A General Conditional Large Deviation Principle

Abstract

Given a sequence of Borel probability measures on a Hausdorff space which satisfy a large deviation principle, we consider the corresponding sequence of measures formed by conditioning on a set B. If the large deviation rate function I is good and effectively continuous and the conditioning set has the property that (1) B = B and (2) I(x) < ∞ for all x ∈ B, then the sequence of conditional measures satisfies a large deviation principle with the good, effectively continuous rate function IB, where IB(x) = I(x)-∈f I(B) if x∈B and IB(x) = ∞ otherwise.