Isospectrality and galois projective geometries

Let \(G\) be a finite group and let \(k\) be a field. We say that a \(k G\)-module \(V\) has a quadratic geometry or is of quadratic type if there exists a non-degenerate (equivalently non-singular) \(G\)-invariant quadratic form on \(V\). If \(V\) is irreducible or projective indecomposable and \(k

We show that two surjective \*-adic Galois representations which are \*-adically close near the supersingular primes are equivalent up to a twist and a standard automorphism of GL n . In particular, two elliptic curves over a number field which are locally twist of each other in fact differ by a glo

We prove the following characterization theorem: If any three of the following four matroid invariants-the number of points, the number of lines, the coefficient of λ n-2 in the characteristic polynomial, and the number of three-element dependent sets-of a rank-n combinatorial geometry (or simple ma