3.1 Power spectrum

We compute the thermal noise uncertainty for the experiments described in Table 1, for the 2D (cylindrical) power spectrum. The uv-plane resolution is defined by the field of view (FOV) of the telescope at a given frequency. We choose an experiment bandwidth of 10 MHz around three central frequencies: 50 MHz (z ~ 25), 150 MHz (z ~ 8.5), and 200 MHz (z ~ 6.1). This thermal noise estimate provides the reference level, below which, spectral features may be tolerated.

We compare the thermal noise and bias tolerance to the signal in the power spectrum due to calibration errors and residuals, using a statistical model of the point source population. The following approach is taken:

1. 1. Compute the signal available from the sky to perform calibration, using a statistical model of unresolved point sources, as observed by an interferometer with a frequency-dependent primary beam. This model serves two purposes: (a) as a reference signal of the power in the sky, and its statistical signature in power spectrum parameter space; (b) as the source population to which calibration is applied (i.e., the sky model), and from which residual signal stems after application of an incorrect calibration model.

2. 2. Compute the precision with which calibration is achievable with an ideal estimator for two calibration schemes, based on the statistical sky model, and propagate uncertainties into the power spectrum.

3. 3. Compute the residual signal (accuracy) from the sky model due to unfitted spectral structure in the calibration process, and propagate into the power spectrum.

3.2 Tomography

We compute the loss in dynamic range in an image cube due to residual phase gradients across the fine frequency channels. We compute the residual gradient in phase that may be tolerated such that an intrinsic 1 mK brightness temperature fluctuation in a 100-kHz spectral channel is detectable.

4.1 Signal due to calibration uncertainties and residual spectral structure

One possible calibration approach for EoR will be composed of a set of steps to model and remove sky signal, potentially including a direct subtraction of sources through a Global Sky Model (GSM). This step occurs after calibration of each station’s bandpass, and assumes accurate and precise calibration. There are two sources of residual spectral signal due to calibration: (1) In the case of bandpass calibration uncertainties, residual noise-like sky signal will remain in the data from fitting of the bandpass calibration parameters using the information available in the sky; (2) residual sky signal power and structure will remain from any spectral curvature terms that are not accounted for in the calibration model. Subtraction of the GSM will leave these residuals in the data due to incomplete and imprecise calibration of the complex station gain parameters.

The model and approach used for bandpass calibration will affect the calibration precision and the residual signal. Conceptually, there is a trade-off between precision and complexity of the model. For example, a polynomial fitted in amplitude and phase to each coarse channel of order N will yield a handful of parameters with precision dependent on the information available in the data obtained over the calibration timescale, and leave residual signal with spectral curvature of order > N. The parameter estimates are also likely to be correlated in frequency, thereby correlating the fine frequency channels. Conversely, each fine channel can be independently fitted, using a single amplitude and phase estimate. This would yield uncorrelated uncertainties between fine channels, but requires the fitting of more parameters, thereby reducing signal to noise.

In this work, we explore both precision and accuracy. We compute the signal introduced by imprecise bandpass calibration, leading to additional noise in the data. We then consider gain amplitude and phase residuals, whereby the calibration model is incorrect, and spectral structure remains. The former introduces additional signal due to noise-like fluctuations in the visibilities. The latter introduces the additional signal into the power spectrum due to residual signal from the sources in the sky. In all cases described, we are computing signal power that is additive to thermal noise and sky power in the power spectrum space.

We take two common calibration approaches—low-order polynomial fitting and individual fine-channel fitting—and compute the precision with which these parameters can be estimated and their correlations using the Cramer–Rao Bound (Kay Reference Kay1993). The parameters of importance are the complex-valued gains for each station (or, equivalently the amplitude and phase) over a solution interval in frequency. The uncertainties on these parameters, which may be correlated, are propagated back into the bandpass solution, and through to the power spectrum, to yield the calibration uncertainty power. Remaining spectral curvature is then propagated into the power spectrum to yield the residual spectral power. The former sets the noise floor for the calibration method, while the latter informs the spectral gradient tolerance for the bandpass solution by determining how much additional bias signal is introduced into the experiment.

