Let 
be an 
-vertex simple graph and consider a vertex labeling 
using the integers 1 to 
such that each vertex receives a distinct label and 
is the label of vertex 
. Then a vertex is a pinnacle of the labeled graph if 
for all neighbors
of 
, and the pinnacle set of the labeled graph is the set of all
the pinnacles, denoted 
(Bozeman et al. 2024).
Note that different labelings of a graph may have different pinnacle sets. In particular, the pinnacle sets of the graph 
are given by the distinct pinnacle sets over all possible
labelings 
.
For example, there are six distinct pinnacle sets (some of which are shared by multiple
distinct labelings) for the graph illustrated above, namely 
5
,
2, 5
, 
3,
5
, 
4, 5
,
2, 4, 5
, and 
3, 4, 5
.
For 
connected, 
has a size-
pinnacle set iff 
has an independent vertex
set of the same size (Bozeman et al. 2024).
For 
disconnected with 
connected components, the smallest pinnacle set of 
has size 
(Bozeman et al. 2024).
