Construction independent spanning trees on locally twisted cubes in parallel

Let LTQ_n be the n -dimensional locally twisted cube. Hsieh and Tu (Theor Comput Sci 410(8–10):926–932, 2009 ) proposed an algorithm to construct n edge-disjoint spanning trees rooted at a particular vertex 0 in LTQ_n . Later on, Lin et al. (Inf Process Lett 110(10):414–419, 2010 ) proved that Hsieh and Tu’s spanning trees are indeed independent spanning trees (ISTs for short), i.e., all spanning trees are rooted at the same vertex r and for any other vertex v( r) , the paths from v to r in any two trees are internally vertex-disjoint. Shortly afterwards, Liu et al. (Theor Comput Sci 412(22):2237–2252, 2011 ) pointed out that LTQ_n fails to be vertex-transitive for n⩾ 4 and proposed an algorithm for constructing n ISTs rooted at an arbitrary vertex in LTQ_n . Although this algorithm can simultaneously construct n ISTs, it is hard to be parallelized for the construction of each spanning tree. In this paper, from a modification of Hsieh and Tu’s algorithm, we present a fully parallelized scheme to construct n ISTs rooted at an arbitrary vertex in LTQ_n in 𝒪(n) time using 2^n vertices of LTQ_n as processors.