reference Harborne, Power, Robotham, Cortese and Taranu2019).

The final specification of observing_strategy() describes the level of atmospheric seeing via the parameters psf and fwhm, describing the shape and full-width half-maximum (FWHM) size of the point-spread function (PSF) smoothing kernel respectively. We compute and store the kernel shape here, for each image plane of the observed cube to be convolved at a later stage. Currently, this PSF is not wavelength dependent, but the implementation of such a convolution kernel would be trivial in future iterations of the code.

Two options are currently available to the user, where the psf may be described by a ‘Gaussian’ kernel, or a ‘Moffat’ kernel (Moffat Reference Moffat1969) which has a Normal-like distribution at the centre with more extended wings. These are taken from the parameterisation in the R-package ProFit (Robotham et al. Reference Robotham, Taranu, Tobar, Moffett and Driver2017). A Gaussian kernel is parameterised:

(14) \begin{equation} I(R) = I_0 \; \text{exp}\left(- \frac{R^2}{2 \sigma^2}\right),\end{equation}

where,

(15) \begin{equation} \sigma = \frac{\texttt{FWHM}}{2 \sqrt{2\text{ln}(2)}}\end{equation}

and $I_0$ is the peak intensity at the centre and the FWHM is the value specified in the function. A Moffat kernel is parameterised:

(16) \begin{equation}I(R) = I_0 \left[ 1 + \left(\frac{R}{R_d}\right)^2 \right],\end{equation}

where,

(17) \begin{equation} R_d = \frac{\texttt{FWHM}}{2\sqrt{2^{1/c} - 1}}\end{equation}

and $c = 5$ , in line with the common defaults. We ensure that the kernel is normalised to 1 such that convolution with the kernel results in suitable flux conservation. These kernels are then stored for use in the blurring step later on.

Having specified the nature of the observation, these functions (telescope() and observing_strategy()) are combined to summarise the properties of the resulting observation. This is stored as metadata in the final data cube produced. Storing the data in this way ensures that the same file can be produced at a later time using the information stored in the output cube alone. With these parameters specified, we can now go about building our mock observation.

2.3.1. Spectral data cubes

If method = ‘spectral’, the build_datacube() function will return a data cube in which each spatial coordinate, $x-y$ , holds a spectral energy distribution in gridded wavelength bins along the z-axis. As particles have been allocated to individual pixels within the FOV, we can parallelise over each pixel and perform the mathematics at each pixel in turn, as demonstrated in Fig. 2.

Figure 2. Method for constructing spectral data cubes. For the set of particles associated with each spaxel position across the field-of-view, we take the spectrum associated with each stellar particle, weight it by the initial mass of that star particle and then shift the spectrum in wavelength space to reflect that particle’s line-of-sight velocity. Each spectrum in the pixel is then interpolated onto the wavelength range of the observing telescope and summed to give the overall spectrum at that spaxel position. The summed spectrum is finally convolved with the $\lambda_{\text{LSF}}$ of the observing telescope.

Each stellar particle has been assigned a spectrum using the template described within the make_simspin_file() function in Section 2.1. These spectra are at the resolution of the templates from which they have been drawn, e.g. with E-MILES templates, these spectra will have a wavelength resolution of $\Delta \lambda = 0.9$ Å and a spectral resolution of 2.51 Å. The template spectrum is weighted by the particle’s stellar initial mass to give the luminosity as a function of wavelength.

We shift the wavelength labels to $\lambda_{\text{obs-z}} = \lambda (1 + z)$ to account for the input redshift of the system. Within each pixel, we then further shift the wavelength labels according to the LOS velocity of each individual particle, $\lambda_{\text{obs}} = \lambda_{\text{obs-z}} \text{exp}(v_{\text{LOS}}/c)$ . At this stage we are still just modifying the raw spectral templates.

