Optimal L$^1$-bounds for submartingales

Lutz Mattner; Uwe Rösler

Optimal L$^1$-bounds for submartingales

Probability 2009-04-16 v2 Classical Analysis and ODEs

Authors: Lutz Mattner , Uwe Rösler

Abstract

The optimal function $f$ satisfying $\mathbb{E} |\sum_{1}^n X_i | \ge f(\mathrbb{E}|X_1|,...,\mathbb{E}|X_n|)$ for every martingale $(X_1,X_1+X_2, ...,\sum_{i=1}^n X_i)$ is shown to be given by $f(a) = \max \Big\{a_k-\sum_{i=1}^{k-1} a_i\Big\}_{k=1}^n \cup \Big\{\frac {a_k}2\Big\}_{k=3}^n$ for $a\in{[0,\infty[}^n_{}$ . A similar result is obtained for submartingales $(0,X_1,X_1+X_2,..., \sum_{i=1}^n X_i)$ . The optimality proofs use a convex-analytic comparison lemma of independent interest.

Keywords

function spaces and inequalities multiplicative functions martingale theory

Cite

@article{arxiv.0809.3522,
  title  = {Optimal L$^1$-bounds for submartingales},
  author = {Lutz Mattner and Uwe Rösler},
  journal= {arXiv preprint arXiv:0809.3522},
  year   = {2009}
}

Comments

14 pages. Minor corrections and notational changes. Address of first-named author updated

Optimal L$^1$-bounds for submartingales

Abstract

Keywords

Cite

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