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According to the paper Section II.C, the weights $A_{TP}$ and $A_{FP}$ in the scoring function are bounded to $0\leq A_{TP} \leq 1$ and $-1\leq A_{FP}\leq 0$, but to satisfy the following scoring function $$\sigma^A(y)=(A_{TP}-A_{FP})\dfrac{1}{1+e^{5y}}-1$$
to $\sigma^A(0)=0$ only allows for $A_{TP}=1$ and $A_{FP}=-1$
should $\sigma^A$ goes with another hyper-parameter $\alpha$ to meet the satisfaction as follows $$\sigma^A(y)=\alpha(A_{TP}-A_{FP})\dfrac{1}{1+e^{5y}}-1$$
and to control the reward gained by how early or late the anomaly detected, replace fixed scale 5 with another hyper-parameter $\beta$ as follows $$\sigma^A(y)=\alpha(A_{TP}-A_{FP})\dfrac{1}{1+e^{\beta y}}-1$$
The text was updated successfully, but these errors were encountered:
According to the paper Section II.C, the weights$A_{TP}$ and $A_{FP}$ in the scoring function are bounded to $0\leq A_{TP} \leq 1$ and $-1\leq A_{FP}\leq 0$ , but to satisfy the following scoring function
$$\sigma^A(y)=(A_{TP}-A_{FP})\dfrac{1}{1+e^{5y}}-1$$ $\sigma^A(0)=0$ only allows for $A_{TP}=1$ and $A_{FP}=-1$ $\sigma^A$ goes with another hyper-parameter $\alpha$ to meet the satisfaction as follows
$$\sigma^A(y)=\alpha(A_{TP}-A_{FP})\dfrac{1}{1+e^{5y}}-1$$ $\beta$ as follows
$$\sigma^A(y)=\alpha(A_{TP}-A_{FP})\dfrac{1}{1+e^{\beta y}}-1$$
to
should
and to control the reward gained by how early or late the anomaly detected, replace fixed scale 5 with another hyper-parameter
The text was updated successfully, but these errors were encountered: