AbstractA necessary and sufficient condition in terms of a de Finetti style representation is given for a probability function in Polyadic Inductive Logic to satisfy being part of a Language Invariant family satisfying Spectrum Exchangeability. This theorem is then considered in relation to the unary Carnap and Nix–Paris Continua
After dominating the subject of Inductive Logic for over 50 years Carnap's Continuum of Inductive Me...
We present a novel proof of de Finetti’s Theorem characterizing permutation-invariant probability me...
We continue the investigation towards a logic-based approach to statistics within the infinitary con...
AbstractWe prove de Finetti style representation theorems covering the class of all probability func...
A sufficient condition is given for a probability function in Inductive Logic (with relations of all...
A sufficient condition is given for a probability function in Inductive Logic (with relations of all...
AbstractWe prove de Finetti style representation theorems covering the class of all probability func...
Spectrum Exchangeability, Sx, is an irrelevance principle of Pure Inductive Logic, and arguably the ...
We investigate the consequences of the principle of Spectrum Exchangeability m inductive logic over ...
AbstractWe investigate the notion of a signature in Polyadic Inductive Logic and study the probabili...
We show that the Permutation Invariance Principle can be equivalently stated to involve invariance u...
We investigate the notion of a signature in Polyadic Inductive Logic and study the probability funct...
In Pure Inductive Logic, the rational principle of Predicate Exchangeability states that permuting t...
We consider the problem of induction over languages containing binary relations and outline a way of...
We consider the problem of induction over languages containing binary relations and outline a way of...
After dominating the subject of Inductive Logic for over 50 years Carnap's Continuum of Inductive Me...
We present a novel proof of de Finetti’s Theorem characterizing permutation-invariant probability me...
We continue the investigation towards a logic-based approach to statistics within the infinitary con...
AbstractWe prove de Finetti style representation theorems covering the class of all probability func...
A sufficient condition is given for a probability function in Inductive Logic (with relations of all...
A sufficient condition is given for a probability function in Inductive Logic (with relations of all...
AbstractWe prove de Finetti style representation theorems covering the class of all probability func...
Spectrum Exchangeability, Sx, is an irrelevance principle of Pure Inductive Logic, and arguably the ...
We investigate the consequences of the principle of Spectrum Exchangeability m inductive logic over ...
AbstractWe investigate the notion of a signature in Polyadic Inductive Logic and study the probabili...
We show that the Permutation Invariance Principle can be equivalently stated to involve invariance u...
We investigate the notion of a signature in Polyadic Inductive Logic and study the probability funct...
In Pure Inductive Logic, the rational principle of Predicate Exchangeability states that permuting t...
We consider the problem of induction over languages containing binary relations and outline a way of...
We consider the problem of induction over languages containing binary relations and outline a way of...
After dominating the subject of Inductive Logic for over 50 years Carnap's Continuum of Inductive Me...
We present a novel proof of de Finetti’s Theorem characterizing permutation-invariant probability me...
We continue the investigation towards a logic-based approach to statistics within the infinitary con...
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