In all cases, we are considering real sky signal that remains in the data, and yields signal in the power spectrum that is additive to the thermal noise power. We also do not specify an actual procedure for performing the calibration. Rather, the approach is valid for any general unbiased estimator, hence represents the best possible result that can be obtained using the proposed models.

4.2 Formalism

We use a statistical model of the instrument, which allows us to propagate spectral signal into the power spectrum parameter space. This model includes all instrumental spectral features, including a frequency-dependent primary beam, and instrumental layout (configuration). The covariance between frequency channels ν and ν′, at angular wavenumber u is given generically by Trott et al. (Reference Trott2016):

(1) $$\begin{eqnarray} &&\bm{C}_{\rm FG}(\nu ,\nu ^\prime ;u) \nonumber\\ &&\quad =\rho (\nu ;\nu ^\prime ;u) \int _0^\infty B(l;\nu )B(l;\nu ^\prime ) J_0\left({2\pi (ul)(\nu -\nu ^\prime )}\right) ldl \hspace{8.5359pt} {\rm Jy^2}.\nonumber\\ \end{eqnarray}$$

Here, B(l, m; ν) describes the frequency-dependent primary beam response to the sky at radial position l = |l|, ρ contains the frequency correlations at spatial wavemode u, and the Bessel function performs the Fourier Transform to wavenumber space at mode u (∝k _⊥). This expression is appropriate for a circularly-symmetric primary beam, and allows the propagation of any spectral function into the power spectrum. It is then propagated into the 2D power spectrum parameter space according to a Fourier transform:

(2) $$\begin{equation} \langle P_k(k_\bot ,\eta ) \rangle = \mathcal {F}^\dagger \bm{C}_{\rm FG} \mathcal {F}, \end{equation}$$

with relevant cosmological co-ordinate conversions at a given frequency (redshift) to convert the line-of-sight wavenumber, η (Hz⁻¹), to k _∥ (Mpc⁻¹), and the angular wavenumber u to k _⊥.

4.2.1 Reference signal power from the sky

To estimate the power due to astrophysical sources in the sky, we use a statistical model for extragalactic point sources, based on a parametric source counts function and a Poisson random position distribution across the sky. The model used, and the framework for it, are described in Trott et al. (Reference Trott2016) and Trott & Tingay (Reference Trott and Tingay2015). The number of sources of a given flux density in a unit area of sky is Poisson-distributed ( $\mathcal {P}()$ ):

(3) $$\begin{equation} N(S,S+{\rm d}S) {\rm d}S\,{\rm d}{\bf l} \sim \mathcal {P}(\langle {N}\rangle ), \end{equation}$$

where ⟨N⟩ is the expected number, given parametrically by

(4) $$\begin{equation} \langle {N(S,S+{\rm d}S)}\rangle (\nu ) = \frac{{\rm d}N}{{\rm d}S}(\nu )\,{\rm d}S\,{\rm d}{\bf l} \\ \end{equation}$$

(5) $$\begin{equation} = \alpha \left(\frac{\nu }{\nu _0} \right)^{\gamma } \left( \frac{S_{\rm Jy}}{S_0}\right)^{-\beta }\,{\rm d}S\,{\rm d}{\bf l}. \end{equation}$$

We use values of α = 4100Jy⁻¹sr⁻¹, β = 1.59 and γ = −0.8 at 150 MHz, in line with recent measurements (Intema et al. Reference Intema, van Weeren, Röttgering and Lal2011; Gervasi et al. Reference Gervasi, Tartari, Zannoni, Boella and Sironi2008). This Poisson statistical model is propagated into the power spectrum, using a full frequency–frequency covariance to describe the spectral correlations, and instrument sampling to produce the ‘wedge’ effect of foreground contamination.

