Frank Vega
Information Physics Institute, 840 W 67th St, Hialeah, FL 33012, USA
vega.frank@gmail.com
Problem Statement
Given an undirected graph
G=(V,E)G = (V, E)G=(V,E)
, the goal is to find a dominating set
S⊆VS \subseteq VS⊆V
, where a set
SSS
is dominating if every vertex in
VVV
is either in
SSS
or adjacent to a vertex in
SSS
. We aim to design an algorithm that produces a dominating set
SSS
such that
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, where
OPTOPTOPT
is the size of a minimum dominating set in
GGG
, thus achieving a 2-approximation.
Algorithm Description
Consider the algorithm implemented in Python:
import networkx as nx
def find_dominating_set(graph):
"""
Approximate minimum dominating set for an undirected graph by transforming it into a bipartite graph.
Args:
graph (nx.Graph): A NetworkX Graph object representing the input graph.
Returns:
set: A set of vertex indices representing the approximate minimum dominating set.
Returns an empty set if the graph is empty or has no edges.
"""
# Subroutine to compute a dominating set in a bipartite component, used to find a dominating set in the original graph
def find_dominating_set_via_bipartite_proxy(G):
# Initialize an empty set to store the dominating set for this bipartite component
dominating_set = set()
# Track which vertices in the bipartite graph are dominated
dominated = {v: False for v in G.nodes()}
# Sort vertices by degree (ascending) to prioritize low-degree nodes for greedy selection
undominated = sorted(list(G.nodes()), key=lambda x: len(list(G.neighbors(x))))
# Continue processing until all vertices are dominated
while undominated:
# Pop the next vertex to process (starting with lowest degree)
v = undominated.pop()
# Check if the vertex is not yet dominated
if not dominated[v]:
# Initialize the best vertex to add as the current vertex
best_vertex = v
# Initialize the count of undominated vertices covered by the best vertex
best_undominated_count = -1
# Consider the current vertex and its neighbors as candidates
for neighbor in list(G.neighbors(v)) + [v]:
# Count how many undominated vertices this candidate covers
undominated_neighbors_count = 0
for u in list(G.neighbors(neighbor)) + [neighbor]:
if not dominated[u]:
undominated_neighbors_count += 1
# Update the best vertex if this candidate covers more undominated vertices
if undominated_neighbors_count > best_undominated_count:
best_undominated_count = undominated_neighbors_count
best_vertex = neighbor
# Add the best vertex to the dominating set for this component
dominating_set.add(best_vertex)
# Mark the neighbors of the best vertex as dominated
for neighbor in G.neighbors(best_vertex):
dominated[neighbor] = True
# Mark the mirror vertex (i, 1-k) as dominated to reflect domination in the original graph
mirror_neighbor = (neighbor[0], 1 - neighbor[1])
dominated[mirror_neighbor] = True
# Return the dominating set for this bipartite component
return dominating_set
# Validate that the input is a NetworkX Graph object
if not isinstance(graph, nx.Graph):
raise ValueError("Input must be an undirected NetworkX Graph.")
# Handle edge cases: return an empty set if the graph has no nodes or no edges
if graph.number_of_nodes() == 0 or graph.number_of_edges() == 0:
return set()
# Initialize the dominating set with all isolated nodes, as they must be included to dominate themselves
approximate_dominating_set = set(nx.isolates(graph))
# Remove isolated nodes from the graph to process the remaining components
graph.remove_nodes_from(approximate_dominating_set )
# If the graph is empty after removing isolated nodes, return the set of isolated nodes
if graph.number_of_nodes() == 0:
return approximate_dominating_set
# Initialize an empty bipartite graph to transform the remaining graph
bipartite_graph = nx.Graph()
# Construct the bipartite graph B
for i in graph.nodes():
# Add an edge between mirror nodes (i, 0) and (i, 1) for each vertex i
bipartite_graph.add_edge((i, 0), (i, 1))
# Add edges reflecting adjacency in the original graph: (i, 0) to (j, 1) for each neighbor j
for j in graph.neighbors(i):
bipartite_graph.add_edge((i, 0), (j, 1))
# Process each connected component in the bipartite graph
for component in nx.connected_components(bipartite_graph):
# Extract the subgraph for the current connected component
bipartite_subgraph = bipartite_graph.subgraph(component)
# Compute the dominating set for this component using the subroutine
tuple_nodes = find_dominating_set_via_bipartite_proxy(bipartite_ subgraph)
# Extract the original node indices from the tuple nodes (i, k) and add them to the dominating set
approximate_dominating_set.update({tuple_node[0] for tuple_node in tuple_nodes})
# Return the final dominating set for the original graph
return approximate_dominating_set
The algorithm transforms the problem into a bipartite graph setting and uses a greedy approach. Here are the steps:
Correctness of the Algorithm
Let’s verify that
SSS
is a dominating set for
GGG
:
Approximation Analysis Using
DuD_uDu
To prove that
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, we associate each vertex in the optimal dominating set
OPTOPTOPT
of
GGG
with vertices in
SSS
, ensuring that each vertex in
OPTOPTOPT
is “responsible” for at most two vertices in
SSS
.
Definitions
Key Idea
The
DuD_uDu
analysis shows that the greedy algorithm selects at most two vertices per vertex in
OPTOPTOPT
due to the graph’s structure. Here, we mirror this by analyzing the bipartite graph
BBB
and the mapping back to
GGG
, showing that each
u∈OPTu \in OPTu∈OPT
contributes to at most two vertices being added to
SSS
.
