Inductive Logic > Immediate Consequences of the Independent Evidence Conditions (Stanford Encyclopedia of Philosophy/Fall2006 Edition)

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Supplement to Inductive Logic

Immediate Consequences of the Independent Evidence Conditions

When neither independence condition holds, we at least have:

P[eⁿ | h_j·b·cⁿ] = P[e_n | h_j·b·cⁿ·eⁿ⁻¹] · P[eⁿ⁻¹ | h_j·b·cⁿ]

= …

=

n
Π
k=1 P[e_k | h_j·b·cⁿ·e^k−1]

When condition-independence holds we have:

P[eⁿ | h_j·b·cⁿ] = P[e_n | h_j·b·c_n·(cⁿ⁻¹·eⁿ⁻¹)] · P[eⁿ⁻¹ | h_j·b·c_n·cⁿ⁻¹]

= P[e_n | h_j·b·c_n·(cⁿ⁻¹·eⁿ⁻¹)] · P[eⁿ⁻¹ | h_j·b·cⁿ⁻¹]

= …

=

n
Π
k=1 P[e_k | h_j·b·c_k·(c^k−1·e^k−1)]

If we add result-independence to condition-independence, the occurrences of ‘(c^k−1·e^k−1)’ may be removed from the previous formula, giving:

P[eⁿ | h_j·b·cⁿ] = n
Π
k=1 P[e_k | h_j·b·c_k]

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