Long paths and large cycles in finite graphs

## Abstract We obtain several sufficient conditions on the degrees of an oriented graph for the existence of long paths and cycles. As corollaries of our results we deduce that a regular tournament contains an edge‐disjoint Hamilton cycle and path, and that a regular bipartite tournament is hamilto

## Abstract Let __G__ be a graph of order __n__ and define __NC(G)__ = min{|__N__(__u__) ∪ __N__(__v__)| |__uv__ ∉ __E__(__G__)}. A cycle __C__ of __G__ is called a __dominating cycle__ or __D__‐__cycle__ if __V__(__G__) ‐ __V__(__C__) is an independent set. A __D__‐__path__ is defined analogously.

## Abstract For a graph __G, p__(__G__) denotes the order of a longest path in __G__ and __c__(__G__) the order of a longest cycle. We show that if __G__ is a connected graph __n__ ≥ 3 vertices such that __d__(__u__) + __d__(__v__) + __d__(__w__) ≧ n for all triples __u, v, w__ of independent verti

## Abstract Let __G__ be a simple graph of order __n__ and minimal degree > cn (0 < c < 1/2). We prove that (1) There exist __n__~0~ = __n__~0~(__c__) and __k__ = __k__(__c__) such that if __n__ > __n__~0~ and __G__ contains a cycle __C__~__t__~ for some __t__ > 2__k__, then __G__ contains a cycle

## Abstract A cycle __C__ in a graph __G__ is a __Hamilton cycle__ if __C__ contains every vertex of __G__. Similarly, a path __P__ in __G__ is a __Hamilton path__ if __P__ contains every vertex of __G__. We say that __G__ is __Hamilton__‐__connected__ if for any pair of vertices, __u__ and __v__ o