Once each template is both z-shifted and $v_{\text{LOS}}$ -shifted, we then interpolate these spectra onto the wavelengths observed by the requested telescope(). This is done using a spline function in which an exact cubic is fitted using the method described by Forsythe, Malcolm, & Moler (1977). Next, the individual particle spectra are summed column-wise to produce the observed spectrum at that pixel. This procedure is repeated for every pixel within the FOV and then the spaxels are combined into a volume to construct a 3D data cube, with spatial dimensions in the x- and y-axes and wavelength information in the z-axes.

If a PSF (i.e. atmospheric blurring) has been specified in the observing_strategy(), we then perform a spatial 2D convolution across each $x-y$ plane in the cube. The convolution kernel will have a shape and width as described by the observing_strategy() in Section 2.2.2:

(18) \begin{equation} F_{obs}(\lambda) = F(\lambda) \circledast PSF.\end{equation}

Following the spatial convolution, we also need to convolve the summed spectrum with a Gaussian kernel, with width $\Delta \sigma_{\text{LSF}}$ , mimicking the effects of the spectral resolution of the instrument, where $\Delta \sigma_{\text{LSF}}$ is the root-square of the difference between the telescope and the redshift-ed templates.

The template spectra associated with a single particle have an intrinsic spectral resolution, $\lambda_{\text{LSF}}^{template}$ . Of the templates included within this package, these resolutions range from 2.51–3 Å in the rest-frame. This spectral resolution represents a ‘minimum dispersion’ due to the instrument with which the template was observed or modelled. When the template spectrum is moved to greater redshift, the spectrum is stretched in wavelength space. When we wish to model a galaxy at redshift, z, the intrinsic spectral resolution of the templates must also be adjusted to this new redshift-ed spectrum. At higher redshift, the minimum dispersion we can detect with these templates becomes larger, as the wavelength space is broadened.

Hence, we must account for this when mimicking the effect of using our ‘mock’ telescope with its spectral resolution, $\lambda_{\text{LSF}}^{telescope}$ . The value of this resolution is fixed by the telescope and is assumed constant with redshift. However, the templates which we have redshift-ed to some distance, z, will now have some intrinsic spectral resolution, $\lambda_{\text{LSF@z}}^{template} = \lambda_{\text{LSF}}^{template} (1 + z)$ . To match the spectral resolution of the observing telescope then, we only need convolve our templates with a Gaussian the root-square of the difference between the telescope and the redshift-ed templates, i.e.

(19) \begin{equation}\Delta \lambda_{\text{LSF}} = \sqrt{\left(\lambda_{\text{LSF}}^{telescope}\right)^2 - \left(\lambda_{\text{LSF@z}}^{template}\right)^2}.\end{equation}

This is computed using the metadata information contained in the input SimSpin file. The user simply needs to specify the resolution of the observing telescope.

Finally, we add the level of noise requested to each spectrum, as described in the telescope() function. The inverse variance of this noise ( $1/noise^{2}$ ) is also returned to the user under the ‘variance_cube’ list element. If no noise is requested, this list element will be returned the user with NULL.

Figure 3. Method for constructing kinematic data cubes. At each pixel, the velocities of the contained particles are binned into velocity channels that map back to the underlying spectral resolution of the observing telescope. These LOSVD’s can be weighted by the underlying particle mass or luminosity depending on the settings selected at the build_datacube() stage.

The resulting ‘observed’ spectral cube is returned under the ‘spectral_cube’ list element. A summary of the run observation details are tabulated and returned under the list element ‘observation’. At each pixel, we also measure a number of particle properties, including the total number of particles in each location, the total particle flux, the mean and standard deviation LOS velocity, the mean stellar age and mean stellar metallicity. This information is stored as an image returned to user under the list element ‘raw_images’. All of these details can optionally be saved to a FITS file that contains each of these elements in subsequent HDU extensions for later processing with observational pipelines. Examples of this can be found at the documentation website.Footnote f

2.3.2. Kinematic data cubes

If method = ‘velocity’, the build_datacube() function will return a data cube in which each spatial coordinate, $x-y$ , holds a line-of-sight velocity distribution in gridded velocity bins along the z-axis. A visual representation of this process is outlined in Fig. 3.

