In mathematics, a bouquet graph ${\displaystyle B_{m}}$, for an integer parameter ${\displaystyle m}$, is an undirected graph with one vertex and ${\displaystyle m}$ edges, all of which are self-loops. It is the graph-theoretic analogue of the topological bouquet, a space of ${\displaystyle m}$ circles joined at a point. When the context of graph theory is clear, it can be called more simply a bouquet.^[1]

Although bouquets have a very simple structure as graphs, they are of some importance in topological graph theory because their graph embeddings can still be non-trivial. In particular, every cellularly embedded graph can be reduced to an embedded bouquet by a partial duality applied to the edges of any spanning tree of the graph,^[2] or alternatively by contracting the edges of any spanning tree.

In graph-theoretic approaches to group theory, every Cayley–Serre graph (a variant of Cayley graphs with doubled edges) can be represented as the covering graph of a bouquet.^[3]