We present space-efficient algorithms for computing cut vertices in a given
graph with n vertices and m edges in linear time using O(n+min{m,nloglogn}) bits. With the same time and using O(n+m) bits, we can compute the
biconnected components of a graph. We use this result to show an algorithm for
the recognition of (maximal) outerplanar graphs in O(nloglogn) time using
O(n) bits