Large spaces of bounded rank matrices revisited

Abstract: Let n, p, r be positive integers with n ≥ p ≥ r. A rank-r subset of n by p matrices (with entries in a field) is a subset in which every matrix has rank less than or equal to r. A classical theorem of Flanders states that the dimension of a rank-r linear subspace must be less than or equal to nr, and it characterizes the spaces with the critical dimension nr. Linear subspaces with dimension close to the critical one were later studied by Atkinson, Lloyd and Beasley over fields with large cardinality; their res… Show more

“…Another result from [4] provides us with information on qOACs beyond those treated in Theorem 2.5. Below we state the result in our language.…”

Quasi optimal anticodes: structure and invariants

“…Another result from [4] provides us with information on qOACs beyond those treated in Theorem 2.5. Below we state the result in our language.…”

Quasi optimal anticodes: structure and invariants

Quasi optimal anticodes: structure and invariants

Affine spaces of symmetric or alternating matrices with bounded rank