The frequency–frequency covariance at angular wavenumber u = |x|c/ν₀, for a Gaussian-shaped primary beam of a station of diameter D is given by (Trott et al. Reference Trott2016)

(6) $$\begin{eqnarray} \bm{C}_{\rm FG}(\nu ,\nu ^\prime ) &=& \frac{\alpha }{3-\beta } \left( \frac{\nu }{\nu ^\prime } \right)^{-\gamma } \frac{S_{\rm max}^{3-\beta }}{S_0^{-\beta }} \frac{\pi {c^2}\epsilon ^2}{D^2}\frac{1}{\nu ^2 + \nu ^{\prime {2}}}\nonumber\\ && \exp {\left( \frac{-u^2c^2f(\nu )^2\epsilon ^2}{4(\nu ^2 + \nu ^{\prime {2}})D^2} \right)}, \end{eqnarray}$$

where ε = 0.42 converts an Airy disk to a Gaussian characteristic width, and f(ν) = (ν − ν′)/ν₀. This model describes the covariance for a full extragalactic point source population within the FOV of an SKA1-Low station. Equation (6), propagated according to equation (2), then contains the expected signal in the 2D parameter space due to sources within the FOV, for a perfectly calibrated instrument. For the SKA, we consider a 12-MHz bandwidth for each experiment (16 coarse channels), and an FOV associated with a 35-m station at each frequency. This yields a power spectrum parameter space (at 150 MHz) of k _∥ = [0.01, 1.60]h Mpc⁻¹, k _⊥ = [0.02, 2.07]h Mpc⁻¹.

The top-left panels of Figure 1–3 display the power due to unresolved point sources for the experiments described in Table 1 and a 2D, cylindrically averaged parameter space (k _⊥, k _∥). All unresolved sources with a flux density below 5 Jy remain in the data. This is to ensure the model is statistically consistent (i.e., brighter sources are rare and not accurately characterised by this statistical model). The unresolved point source model describes the total sky power as observed by the instrument, with a frequency-dependent primary beam. At its core is a frequency–frequency covariance matrix that describes all the frequency correlations of signal in the data. It is this covariance matrix that can be used to approximate spectral bandpass features, and their effects in the EoR power spectrum. The full reference point source model described above provides the complete signal due to sources in the sky without any signal subtraction.

Figure 1. 50 MHz: (Top-left) Reference unresolved point source model, propagated into the power spectrum; (top-centre) the calibration uncertainty power for a third-order polynomial fit; (top-right) residual unresolved point source power in the most pessimistic calibration model (scaled to the tolerance level); (bottom-left) the residual unresolved point source power due to residual fourth-order curvature (most optimistic model); (bottom-centre) the uncertainty power due to calibration of each fine channel independently; (bottom-right) thermal noise power.

Figure 2. 150 MHz: (Top-left) Reference unresolved point source model, propagated into the power spectrum; (top-centre) the calibration uncertainty power for a third-order polynomial fit; (top-right) residual unresolved point source power in the most pessimistic calibration model (scaled to the tolerance level); (bottom-left) the residual unresolved point source power due to residual fourth-order curvature (most optimistic model); (bottom-centre) the uncertainty power due to calibration of each fine channel independently; (bottom-right) thermal noise power.

Figure 3. 200 MHz: (Top-left) Reference unresolved point source model, propagated into the power spectrum; (top-centre) the calibration uncertainty power for a third-order polynomial fit; (top-right) residual unresolved point source power in the most pessimistic calibration model (scaled to the tolerance level); (bottom-left) the residual unresolved point source power due to residual fourth-order curvature (most optimistic model); (bottom-centre) the uncertainty power due to calibration of each fine channel independently; (bottom-right) thermal noise power.

4.3 Calibration uncertainty

Both calibration schemes (polynomial and fine-channel fitting) are expected to have temporally uncorrelated uncertainties between calibration cycles, yielding a factor of T _obs/T _cal = 1 000 h/600 s = 6 000 reduction in calibration uncertainty power over the full experiment. It is often implicitly assumed that individual stations will have uncorrelated errors, yielding a stochastic reduction by a factor equivalent to the uv-sampling over the 4-h nightly track (we term this the ‘optimistic’ case). These are taken into account in the modelling. In particular, the estimation of parameters for each station uses visibilities for the whole array, yielding a factor of (N _ant − 1)/2 improvement in power. In the case where short baselines are omitted from the calibration (to avoid large-scale structure biasing the procedure), fewer baselines are available and the improvement will be reduced. For SKA1-Low, there are many short baselines in the core, and within each of the superstations. Of the 158 000 baselines, > 4 000 are shorter than 50 wavelengths at 150 MHz, effectively reducing the improvement from measurements from a factor of (N _ant − 1)/2 ≃ 280 to ~ 270. This has, therefore, only a minor impact.

