Hamiltonian graph theory has been widely studied as one of the most important problems in graph theory. In this thesis, we work on generalizations of hamiltonian graph theory, and focus on the following topics: hamiltonian, pancyclicity, chorded pancyclic in the claw-free graphs, k-fan-connected graphs. For the pancyclicity problem, we show for k= 2, 3, if G= (V, E) is a k-connected graph of order n with V(G) =X₁⋃X₂⋃⋯⋃X_k, and for any pair of nonadjacent vertices x,y in Xᵢ with i= 1,2, ⋯,k, we have d(x) +d(y) ≥n, then G is pancyclic or G is a bipartite graph. For the hamiltonian problem of bipartite digraph, let D be a strongly connected balanced bipartite directed graph of order 2a≥10. Let x, y be distinct vertices in D, {x, y} dominates a...