# A second moment bound for critical points of planar Gaussian fields in   shrinking height windows

**Authors:** Stephen Muirhead

arXiv: 1901.11336 · 2020-01-17

## TL;DR

This paper improves the second moment bounds for the number of critical points of planar Gaussian fields within shrinking height windows, extending previous results to more delicate regimes.

## Contribution

It provides an enhanced second moment bound for critical points in shrinking height windows, advancing the understanding of Gaussian field critical point statistics.

## Key findings

- Established an improved second moment bound for critical points in shrinking height windows.
- Extended previous bounds to more delicate regimes where the height window shrinks with domain size.
- Confirmed the optimality of bounds in non-shrinking cases.

## Abstract

We consider the number of critical points of a stationary planar Gaussian field, restricted to a large domain, whose heights lie in a certain interval. Asymptotics for the mean of this quantity are simple to establish via the Kac-Rice formula, and recently Estrade and Fournier proved a second moment bound that is optimal in the case that the height interval does not depend on the size of the domain. We establish an improved bound in the more delicate case of height windows that are shrinking with the size of the domain.

## Full text

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## References

16 references — full list in the complete paper: https://tomesphere.com/paper/1901.11336/full.md

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Source: https://tomesphere.com/paper/1901.11336