Maximal Jordan algebras of matrices with bounded number of eigenvalues

For a classical algebraic group \(G\) of rank \(n\), irreducible rational representations \(\varphi\) the images of which contain matrices with at least one Jordan block of size at least \(\operatorname{dim} \varphi / n\) are determined provided that the characteristic of a ground field is not equal

Let G be a permutation group on a set Ω such that G has no fixed points in Ω. If, for a given positive integer m, the cardinalities |Γ g \Γ | is at most m for all g ∈ G and Γ ⊆ Ω, then G is said to have bounded movement m on Ω. When the maximum of |Γ g \Γ | over all g ∈ G and Γ ⊆ Ω is equal to m, we

## Abstract The number of independent vertex subsets is a graph parameter that is, apart from its purely mathematical importance, of interest in mathematical chemistry. In particular, the problem of maximizing or minimizing the number of independent vertex subsets within a given class of graphs has