Table 03all
Mean \(r \times 10^3\) and \(\sigma(r) \times 10^3\) from sets of \(\simeq 500\) for model (04.03) for all frequency bands.
Decorrelation model \(A_L\) = 1 \(A_L\) = 0.3 \(A_L\) = 0.1 \(A_L\) = 0.03
Input \(r\) = 0
none0.872±2.726 0.754±1.004 0.639±0.515 0.534±0.340
linear-0.019±2.847-0.015±1.162-0.001±0.671-0.011±0.482
Input \(r\) = 0.003
none4.180±2.8173.871±1.1813.702±0.7033.593±0.527
linear3.309±2.8903.104±1.3273.049±0.8733.025±0.696
Table 03no
Mean \(r \times 10^3\) and \(\sigma(r) \times 10^3\) from sets of \(\simeq 500\) for model (04.03), with no 85 and no 145 GHz bands.
Decorrelation model \(A_L\) = 1 \(A_L\) = 0.3 \(A_L\) = 0.1 \(A_L\) = 0.03
Input \(r\) = 0
none0.855±2.857 0.772±1.145 0.654±0.649 0.555±0.466
linear-0.285±3.095-0.187±1.412-0.152±0.900-0.149±0.692
Input \(r\) = 0.003
none4.038±2.9423.807±1.2853.663±0.8023.570±0.634
linear2.888±3.1432.821±1.5752.824±1.0972.829±0.908
Table 03all
Shift on \(r \times 10^3\) from sets of \(\simeq 500\) for model ('04.03): "no 85, no 145" - "all frequencies".
Decorrelation model \(A_L\) = 1 \(A_L\) = 0.3 \(A_L\) = 0.1 \(A_L\) = 0.03
Input \(r\) = 0
none -0.017 0.018 0.015 0.021
linear-0.266-0.172-0.151-0.138
Input \(r\) = 0.003
none -0.142-0.064-0.039-0.023
linear-0.422-0.282-0.225-0.195