Ore plus Tur\'{a}n
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Ore in 1961 determined the maximum number of edges in graphs not containing a Hamiltonian cycle, and Tur\'{a}n in 1941 found the maximum number of edges in graphs not containing a $K_{r+1}$. Motivated by the work of Adamus in 2009 and Ferrero and Lesniak in 2018 on the maximum number of edges in $r$-partite non-Hamiltonian graphs, we find the maximum number of edges in $K_{r+1}$-free non-Hamiltonian graphs. Then we extend this result from Hamiltonicity to traceability, chorded pancyclicity, Hamiltonian-connectedness, $k$-path Hamiltonicity, $k$-Hamiltonicity, $k$-Hamiltonian-connectedness, and $k$-connectedness. Finally we introduce a method for translating results on the maximum number of edges to results on the maximum number of $t$-cliques using the fact that colex Tur\'{a}n graphs are extremal, and thus determine the maximum number of $t$-cliques in each of these classes of graphs.
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