Quaternion Weyl Transform and some uniqueness results.

In this article, we study the boundedness and several properties of the quaternion Wigner transform. Using the quaternion Wigner transform as a tool, we define the quaternion Weyl transform (QWT) and prove that the QWT is compact for a certain class of symbols in $L^{r}\left(\mathbb{R}^{4}, \mathbb{Q}\right)$ with $1 \leq r \leq 2.$ Moreover, it can not be extended as a bounded operator for symbols in $L^{r}\left(\mathbb{R}^{4},\mathbb{Q}\right)$ for $2

Keywords:

• Pure mathematics
• rank
• Mathematics
• Bounded operator
• support theorem
• Class (set theory)
• Quaternion
• Uniqueness
• wigner transform

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