4.3.1 Polynomial fitting

One approach to bandpass calibration assumes that the bandpass may be fitted with a low-order polynomial function. This has the advantage of estimating only a handful of parameters over the bandwidth. In this work, we take a reasonable approach of fitting for each coarse channel independently, but using three contiguous coarse channels to perform the fit. The real and imaginary components are fitted as separate polynomials. We assume that a nth-order polynomial (n = 2, 3, 4) is fitted over these three coarse channels independently to each of the real and imaginary components of the visibilities, with N _fine = 168 fine channels of ν_fine = 4.578 kHz within a coarse band (Δν_coarse = 769.043 kHz). Each fit therefore uses 3 × 168 = 504 datapoints, with 600 s of data and the full sky power, and there are two fits (the information for which is contained in twice as many datapoints when counting the real and imaginary components of the complex visibilities). Figure 4 shows this calibration scheme. For the third-order polynomial, we fit four parameters, A, B, C, D, such that

Figure 4. Schematic figure showing a smooth fit over three contiguous coarse channels, where the fit is performed on a fine-channel basis. The fitting parameters derived from these three coarse channels are used to calibrate the central channel only. Each vertical bar denotes a single fine channel, and the red lines denote coarse channel band edges.

(7) $$\begin{equation} S_{r,i}(\nu ) = A(\nu -\nu _0)^3 + B(\nu -\nu _0)^2 + C(\nu -\nu _0) + D, \end{equation}$$

where r, i index real and imaginary, and ν₀ is defined as the centre of the coarse channel. The Fisher Information Matrix and the subsequent propagation of the correlated errors back into the signal, are independent of the actual values of A, B, C, and D (due to the fact that they are linear), thereby making this a general third-order model. The second- and fourth-order fits have one fewer or one more parameter. The amplitude, $\mathcal {A}$ , of the calibration solution is given, as usual, by

(8) $$\begin{equation} \mathcal {A}(\nu ) = \sqrt{S_r(\nu )^2 + S_i(\nu )^2}, \end{equation}$$

and the phase, Φ, by

(9) $$\begin{equation} \Phi (\nu ) = {\rm atan}\left(\frac{S_i}{S_r} \right). \end{equation}$$

4.4 Residual spectral power—amplitude residuals

The fitting of a low-order polynomial (order n) over three coarse channels leaves residual spectral signal of, at least, order n + 1 in each coarse channel. This residual signal is correlated across fine frequency channels, and hence generates residual power, with structure in the power spectrum parameter space. It is also subject to Runge’s Effect, which occurs when fitting polynomials to regularly discretized data (see Section 4.6).

For each coarse channel for each of the real and imaginary components, we assume there remains a residual signal with unity mean (relative bandpass):

(10) $$\begin{equation} S_{r,i,{\rm res}}(\nu ) = S_{\rm mn}\left(\frac{\nu -\nu _{c} - \xi _{r,i}}{\Delta \nu _{\rm coarse}}\right)^{n+1}, \end{equation}$$

where ν _c and Δν_coarse are the frequency offset and coarse channel bandwidth, respectively, and S _mn is a normalisation that sets the relative bandpass amplitude across the channel to equal unity. The offset ξ _{r, i} translates the real and imaginary component residuals with respect to each other, and is a feature of a dipole antenna where the real and imaginary components are frequency dependent. The mismatch occurs when combining voltages from antennas with slightly different characteristics (e.g., due to wind load or temperature), such that a sharp feature arises where there is a rapid change in the voltage response. This form allows a spectral feature in the bandpass amplitude at ν _c , with an associated phase gradient with characteristic width |ξ _r − ξ _i | (see Section 4.5). The residual signal, equation (10), is used to define the intra-channel correlation matrix, ρ(ν, ν′) (channels within each coarse channel are correlated, while inter-channel correlations are zero). This matrix is used, along with the sky point source signal model according to equation (1), to define the power in the 2D power spectrum due to the fractional residual signal in the bandpass.

