\begin{table*}[ht] \centering \caption{Fisher $1\sigma$ uncertainties on $H_0$ from GW memory. The column $N=100$ gives the direct Fisher constraint from a dedicated run restricted to $d_{L,\mathrm{near}}=100$\,events (marked $^\star$); it is only shown for those rows and is left blank for full-volume runs where such scaling would be misleading. $N_\mathrm{lo}$ and $N_\mathrm{hi}$ are the expected total detections over the full detectable volume at the low and high merger rate bounds (shown only for full-volume runs). Each cell shows mean\,$\pm$\,population scatter\,($\sigma_\mathrm{pop}$) with Monte Carlo error in parentheses.} \label{tab:sigma_H0_combined} \begin{tabular}{lrrrrrrccc} \toprule \multirow{2}{*}{Detector} & \multirow{2}{*}{$T_\mathrm{obs}$} & \multirow{2}{*}{$f_\mathrm{min}$} & \multirow{2}{*}{$N_\mathrm{samp}$} & \multirow{2}{*}{$M_\mathrm{min}$} & \multirow{2}{*}{$M_\mathrm{max}$} & \multirow{2}{*}{Approx.} & \multicolumn{3}{c}{$\sigma_{H_0}$ [km\,s$^{-1}$\,Mpc$^{-1}$]} \\ \cmidrule(lr){8-10} & [yr] & [Hz] & & [$M_\odot$] & [$M_\odot$] & & $N=100$ & $N_\mathrm{lo}$ & $N_\mathrm{hi}$ \\ \midrule \multicolumn{10}{l}{\textit{aLIGO/Virgo}} \\ & 8 & 5 & -- & -- & 100 & MWM & -- & 10.3 $\pm$ 2.2 (0.7) & 6.30 $\pm$ 1.34 (0.42) \\ & 4 & 5 & -- & -- & 100 & MWM & -- & 9.95 $\pm$ 2.14 (0.68) & 6.09 $\pm$ 1.31 (0.41) \\ & 16 & 5 & -- & -- & 100 & MWM & -- & 10.4 $\pm$ 2.2 (0.7) & 6.38 $\pm$ 1.37 (0.43) \\ & 8 & 20 & -- & -- & 100 & MWM & -- & 10.3 $\pm$ 2.2 (0.7) & 6.31 $\pm$ 1.34 (0.42) \\ & 8 & 40 & -- & -- & 100 & MWM & -- & 11.2 $\pm$ 2.9 (0.9) & 6.88 $\pm$ 1.75 (0.55) \\ & 8 & 60 & -- & -- & 100 & MWM & -- & 9.87 $\pm$ 1.27 (0.40) & 6.04 $\pm$ 0.78 (0.25) \\ & 8 & 5 & -- & -- & 80 & MWM & -- & 10.3 $\pm$ 2.2 (0.7) & 6.32 $\pm$ 1.35 (0.43) \\ & 8 & 5 & -- & -- & 100 & MWM$^\dagger$ & -- & 9.90 $\pm$ 1.84 (0.58) & 6.06 $\pm$ 1.12 (0.36) \\ & 8 & 5 & -- & -- & 100 & MWM & 35.3 $\pm$ 7.0 (2.2)$^\star$ & -- & -- \\ \midrule \multicolumn{10}{l}{\textit{ET}} \\ & 8 & 2 & -- & -- & 100 & MWM & -- & 1.04 $\pm$ 0.41 (0.13) & 0.602 $\pm$ 0.234 (0.074) \\ & 4 & 2 & -- & -- & 100 & MWM & -- & 0.923 $\pm$ 0.417 (0.132) & 0.533 $\pm$ 0.241 (0.076) \\ & 16 & 2 & -- & -- & 100 & MWM & -- & 1.12 $\pm$ 0.39 (0.12) & 0.646 $\pm$ 0.228 (0.072) \\ & 8 & 5 & -- & -- & 100 & MWM & -- & 1.05 $\pm$ 0.41 (0.13) & 0.608 $\pm$ 0.237 (0.075) \\ & 8 & 20 & -- & -- & 100 & MWM & -- & 1.00 $\pm$ 0.31 (0.10) & 0.578 $\pm$ 0.179 (0.056) \\ & 8 & 40 & -- & -- & 100 & MWM & -- & 0.925 $\pm$ 0.201 (0.064) & 0.534 $\pm$ 0.116 (0.037) \\ & 8 & 2 & -- & -- & 80 & MWM & -- & 1.03 $\pm$ 0.38 (0.12) & 0.594 $\pm$ 0.221 (0.070) \\ & 8 & 2 & -- & -- & 100 & MWM$^\dagger$ & -- & 1.01 $\pm$ 0.29 (0.09) & 0.582 $\pm$ 0.170 (0.054) \\ & 8 & 2 & -- & -- & 100 & MWM & 4.63 $\pm$ 0.96 (0.30)$^\star$ & -- & -- \\ \midrule \multicolumn{10}{l}{\textit{CE}} \\ & 8 & 2 & -- & -- & 100 & MWM & -- & 1.09 $\pm$ 0.46 (0.15) & 0.629 $\pm$ 0.266 (0.084) \\ & 4 & 2 & -- & -- & 100 & MWM & -- & 1.02 $\pm$ 0.40 (0.13) & 0.586 $\pm$ 0.234 (0.074) \\ & 16 & 2 & -- & -- & 100 & MWM & -- & 1.10 $\pm$ 0.46 (0.15) & 0.634 $\pm$ 0.265 (0.084) \\ & 8 & 5 & -- & -- & 100 & MWM & -- & 1.09 $\pm$ 0.46 (0.15) & 0.629 $\pm$ 0.266 (0.084) \\ & 8 & 20 & -- & -- & 100 & MWM & -- & 1.18 $\pm$ 0.59 (0.19) & 0.681 $\pm$ 0.339 (0.107) \\ & 8 & 40 & -- & -- & 100 & MWM & -- & 1.45 $\pm$ 0.58 (0.18) & 0.837 $\pm$ 0.333 (0.105) \\ & 8 & 2 & -- & -- & 80 & MWM & -- & 1.10 $\pm$ 0.46 (0.15) & 0.633 $\pm$ 0.265 (0.084) \\ & 8 & 2 & -- & -- & 100 & MWM$^\dagger$ & -- & 1.19 $\pm$ 0.55 (0.18) & 0.687 $\pm$ 0.320 (0.101) \\ & 8 & 2 & -- & -- & 100 & MWM & 1.54 $\pm$ 0.34 (0.11)$^\star$ & -- & -- \\ \midrule \multicolumn{10}{l}{\textit{ET+CE}} \\ & 8 & 2 & -- & -- & 100 & MWM & -- & 1.15 $\pm$ 0.54 (0.17) & 0.665 $\pm$ 0.310 (0.098) \\ & 4 & 2 & -- & -- & 100 & MWM & -- & 1.09 $\pm$ 0.57 (0.18) & 0.628 $\pm$ 0.328 (0.104) \\ & 16 & 2 & -- & -- & 100 & MWM & -- & 1.17 $\pm$ 0.55 (0.17) & 0.678 $\pm$ 0.315 (0.100) \\ & 8 & 5 & -- & -- & 100 & MWM & -- & 1.15 $\pm$ 0.54 (0.17) & 0.666 $\pm$ 0.310 (0.098) \\ & 8 & 20 & -- & -- & 100 & MWM & -- & 1.21 $\pm$ 0.70 (0.22) & 0.698 $\pm$ 0.406 (0.128) \\ & 8 & 40 & -- & -- & 100 & MWM & -- & 1.39 $\pm$ 0.50 (0.16) & 0.800 $\pm$ 0.288 (0.091) \\ & 8 & 2 & -- & -- & 80 & MWM & -- & 1.15 $\pm$ 0.54 (0.17) & 0.667 $\pm$ 0.310 (0.098) \\ & 8 & 2 & -- & -- & 100 & MWM$^\dagger$ & -- & 1.20 $\pm$ 0.50 (0.16) & 0.695 $\pm$ 0.288 (0.091) \\ & 8 & 2 & -- & -- & 100 & MWM & 1.46 $\pm$ 0.32 (0.10)$^\star$ & -- & -- \\ \midrule \multicolumn{10}{l}{\textit{LISA (light seeds)}} \\ & -- & -- & 16384 & 10000 & $10^{6}$ & MWM & -- & 234.7 $\pm$ 150.1 (47.5) & 74.2 $\pm$ 47.5 (15.0) \\ & -- & -- & 4096 & 10000 & $10^{6}$ & MWM & -- & 237.0 $\pm$ 150.7 (47.6) & 75.0 $\pm$ 47.6 (15.1) \\ & -- & -- & 8192 & 10000 & $10^{6}$ & MWM & -- & 232.7 $\pm$ 149.0 (47.1) & 73.6 $\pm$ 47.1 (14.9) \\ & -- & -- & 16384 & 10000 & $10^{6}$ & MWM$^\dagger$ & -- & 186.6 $\pm$ 122.2 (38.6) & 59.0 $\pm$ 38.6 (12.2) \\ \midrule \multicolumn{10}{l}{\textit{LISA (heavy seeds)}} \\ & -- & -- & 16384 & $10^{6}$ & $10^{8}$ & MWM & -- & 98.1 $\pm$ 52.9 (16.7) & 49.1 $\pm$ 26.4 (8.4) \\ & -- & -- & 4096 & $10^{6}$ & $10^{8}$ & MWM & -- & 30.7 $\pm$ 21.8 (6.9) & 15.3 $\pm$ 10.9 (3.4) \\ & -- & -- & 8192 & $10^{6}$ & $10^{8}$ & MWM & -- & 46.5 $\pm$ 25.8 (8.1) & 23.3 $\pm$ 12.9 (4.1) \\ & -- & -- & 16384 & $10^{6}$ & $10^{8}$ & MWM$^\dagger$ & -- & 94.6 $\pm$ 57.3 (18.1) & 47.3 $\pm$ 28.6 (9.1) \\ \bottomrule \multicolumn{10}{l}{\footnotesize $^\dagger$ MWM waveform with NRSur7dq2 prior bounds ($q\geq0.5$, $|\chi|\leq0.8$). $^\star$ Direct Fisher result for nearby-only population ($d_L \leq d_{L,\mathrm{near}}$); no $\sqrt{N}$ scaling applied.} \end{tabular} \end{table*}