In mathematics — specifically, in large deviations theory — the tilted large deviation principle is a result that allows one to generate a new large deviation principle from an old one by exponential tilting, i.e. integration against an exponential functional. It can be seen as an alternative formulation of Varadhan's lemma.
Let X be a Polish space (i.e., a separable, completely metrizable topological space), and let (μ<sub>ε</sub>)<sub>ε>0</sub> be a family of probability measures on X that satisfies the large deviation principle with rate function I : X → [0, +∞]. Let F : X → R be a continuous function that is bounded from above. For each Borel set S ⊆ X, let
and define a new family of probability measures (ν<sub>ε</sub>)<sub>ε>0</sub> on X by
Then (ν<sub>ε</sub>)<sub>ε>0</sub> satisfies the large deviation principle on X with rate function I<sup>F</sup> : X → [0, +∞] given by