Spanning rigid subgraph packing and sparse subgraph covering

Abstract

Rigidity, arising in discrete geometry, is the property of a structure that does not flex. Laman provides a combinatorial characterization of rigid graphs in the Euclidean plane, and thus rigid graphs in the Euclidean plane have applications in graph theory. We discover a sufficient partition condition of packing spanning rigid subgraphs and spanning trees. As a corollary, we show that a simple graph G contains a packing of k spanning rigid subgraphs and l spanning trees if G is (4k+2l)-edge-connected, and G-Z is essentially (6k+2l - 2k|Z|)-edge-connected for every Z⊂ V(G). Thus every (4k+2l)-connected and essentially (6k+2l)-connected graph G contains a packing of k spanning rigid subgraphs and l spanning trees. Utilizing this, we show that every 6-connected and essentially 8-connected graph G contains a spanning tree T such that G-E(T) is 2-connected. These improve some previous results. Sparse subgraph covering problems are also studied.