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In the model of randomly perturbed graphs we consider the union of a deterministic graph G with minimum degree αn and the binomial random graph G(n, p). This model was introduced by Bohman, Frieze, and Martin and for Hamilton cycles their result bridges the gap between Dirac’s theorem and the results by Pósa and Korshunov on the threshold in G(n, p). In this note we extend this result in G ∪G(n, p) to sparser graphs with α = o(1). More precisely, for any ε > 0 and α: N ↦→ (0, 1) we show that a.a.s. G ∪ G(n, β/n) is Hamiltonian, where β = −(6 + ε) log(α). If α > 0 is a fixed constant this gives the aforementioned result by Bohman, Frieze, and Martin and if α = O(1/n) the random part G(n, p) is sufficient for a Hamilton cycle. We also discuss embeddings of bounded degree trees and other spanning structures in this model, which lead to interesting questions on almost spanning embeddings into G(n, p).
Embedding spanning structures into the random graph G(n,p) is a well-studied problem in random graph theory, but when one turns to the random r-uniform hypergraph H(r)(n,p) much less is known. In this thesis we will examine this topic from different perspectives, providing insights into various aspects of the theory of random graphs. Our results cover the determination of existence thresholds in two models, as well as an algorithmic approach. For the embeddings, we work with random and pseudorandom structures.
Together with Person we first notice that a general result of Riordan can be adapted from random graphs to hypergraphs and provide sufficient conditions for when H(r)(n,p) contains a given spanning structure asymptotically almost surely. As applications, we discuss several spanning structures such as cubes, lattices, spheres, and Hamilton cycles in hypergraphs.
Moreover, we study universality, i.e. when does an r-uniform hypergraph contain every hypergraph on n vertices with maximum vertex degree bounded by [delta]? For H(r)(n,p), it is shown with Person that this holds for p = w(ln n/n)1/[delta]) asymptotically almost surely by combining approaches taken by Dellamonica, Kohayakawa, Rödl, and Ruciński, of Ferber, Nenadov, and Peter, and of Kim and Lee.
Any hypergraph that is universal for the family of bounded degree r-uniform hypergraphs has to contain [omega](nr-r/[delta]) edges. With Hetterich and Person we exploit constructions of Alon and Capalbo to obtain universal r-uniform hypergraphs with the optimal number of edges O(nr-r/[delta]) when r is even, r | [delta], or [delta] = 2. Furthermore, we generalise the result of Alon and Asodi about optimal universal graphs for the family of graphs with at most m edges and no isolated vertices to hypergraphs.
In an r-uniform hypergraph on n vertices a tight Hamilton cycle consists of n edges such that there exists a cyclic ordering of the vertices where the edges correspond to consecutive segments of r vertices. In collaboration with Allen, Koch, and Person we provide a first deterministic polynomial time algorithm, which finds asymptotically almost surely tight Hamilton cycles in random r-uniform hypergraphs with edge probability at least C log3 n/n. This result partially answers a question of Nenadov and Skorić and of Dudek and Frieze who proved that tight Hamilton cycles exist already for p = w(1/n) for r = 3 and p [größer/gleich] (e + o(1))/n for r [größer/gleich] 4 using a second moment argument. Moreover our algorithm is superior to previous results of Allen, Böttcher, Kohayakawa, and Person and Nenadov and Skorić.
Lastly, we study the model of randomly perturbed dense graphs introduced by Bohman, Frieze and Martin, that is, the union of any n-vertex graph G[alpha] with minimum degree at least [alpha]n and G(n,p). For any fixed [alpha] > 0, and p = w(n-2/([delta]+1)), we show with Böttcher, Montgomery, and Person that G[alpha] UG(n,p) almost surely contains any single spanning graph with maximum degree [delta], where [delta] [größer/gleich] 5. As in previous results concerning this model, the bound used for p is lower by a log-term in comparison to the conjectured threshold for the general appearance of such subgraphs in G(n,p) alone. The new techniques we introduce also give simpler proofs of related results in the literature on trees and factors.