Fixed-density profiles for the semi-induced 4-vertex star

Abstract

We study the fixed-density semi-inducibility profiles of the red-blue star S2,1, which has one distinguished center, two red edges and one blue edge. For an n-vertex graph G, let N(S2,1,G) be the number of injective labeled copies in which the two red edges of S2,1 are mapped to edges of G and its blue edge is mapped to a non-edge of G, that is, align* N(S2,1,G)= Σv∈ V(G) d(v)(d(v)-1)(n-1-d(v)). align* For every fixed red edge density β∈[0,1], we determine both extremal S2,1-densities. On the upper side, we prove the missing low-density range and, together with the theorem of Balogh, Lidický, Mubayi, Pfender and Volec for β 1/4, obtain the full four-branch profile predicted in their work. On the lower side, we show that the natural endpoint profile coming from the quasi-star and quasi-clique constructions is not universal; the correct minimum is given by a one-parameter three-class complement-split family. The proofs use a transfer argument with degree-square tie-breaking, reducing the extremal analysis to almost-regular, threshold and finite-staircase optimizations.