id	author	title	date	pages	extension	mime	words	sentences	flesch	summary	cache	txt
work_uhjckvwcjnbrvgafp2p32y34jq	Franz Dietrich	On Coherent Sets and the Transmission of Confirmation*	2005	17	.pdf	application/pdf	8211	825	72	usual, on the probability but on the confirmation of a coherent set and its members. if a coherence measure satisfies different confirmation transmission properties, then Coherence measures are defined relative to a given finitely additive Kolmogorov probability function P on the language. For any formulae E,H such that E confirms H, there exists a (non-trivial8) coherence threshold c = cE,H ∈ R such that, for any set S ∈ S containing H with coherence C(S) ≥ c, E confirms each member of S. Theorem 2 Olsson's coherence measure CO satisfies (CT) and (CTC), with coherence threshold in both cases given by cE,H = set S ∈ S of size n containing H with coherence C(S) ≥ c, E confirms each member where C is some coherence measure satisfying confirmation transmission (CT), then Theorem 3 Fitelson's and Olsson's coherence measures both satisfy (CT∗), with coherence measure C satisfying (CT∗) (for instance, Olsson's or Fitelson's but not	./cache/work_uhjckvwcjnbrvgafp2p32y34jq.pdf	./txt/work_uhjckvwcjnbrvgafp2p32y34jq.txt