A textit{linear $3$-graph}, $H = (V, E)$, is a set, $V$, of vertices together with a set, $E$, of $3$-element subsets of $V$, called edges, so that any two distinct edges intersect in at most one vertex. The linear Turan number, ${rm ex}(n,F)$, is the maximum number of edges in a linear $3$-graph $H$ with $n$ vertices containing no copy of $F$. We focus here on the textit{crown}, $C$, which consists of three pairwise disjoint edges (jewels) and a fourth edge (base) which intersects all of the jewels. Our main result is that every linear $3$-graph with minimum degree at least $4$ contains a crown. This is not true if $4$ is replaced by $3$. In fact the known bounds of the Turan number are [ 6 leftlfloor{frac{n - 3}{4}}rightrfloor leq {rm ex}(n, C) leq 2n, ] and in the construction providing the lower bound all but three vertices have degree $3$. We conjecture that ${rm ex}(n, C) sim frac{3n}{2}$ but even if this were known it would not imply our main result. Our second result is a step towards a possible proof of ${rm ex}(n,C) leq frac{3n}{2}$ (i.e., determining it within a constant error). We show that a minimal counterexample to this statement must contain certain configurations with $9$ edges and we conjecture that all of them lead to contradiction.
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