Large deviation inequalities for martingales in Banach spaces
Abstract: Let $(X_i, \mathcal{F}i){i\geq1}$ be a martingale difference sequence in a smooth Banach space. Let $S_n=\sum_{i=1}nX_i, n\geq 1,$ be the partial sums of $(X_i, \mathcal{F}i){i\geq 1}$. We give upper bounds on the quantity $\mathbb{P}\left(\max_{1\leq k\leq n}\lVert S_k\rVert>nx\right)$ in terms of $ n\geq 1$ and $x>0$ in two different situations: when the martingale differences have uniformly bounded exponential moments and when the decay of the tail of the increments is polynomial.
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