Circumference of Graphs with Bounded Degree

Karger, Motwani, and Ramkumar Algorithmica, 18 (1997), pp. 82--98] have shown that there is no constant approximation algorithm to find a longest cycle in a Hamiltonian graph, and they conjectured that this is the case even for graphs with bounded degree. On the other hand, Feder, Motwani, and Subi [SIAM J. Comput., 31 (2002), pp. 1596--1607] have shown that there is a polynomial time algorithm for finding a cycle of length $n^{\log_32}$ in a 3-connected cubic n-vertex graph. In this paper, we show that if G is a 3-connected n-vertex graph with maximum degree at most d, then one can find, in O(n3) time, a cycle in G of length at least $\Omega(n^{\log_b2})$, where $b=2(d-1)^2+1$.

[1]  W. T. Tutte Connectivity in graphs , 1966 .

[2]  David R. Karger,et al.  On approximating the longest path in a graph , 1997, Algorithmica.

[3]  Xingxing Yu,et al.  Long Cycles in 3-Connected Graphs , 2002, J. Comb. Theory, Ser. B.

[4]  Andreas Björklund,et al.  Finding a Path of Superlogarithmic Length , 2002, ICALP.

[5]  Bill Jackson,et al.  Longest cycles in 3-connected graphs of bounded maximum degree , 1992 .

[6]  Hansjoachim Walther,et al.  Shortness Exponents of Families of Graphs , 1973, J. Comb. Theory, Ser. A.

[7]  J. Moon,et al.  Simple paths on polyhedra. , 1963 .

[8]  Bill Jackson,et al.  Longest cycles in 3-connected planar graphs , 1992, J. Comb. Theory, Ser. B.

[9]  Norishige Chiba,et al.  The Hamiltonian Cycle Problem is Linear-Time Solvable for 4-Connected Planar Graphs , 1989, J. Algorithms.

[10]  Toshihide Ibaraki,et al.  A linear-time algorithm for finding a sparsek-connected spanning subgraph of ak-connected graph , 1992, Algorithmica.

[11]  Robert E. Tarjan,et al.  Dividing a Graph into Triconnected Components , 1973, SIAM J. Comput..

[12]  Xingxing Yu,et al.  Convex Programming and Circumference of 3-Connected Graphs of Low Genus , 1997, J. Comb. Theory, Ser. B.

[13]  Bill Jackson,et al.  Longest cycles in 3-connected cubic graphs , 1986, J. Comb. Theory, Ser. B.

[14]  Rajeev Motwani,et al.  Approximating the Longest Cycle Problem in Sparse Graphs , 2002, SIAM J. Comput..

[15]  Brendan D. McKay,et al.  The smallest non-hamiltonian 3-connected cubic planar graphs have 38 vertices , 1988, J. Comb. Theory, Ser. B.

[16]  W. T. Tutte A THEOREM ON PLANAR GRAPHS , 1956 .

[17]  H. Whitney A Theorem on Graphs , 1931 .

[18]  Sundar Vishwanathan,et al.  An approximation algorithm for finding a long path in Hamiltonian graphs , 2000, SODA '00.