# The fundamental solution of a class of ultra-hyperbolic operators on   Pseudo $H$-type groups

**Authors:** Wolfram Bauer, Andr\'e Froehly, Irina Markina

arXiv: 1901.08318 · 2019-01-25

## TL;DR

This paper derives fundamental solutions for a class of ultra-hyperbolic operators on pseudo H-type groups, revealing their existence, properties, and limitations depending on the group's signature.

## Contribution

It introduces explicit fundamental solutions for ultra-hyperbolic operators on pseudo H-type groups and analyzes their solvability and distributional properties.

## Key findings

- Explicit fundamental solutions for r=0, s>0 cases.
- No fundamental solutions in tempered distributions for r>0.
- Discussion on local solvability and Schwartz distribution solutions.

## Abstract

Pseudo $H$-type Lie groups $G_{r,s}$ of signature $(r,s)$ are defined via a module action of the Clifford algebra $C\ell_{r,s}$ on a vector space $V \cong \mathbb{R}^{2n}$. They form a subclass of all 2-step nilpotent Lie groups and based on their algebraic structure they can be equipped with a left-invariant pseudo-Riemannian metric. Let $\mathcal{N}_{r,s}$ denote the Lie algebra corresponding to $G_{r,s}$. A choice of left-invariant vector fields $[X_1, \ldots, X_{2n}]$ which generate a complement of the center of $\mathcal{N}_{r,s}$ gives rise to a second order operator \begin{equation*} \Delta_{r,s}:= \big{(}X_1^2+ \ldots + X_n^2\big{)}- \big{(}X_{n+1}^2+ \ldots + X_{2n}^2 \big{)}, \end{equation*} which we call ultra-hyperbolic. In terms of classical special functions we present families of fundamental solutions of $\Delta_{r,s}$ in the case $r=0$, $s>0$ and study their properties. In the case of $r>0$ we prove that $\Delta_{r,s}$ admits no fundamental solution in the space of tempered distributions. Finally we discuss the local solvability of $\Delta_{r,s}$ and the existence of a fundamental solution in the space of Schwartz distributions.

## Full text

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## References

26 references — full list in the complete paper: https://tomesphere.com/paper/1901.08318/full.md

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Source: https://tomesphere.com/paper/1901.08318