Stabilizers of Classes of Representable Matroids

Let F be a field and let N be a matroid in a class N N of F-representable matroids that is closed under minors and the taking of duals. Then N is an F-stabilizer for N N if every representation of a 3-connected member of N N is determined up to elementary row operations and column scaling by a repre

An algebra is effective if its operations are computable under some numbering. When are two numberings of an effective partial algebra equivalent? For example, the computable real numbers form an effective field and two effective numberings of the field of computable reals are equivalent if the limi

We present a general way of defining various reduction games on ω which "represent" corresponding topologically defined classes of functions. In particular, we will show how to construct games for piecewise defined functions, for functions which are pointwise limit of certain sequences of functions

In the study of the irreducible representations of the unitary group U(n), one encounters a class of polynomials defined on n 2 indeterminates z ij , 1 i, j n, which may be arranged into an n\_n matrix array Z=(z ij ). These polynomials are indexed by double Gelfand patterns, or equivalently, by pai

For the variety of representations of a tame quiver, we describe a finite stratification into smooth subvarieties that are invariant under the group of base changes and that admit smooth rational geometric quotients. A stratum consists of all representations that differ only in the parameters of the