We consider an optimistic and a pessimistic model to describe the temporal and inter-station correlation of residual spectral curvature:

• • Optimistic model: The most optimistic model for the residual signal is when each station’s bandpass shape is different, and varies on timescales smaller than the calibration timescale. This leads to uncorrelated errors between stations and over time, yielding a stochastic signal that reduces with time.

• • Pessimistic model: The pessimistic model assumes that the station bandpass spectral shapes are the same across all stations (as described by the model dipole bandpass), and vary slowly in time. This model assumes complete correlation of residual errors between all stations and over a full 4-h nightly track, thereby increasing the residual signal power by a factor of (N _ant × t _track/t _calibration) compared with the optimistic scenario.

In order to set the tolerance level, δ, for the n + 1-order polynomial residual, we scale the pessimistic model residual power until the amplitude of the thermal noise exceeds the residual across the full range of angular wavenumbers, k _⊥. This defines the maximum fractional bandpass error over a coarse channel.

4.5 Residual spectral power—phase residuals

Fitting of a nth-order polynomial to the real and imaginary components of the complex gain leaves at least (n+1)th-order residuals in both the components. For the third-order fit, the mismatch between the real and imaginary components yields a residual phase, according to

(11) $$\begin{equation} \phi (\nu ) = {\rm atan}{\frac{A_i}{A_r}\frac{(\nu -\nu _i-\xi /2)^4}{(\nu -\nu _r + \xi /2)^4}}, \end{equation}$$

where, ξ = ξ _r − ξ _i , and in the simplest case of equal amplitudes and turning points (A_r = A_i , ν _i = ν _r ), has the form:

(12) $$\begin{equation} \phi (\nu ) = {\rm atan}{\frac{(\nu -\nu _i-\xi /2)^4}{(\nu -\nu _i + \xi /2)^4}}. \end{equation}$$

Here, ξ is the frequency mismatch between the real and imaginary components. This form encapsulates the features of a dipole antenna where there is a frequency-dependent change in the real and imaginary components of the voltage response. Such features are observed in early testing of the SKALA antenna (de Lera Acedo et al. Reference de Lera Acedo, Razavi-Ghods, Troop, Drought and Faulkner2015).

Figure 5 (left) shows four representative phase plots as a function of frequency using equation (12), where the mismatch in frequency is equivalent to a single fine channel (ξ = 4.578 kHz; ‘Fine’), 24 fine channels (an EoR spectral channel; ξ = 109.87 kHz; ‘EoR’), one-half of a coarse channel (ξ = 384.6 kHz; ‘Half coarse’), and a single coarse channel (ξ = 769.10 kHz; ‘Coarse’). Each symbol denotes a single fine channel. The smaller the mismatch ξ, the steeper the phase feature. However, when the data are averaged to the EoR spectral resolution, mismatches finer than the channel resolution, 109.87 kHz, are smoothed.

Figure 5. (Left) Phase plots as a function of frequency using equation (12), where the mismatch in frequency is equivalent to a single fine channel (4.578 kHz; ‘Fine’), 24 fine channels (an EoR spectral channel; 109.87 kHz; ‘EoR’), one-half of a coarse channel (384.6 kHz; ‘Half coarse’), and a single coarse channel (769.10 kHz; ‘Coarse’). (Right) Ratio of power to a flat phase profile, $\frac{|P_\xi |}{P_{\rm flat}}$ , for a single value of k _⊥, and four values of the frequency mismatch, ξ.

We average each fine channel to the EoR spectral resolution, before forming the frequency–frequency correlation matrix, and propagating into the power spectrum. The errors are computed for a single coarse channel, with the remainder of the band showing no phase residuals. This therefore corresponds to the best-case scenario.

In phase, the correlation matrix contains complex phase terms that imprint phase structure. Figure 5 (right) plots the ratio of power for each value of ξ, compared with a flat profile (zero phase), $\frac{|P_\xi |}{P_{\rm flat}}$ , for a chosen cut through the 2D parameter space. The different phase structure imprints features at harmonics of the coarse bandpass, convolved with the spectral shape of the phase error. The phase errors bias the cosmological signal by re-distributing power in LOS modes, but do not contribute power because the power spectrum natively destroys phase information, by squaring the complex visibilities.