A note on connectivity preserving splitting operation for matroids representable over GF(p)

Abstract

The splitting operation on a p-matroid does not necessarily preserve connectivity. It is observed that there exists a single element extension of the splitting matroid which is connected. In this paper, we define the element splitting operation on p-matroids which is a splitting operation followed by a single element extension. It is proved that element splitting operation on connected p-matroid yields a connected p-matroid. We give a sufficient condition to yield Eulerian p-matroids from Eulerian p-matroids under the element splitting operation. A sufficient condition to obtain hamiltonian p-matroid by applying element splitting operation on p-matroid is also provided.