This thesis is concerned with embedding problems for spanning subgraphs of growing maximum degree into dense host graphs.
We generalise the well known Blow-up Lemma of Komlós, Sarközy, and Szemerédi by replacing the constant degree bound for the target graph with a bound on its arrangeability. Applications of the strengthened Blow-up Lemma include new embedding results for graphs of sublinear bandwidth and planar graphs. In addition, we determine the maximum size of a homogeneous set in typical graphs without an induced copy of
C5 or P4 respectively. Our proofs are based on the regularity method.
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This thesis is concerned with embedding problems for spanning subgraphs of growing maximum degree into dense host graphs.
We generalise the well known Blow-up Lemma of Komlós, Sarközy, and Szemerédi by replacing the constant degree bound for the target graph with a bound on its arrangeability. Applications of the strengthened Blow-up Lemma include new embedding results for graphs of sublinear bandwidth and planar graphs. In addition, we determine the maximum size of a homogeneous set in typical...
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