Dawson–Gärtner theorem

In mathematics, the DawsonGärtner theorem is a result in large deviations theory. Heuristically speaking, the DawsonGärtner theorem allows one to transport a large deviation principle on a “smaller” topological space to a “larger” one.

Statement of the theorem

Let (Yj)jJ be a projective system of Hausdorff topological spaces with maps pij : Yj  Yi. Let X be the projective limit (also known as the inverse limit) of the system (Yj, pij)i,jJ, i.e.

Let (με)ε>0 be a family of probability measures on X. Assume that, for each j  J, the push-forward measures (pjμε)ε>0 on Yj satisfy the large deviation principle with good rate function Ij : Yj  R  {+∞}. Then the family (με)ε>0 satisfies the large deviation principle on X with good rate function I : X  R  {+∞} given by

References

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