On positive automorphisms of algebras of operators on atomic Archimedean vector latticesCigler, Gregor (Avtor) Kandić, Marko (Avtor) vector latticesorder algebra automorphismsinner automorphismsatomorder continuous operatorsLet $X$ be an Archimedean vector lattice. We investigate subalgebras of ${\mathscr L}(X)$ consisting of regular operators that contain all rank-one operators of the form $a \otimes \varphi_b$, where $a$ and $b$ are atoms of $X$ and $\varphi_b$ denotes the coordinate functional associated with $b$. Our main result shows that every positive automorphism of such a subalgebra contained in ${\mathscr L}(c_{00}(\Lambda))$, is necessarily spatial, meaning that it is implemented by a transformation of the form $T \mapsto P D\, T\, D^{-1} P^{-1}$, where $P$ is a permutation operator and $D$ is a positive diagonal operator. We also use the Kakutani representation theorem to establish that every finite-dimensional vector subspace of $X$ is order closed.20262026-04-14 10:29:43Neznano28921UDK: 517.9ISSN pri članku: 1385-1292DOI: 10.1007/s11117-026-01190-yCOBISS_ID: 275059203sl