Extendability of Functions on Models of ZFFin

We consider the space of functions with bounded (k+1) th derivatives in a general domain in R n . Is every such function extendible to a function of the same class defined on the whole R n ? H. Whitney showed that the equivalence of the intrinsic ( =geodesic) metric in this domain to the Euclidean o

Symposium on Inform. Theory, Whistler, Canada,'' pp. 345) proved that every [n, k, d] O code with gcd(d, q)"1 and with all weights congruent to 0 or d (modulo q) is extendable to an O code with all weights congruent to 0 or d#1 (modulo q). We give another elementary geometrical proof of this theor

nearness preserving maps extension of (uniformly) continluou s maps J Every uniformly continuous function from a dense subspace of a unifom space into a complete uniform space has a u.ni:~ormly continuou,s extension. This well-known theorem ka:: no direct topological counterpart. The reason becomes

Necessary and sufficient conditions for the extendability of residual designs of Steiner systems S ( t , t + 1, v) are studied. In particular, it is shown that a residual design with respect to a single point is uniquely extendable, and the extendability of a residual design with respect to a pair o

A graph G is n-extendable if it is connected, contains a set of rr independent edges and every set of n-independent edges extends to (i.e. is a subset of) a perfect matching. Combining the results of this and previous papers we answer the question of 2-extendability for all the generalized Petersen