Subsets of a graph, maximal w.r.t. the property of inducing a subgraph with minimum degree at least $k$

Question

Let $G=(V,E)$ be a simple undirected graph. Define an mmd$k$s in $G$ (for 'maximal minimum degree $k$ subset') to be any subset $S$ of $V$ such that

1. the subgraph induced by $S$ in $G$ has minimum degree $\geq k$,
2. $S$ is $\subseteq$-maximal w.r.t. property 1.

Moreover, for any $k$, let $\mathrm{smmds}(G,k):=\sup\{ \lvert S \rvert \colon\text{$S$ is an mmd$k$s in $G$}\}$.

Moreover, for any class $\mathbb{G}$ of graphs, let $\mathrm{smmds}(\mathbb{G},k):=\sup\{ \mathrm{smmds}(G,k)\colon G\in\mathbb{G}\}$.

My question is whether

• mmd$k$s's
• the graph invariant $\mathrm{smmds}(\cdot,k)$,

have already been analysed and named in graph theory.

I am interested in understanding how $\mathrm{smmds}(\cdot,k)$, varies, as a function of $k$, for different families of graphs (or certain random graph models).

Answer 1

According to Wikipedia, a $k$-core of a graph $G$ is a maximal connected subgraph $K$ of $G$ such that every vertex of $K$ has degree at least $k$. Apart from the "connected" part of the definition, this is the same as your set $S_k$. Your set $S_k$ is the union of the vertex sets of all $k$-cores of $G$.

Similar to what Gerhard suggested, you can find the set $S_k$ by initialising $S_k:=V(G)$ and then repeatedly deleting every vertex of degree less than $k$ in the subgraph induced by $S_k$ until there are no such vertices left (note that this may terminate with $S_k=\emptyset$).

With regards to $k$-cores in random graphs, one natural place to start might be the paper Size and connectivity of the $k$-core of a random graph by Tomasz Łuczak.