# A L\'evy-Ottaviani type inequality for the Bernoulli process on an   interval

**Authors:** Witold Bednorz, Rafa{\l} Martynek

arXiv: 1812.05985 · 2019-11-14

## TL;DR

This paper establishes a probabilistic inequality for Bernoulli processes on an interval, extending classical results and partially confirming a conjecture by Szatzschneider about domination constants.

## Contribution

The paper proves a Lévý-Ottaviani type inequality for Bernoulli processes on an interval, providing explicit constants and addressing a conjecture on domination.

## Key findings

- Established a domination inequality with explicit constants
- Extended classical inequalities to Bernoulli processes on an interval
- Partially confirmed Szatzschneider's conjecture

## Abstract

In this paper we prove a L\'evy-Ottaviani type of property for the Bernoulli process defined on an interval. Namely, we show that under certain conditions on functions $(a_i)_{i=1}^{n}$ and for independent Bernoulli random variables $(\varepsilon_i)_{i=1}^{n}$, $\mathbb{P}(\sup_{t\in [0,1]}\sum^n_{i=1}a_i(t)\varepsilon_i\geq c)$ is dominated by $C\mathbb{P}(\sum^n_{i=1}a_i(1)\varepsilon_i\geq1)$, where $c$ and $C$ are explicit numerical constants independent of $n$. The result is a partial answer to the conjecture of W. Szatzschneider that the domination holds with $c=1$ and $C=2$.

## Full text

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## References

8 references — full list in the complete paper: https://tomesphere.com/paper/1812.05985/full.md

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Source: https://tomesphere.com/paper/1812.05985