Linear maps preserving the Lorentz spectrum: the $2 \times 2$ case

Abstract: In this paper, a complete description of the linear maps $\phi:W_{n}\rightarrow W_{n}$ that preserve the Lorentz spectrum is given when $n=2$, and $W_{n}$ is the space $M_{n}$ of $n\times n$ real matrices or the subspace $S_{n}$ of $M_{n}$ formed by the symmetric matrices. In both cases, it has been shown that $\phi(A)=PAP^{-1}$ for all $A\in W_{2}$, where $P$ is a matrix with a certain structure. It was also shown that such preservers do not change the nature of the Lorentz eigenvalues (that is, the fact that… Show more

“…For the most-significant partial results relevant to our discussions, we refer the reader to [9][10][11]. New contributions to the study of the linear preserver problem have been recently made by Mbekhta in [12], Alizadeh and Shakeri in [13], Bueno, Furtado, and Sivakumar in [14], Buenoa, Furtadob, Klausmeierc, and Veltrid in [15], and Bendaoud, Bourhim and Sarih in [16].…”

Linear Maps Preserving the Set of Semi-Weyl Operators

“…For the most-significant partial results relevant to our discussions, we refer the reader to [9][10][11]. New contributions to the study of the linear preserver problem have been recently made by Mbekhta in [12], Alizadeh and Shakeri in [13], Bueno, Furtado, and Sivakumar in [14], Buenoa, Furtadob, Klausmeierc, and Veltrid in [15], and Bendaoud, Bourhim and Sarih in [16].…”

Linear Maps Preserving the Set of Semi-Weyl Operators

Linear maps preserving the Lorentz spectrum of 3 × 3 matrices