Given the wavelength and spectral resolution of the underlying telescope, we can compute the effective velocity sampling rate of a given instrument as:

(20) \begin{equation} \Delta v = c \; \Delta \text{log}(\lambda),\end{equation}

were $\lambda$ is the wavelength resolution of the given instrument, $\Delta \text{log}(\lambda)$ represents the smallest wavelength gap in log space and c is the speed of light.

As in the previous methodology, we can use the gridded FOV to perform the required mathematics on a pixel-by-pixel basis. For each pixel, we take each contained stellar particle. Each stellar particle has been assigned a spectrum using the template described within the make_simspin_file() function in Section 2.1. This spectrum is multiplied by the initial mass of the stellar particle and re-gridded on the wavelength scale of a given telescope to give the luminosity at all wavelengths measured. From this spectrum, the luminosity of that particle can be computed. Each particle also has a mass, which can be used to weight the kinematics in place of the particle luminosity when mass_flag = T.

Each particle’s velocity is binned along the velocity axis dependent on the wavelength (and associated velocity) resolution as specified in Equation (20). This distribution is weighted either the particle’s luminosity in a given band (given by passing the observed spectrum through the specified band pass filter) or the mass of the particle. This leaves us with a line-of-sight velocity distribution (LOSVD), weighted by luminosity or mass, for each spatial pixel at the resolution of the respective telescope(). This process is repeated for every spatial pixel.

At each pixel, as in the spectral mode case, we also measure a number of the raw particle properties including the total number of particles, the mean and standard deviation of the population of particle velocities, the mean stellar age and mean stellar metallicity. These are returned to the user as 2D named arrays embedded within the list element, ‘raw_images’.

If an atmospheric blurring is specified, convolution of the kernel selected and described in Section 2.2.2 is performed across each spatial plane of the kinematic data cube following its construction, this time as a function of the velocity channels rather than wavelength channels:

(21) \begin{equation} F_{obs}(v) = F(v) \circledast PSF.\end{equation}

If requested, noise is added per spaxel as described in the telescope() function, applying $dF/F$ as a function of velocity, rather than wavelength. We save a volume of the added noise as an inverse variance velocity cube ( $1/noise^{2}$ ) and return this to the user under the list element ‘variance_cube’. The final, ‘observed’ 3D array structure, containing spatial planes of the data in the $x-y$ at subsequent velocity channels along the $z-$ axis, is returned to the user under the ‘velocity_cube’ list element.

From this kinematic data cube, we also compute a number of ‘observed_images’. At each pixel in the cube, we now have a LOSVD sampled at the same resolution as the wavelength resolution of the telescope. This distribution is fit with a Gauss-Hermite function of the form:

(22) \begin{equation} L(\omega, h_3, h_4) = \frac{1}{\sigma\sqrt{2\pi}} \; \text{exp}\left(-\frac{\omega^2}{2} \right) \left[ 1 + h_3 H_3 + h4 H_4 \right],\end{equation}

where,

(23) \begin{align} \omega &= \frac{v_i - V}{\sigma}, \end{align}

(24) \begin{align} H_3 &= \frac{1}{\sqrt{6}} \left( 2\sqrt{2} \omega^3 - 3\sqrt{2} \omega \right), \end{align}

(25) \begin{align} H_4 &= \frac{1}{\sqrt{24}}\left( 4 \omega^4 - 12 \omega^2 + 3 \right),\end{align}

where $v_i$ is the observed velocity channels, V and $\sigma$ are the first and second order moments of the LOSVD, $h_3$ and $h_4$ represent the expanded third and fourth moments of the Hermite polynomial (van der Marel & Franx Reference van der Marel and Franx1993; Cappellari Reference Cappellari2017). This fit is performed using the quasi-Newton method published simultaneously by Broyden, Fletcher, Goldfarb and Shanno in 1970 (known as BFGS) (Broyden Reference Broyden1970; Fletcher Reference Fletcher1970; Goldfarb Reference Goldfarb1970; Shanno Reference Shanno1970) using the optim minimisation provided in base R.

