arXiv:1305.2154v1 [math.CO] 9 May 2013 Page 1 arXiv:1305.2154v1 [math.CO] 9 May 2013
THE COMPLEXITY OF GENERALIZED DOMINO TILINGS IGOR PAK* AND JED YANG …

To reduce a graph problem to its planar version, a standard technique is to replace
crossings in a drawing of the input graph by planarizing gadgets. We show unconditionally …

We exhibit the following new upper bounds on the space complexity and the parallel
complexity of the Bipartite Perfect Matching (BPM) problem for graphs of small genus:(1) …

Abstract We present a Logspace Approximation Scheme (LSAS), ie an approximation
algorithm for maximum matching in planar graphs (not necessarily bipartite) that achieves …

We study (deterministic) isolation for certain structures in directed and undirected planar
graphs. The motivation for undertaking such a study comes from recent positive results on …

Perfect matchings in planar graphs have been extensively studied and understood in the
context of parallel complexity [PW Kastelyn, 1967; Vijay Vazirani, 1988; Meena Mahajan and …

Motivated by a recent result of Elberfeld, Jakoby and Tantau EJT10 showing that MSO
properties are Logspace computable on graphs of bounded treewidth, we consider the …

For finite polyomino regions, tileability by a pair of rectangles is NP-complete for all but trivial
cases yet can be solved in quadratic time for simply connected regions. Through a series of …

We initiate the study of space complexity of certain optimization problems restricted to planar
graphs. We provide upper bounds and hardness results in space complexity for some of …

In this paper, we show that given a weighted, directed planar graph $ G $, and any
$\epsilon> 0$, there exists a polynomial time and $ O (n^{\frac {1}{2}+\epsilon}) $ space …