Let Γn and Λn be the n-dimensional Fibonacci cube and Lucas cube, respectively. Denote by Γ[un,k,z] the subgraph of Γn induced by the end-vertex un,k,z that has no up-neighbor. In this paper, the number of end-vertices and domination number γ of Γn and Λn are studied. The formula of calculating the number of end-vertices is given and it is proved that γ(Γ[un,k,z])≤2k-1+1. Using these results, the larger bound on the domination number γ of Γn and Λn is determined
Let γ(n, δ) denote the largest possible domination number for a graph of order n and minimum degree ...
AbstractThe Fibonacci number ℱ(G) of a graph G with vertex set V(G), is the total number of independ...
For an integer-valued function f defined on the vertices of a graph G, the f-domination number gamma...
Let Γn and Λn be the n-dimensional Fibonacci cube and Lucas cube, respectively. The domination numbe...
AbstractLet Γn and Λn be the n-dimensional Fibonacci cube and Lucas cube, respectively. The dominati...
V delu obravnavamo problem dominantnega in celotnega dominantnega števila Fibonaccijevih in Lucasovi...
Fibonacci cubes are defined as subgraphs of hypercubes, where the vertices are those without two con...
Let G = (V(G), E(G)) be a path of order n ≥ 1. Let fm(G) be a path with m ≥ 0 independent dominating...
The Fibonacci cube Γn is the subgraph of the n-cube induced by the binary strings that contain no tw...
AbstractThe Fibonacci cube Γn is the subgraph of the hypercube induced by the binary strings that co...
AbstractThe Fibonacci cube Γn is the subgraph of the hypercube induced by the binary strings that co...
AbstractFor an integer-valued function ƒ defined on the vertices of a graph G, the ƒ-domination numb...
AbstractThe Fibonacci cube Γn is the subgraph of the n-cube induced by the binary strings that conta...
The Fibonacci number ℱ(G) of a graph G with vertex set V(G), is the total number of independent vert...
The cube polynomial of a graph is the counting polynomial for the number of induced k-dimensional hy...
Let γ(n, δ) denote the largest possible domination number for a graph of order n and minimum degree ...
AbstractThe Fibonacci number ℱ(G) of a graph G with vertex set V(G), is the total number of independ...
For an integer-valued function f defined on the vertices of a graph G, the f-domination number gamma...
Let Γn and Λn be the n-dimensional Fibonacci cube and Lucas cube, respectively. The domination numbe...
AbstractLet Γn and Λn be the n-dimensional Fibonacci cube and Lucas cube, respectively. The dominati...
V delu obravnavamo problem dominantnega in celotnega dominantnega števila Fibonaccijevih in Lucasovi...
Fibonacci cubes are defined as subgraphs of hypercubes, where the vertices are those without two con...
Let G = (V(G), E(G)) be a path of order n ≥ 1. Let fm(G) be a path with m ≥ 0 independent dominating...
The Fibonacci cube Γn is the subgraph of the n-cube induced by the binary strings that contain no tw...
AbstractThe Fibonacci cube Γn is the subgraph of the hypercube induced by the binary strings that co...
AbstractThe Fibonacci cube Γn is the subgraph of the hypercube induced by the binary strings that co...
AbstractFor an integer-valued function ƒ defined on the vertices of a graph G, the ƒ-domination numb...
AbstractThe Fibonacci cube Γn is the subgraph of the n-cube induced by the binary strings that conta...
The Fibonacci number ℱ(G) of a graph G with vertex set V(G), is the total number of independent vert...
The cube polynomial of a graph is the counting polynomial for the number of induced k-dimensional hy...
Let γ(n, δ) denote the largest possible domination number for a graph of order n and minimum degree ...
AbstractThe Fibonacci number ℱ(G) of a graph G with vertex set V(G), is the total number of independ...
For an integer-valued function f defined on the vertices of a graph G, the f-domination number gamma...