We compute the observed LOS velocity, dispersion and higher-order kinematics $h_3$ and $h_4$ on a pixel-by-pixel basis through this fit. If a PSF has been specified in the observing_strategy(), this fit is performed on the spatially blurred cubes and the resulting images will have this blurring effect incorporated (unlike the raw particle properties, which will be returned as a summary of the underlying simulation). Each parameter is stored as a 2D array and returned to the user under the list element ‘observed_images’. The residual of this fit to the LOSVD is also returned to give an understanding of how well these returned parameters describe the true underlying distribution. This is also output as a 2D array under the same list element as the observed images.

As in the spectral mode case, the returned observation can be written to a FITS file for later processing. Each of the arrays in the list elements are saved to subsequent HDU extensions with explanatory names so that the raw and observed images can be distinguished (e.g. OBS_VEL and RAW_VEL for the observed LOSVD and the raw particle mean velocity images respectively). These will be presented in a consistent format to the spectral FITS files, but with the velocity cube output under the DATA extension, with the necessary axes labels given the header information.

2.3.3. Gas data cubes

If method = ‘gas’ or ‘sf gas’, the build_datacube() function will follow the kinematic data cube methodology, but only for the gas component (or gas classed as star forming, in the later case) of the input model. As in Section 2.3.2, this results in a data cube containing the spatial information about the gas distribution along the x-y axes, with velocity information along the z-axis.

To distinguish between all gas and gas particles that are classed as star forming, we filter by the instantaneous star-formation rate. These properties are commonly reported against each gas particle within the model and allow us to filter gas that has met the threshold for star formation.

Beyond the focus on the gas component, rather than the stellar component, the process by which this cube is constructed is almost identical to above. The gas kinematics are weighted by the observed gas mass per pixel, rather than using a luminosity. This is equivalent to forcing mass_flag = T in the stellar kinematic cube construction. Each gas particle also has some intrinsic dispersion related to their thermal motions. We compute the thermal contribution to the dispersion of each particle as:

(26) \begin{equation} \sigma_{\text{thermal}}^2 = P / \rho = u (1 - \gamma),\end{equation}

where P is the gas pressure, $\rho$ is the gas density, u is the internal energy of the gas and $\gamma = 5/3$ is the adiabatic index. Of course, due to the effective equation of state employed by many cosmological simulations, this approximation for thermal motions is no longer valid once gas cools below the star forming threshold. At this stage, the temperature and internal energies become effective measures. In this regime, we assume a thermal value which reflects the sound speed of gas at the temperature floor in each hydrodynamical simulation (Pillepich et al. Reference Pillepich2019; Jiménez et al. 2023).

The mock observed kinematic images are constructed as above and we return the observed mass, velocity, dispersion, $h_3$ and $h_4$ images under the ‘observed_images’ However, a number of additional raw particle properties are also included in the gas output.

In addition to the raw gas mass per pixel, we record the mean mass-weighted instantaneous star formation rate, the mean gas metallicity, and the mean oxygen over hydrogen abundance ratio. The raw mass-weighted mean velocity and standard deviation are also returned in this ‘raw_images’ list under clearly named 2D arrays. A number of these images are shown for our example galaxy from the EAGLE simulation in Fig. 1 in the gas property maps on the right hand side.

In the future, we aim to incorporate the gas information at each pixel position within the spectral cube, through the addition of emission lines of appropriate ratio and kinematics. This is currently beyond the scope of the code, due to the necessity to incorporate other features of realism such as the attenuation and re-emission due to dust which is currently beyond the resolution limits of the majority of simulations. We direct the user to codes such as SKIRT (Camps & Baes Reference Camps and Baes2020) and the work of Barrientos Acevedo et al. (Reference Barrientos Acevedo2023) for the proper radiative transfer treatment through an assumed dust distribution.