A Cramér type theorem for weighted random variables.
A Large Deviation Principle (LDP) is proved for the family where the deterministic probability measure converges weakly to a probability measure and are -valued independent random variables whose distribution depends on and satisfies the following exponential moments condition: In this context, the identification of the rate function is non-trivial due to the absence of equidistribution. We rely on fine convex analysis to address this issue. Among the applications...
A Large Deviation Principle (LDP) is proved for the family where the deterministic probability measure
converges weakly to a
probability measure
Consider a non-centered matrix with a separable variance profile: Matrices and are non-negative deterministic diagonal, while matrix is deterministic, and is a random matrix with complex independent and identically distributed random variables, each with mean zero and variance one. Denote by the resolvent associated to , i.e. Given two sequences of deterministic vectors and with bounded Euclidean norms, we study the limiting behavior of the random bilinear form: as the dimensions...
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