grandes-ecoles 2018 Q33

grandes-ecoles · France · centrale-maths1__mp Continuous Probability Distributions and Random Variables Probability Inequality and Tail Bound Proof

Deduce Talagrand's inequality: For every non-empty closed convex set $C$ of $E$ and for every strictly positive real number $t$
$$\mathbb{P}(X \in C) \cdot \mathbb{P}(d(X, C) \geqslant t) \leqslant \exp\left(-\frac{t^{2}}{8}\right)$$

Deduce Talagrand's inequality: For every non-empty closed convex set $C$ of $E$ and for every strictly positive real number $t$

$$\mathbb{P}(X \in C) \cdot \mathbb{P}(d(X, C) \geqslant t) \leqslant \exp\left(-\frac{t^{2}}{8}\right)$$

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