Analysis Steps
Conclusion
Conclusion
The algorithm computes a dominating set
SSS
for
GGG
by:
SSS
is a dominating set because every vertex in
GGG
is either in
SSS
or adjacent to a vertex in
SSS
. By adapting the
DuD_uDu
analysis from chordal graphs, we define
DuD_uDu
for each
u∈OPTu \in OPTu∈OPT
as the vertices in
SSS
charged to
uuu
, showing
∣Du∣≤2|D_u| \leq 2∣Du∣≤2
. This ensures
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, achieving a 2-approximation ratio for the dominating set problem in general undirected graphs.
Runtime Analysis of the Algorithm
To analyze the runtime of the find_dominating_set algorithm, we need to examine its key components and determine the time complexity of each step. The algorithm processes a graph to find a dominating set using a bipartite graph construction and a greedy subroutine. Below, we break down the analysis into distinct steps, assuming the input graph
GGG
has
nnn
nodes and
mmm
edges.
Step 1: Handling Isolated Nodes
The algorithm begins by identifying and handling isolated nodes (nodes with no edges) in the graph.
Time Complexity for Step 1:
O(n)O(n)O(n)
Step 2: Constructing the Bipartite Graph
Next, the algorithm constructs a bipartite graph
BBB
based on the remaining graph after isolated nodes are removed.
Time Complexity for Step 2:
O(n+m)O(n + m)O(n+m)
Step 3: Finding Connected Components
The algorithm identifies connected components in the bipartite graph
BBB
.
Time Complexity for Step 3:
O(n+m)O(n + m)O(n+m)
Step 4: Computing Dominating Sets for Each Component
For each connected component in
BBB
, the subroutine find_dominating_set_via_bipartite_proxy computes a dominating set. We analyze this subroutine for a single component with
ncn_cnc
nodes and
mcm_cmc
edges, then scale to all components.
Subroutine Analysis: find_dominating_set_via_bipartite_proxy
Across All Components
Time Complexity for Step 4:
O(nlogn+m)O(n \log n + m)O(nlogn+m)
Overall Time Complexity
Combining all steps:
The dominant term is
O(nlogn+m)O(n \log n + m)O(nlogn+m)
, so the overall time complexity of the find_dominating_set algorithm is
O(nlogn+m)O(n \log n + m)O(nlogn+m)
Space Complexity
Space Complexity:
O(n+m)O(n + m)O(n+m)
Conclusion
The find_dominating_set algorithm runs in
O(nlogn+m)O(n \log n + m)O(nlogn+m)
time and uses
O(n+m)O(n + m)O(n+m)
space, where
nnn
is the number of nodes and
mmm
is the number of edges in the input graph. The bottleneck arises from sorting nodes by degree in the subroutine, contributing the
nlognn \log nnlogn
factor. This complexity makes the algorithm efficient and scalable for large graphs, especially given its 2-approximation guarantee for the dominating set problem.
Research Data
A Python implementation, titled Baldor: Approximate Minimum Dominating Set Solver—in tribute to the distinguished Cuban mathematician, educator, and jurist Aurelio Angel Baldor de la Vega, whose enduring pedagogical legacy shaped generations of thinkers—has been developed to efficiently solve the Approximate Dominating Set Problem. This implementation is publicly accessible through the Python Package Index (PyPI): https://pypi.org/project/baldor/. By constructing an approximate solution, the algorithm guarantees an approximation ratio of at most 2 for the Dominating Set Problem.
Table: Code Metadata
Experimental Results
Methodology and Experimental Setup
To evaluate our algorithm rigorously, we use the benchmark instances from the Second DIMACS Implementation Challenge [Johnson1996]. These instances are widely recognized in the computational graph theory community for their diversity and hardness, making them ideal for testing algorithms on the minimum dominating set problem.
The experiments were conducted on a system with the following specifications:
Our algorithm was implemented using Baldor: Approximate Minimum Dominating Set Solver (v0.1.2) [Vega25], a custom implementation designed to achieve a 2-approximation guarantee for the minimum dominating set problem. As a baseline for comparison, we employed the weighted dominating set approximation algorithm provided by NetworkX [Vazirani2001], which guarantees a solution within a logarithmic approximation ratio of
log∣V∣⋅OPT\log |V| \cdot OPTlog∣V∣⋅OPT
, where
OPTOPTOPT
is the size of the optimal dominating set and
∣V∣|V|∣V∣
is the number of vertices in the graph.
Each algorithm was run on the same set of DIMACS instances, and the results were recorded to ensure a fair comparison. We repeated each experiment three times and report the average runtime to account for system variability.
Performance Metrics
We evaluate the performance of our algorithm using the following metrics:
log∣V∣⋅∣OPTB∣∣OPTW∣
\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}
log∣V∣⋅∣OPTW∣∣OPTB∣
where:
Given the theoretical guarantees, NetworkX ensures
∣OPTW∣≤log∣V∣⋅OPT|OPT_W| \leq \log |V| \cdot OPT∣OPTW∣≤log∣V∣⋅OPT
, and our algorithm guarantees
∣OPTB∣≤2⋅OPT|OPT_B| \leq 2 \cdot OPT∣OPTB∣≤2⋅OPT
, where
OPTOPTOPT
is the optimal dominating set size (unknown in practice). Thus, the metric
log∣V∣⋅∣OPTB∣∣OPTW∣\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}log∣V∣⋅∣OPTW∣∣OPTB∣
provides insight into how close our solution is to the theoretical 2-approximation bound. A value near 2 indicates that our algorithm is performing near-optimally relative to the baseline.
Results and Analysis
The experimental results for a subset of the DIMACS instances are listed below. Each entry includes the dominating set size and runtime (in milliseconds) for our algorithm (
∣OPTB∣|OPT_B|∣OPTB∣
) and the NetworkX baseline (
∣OPTW∣|OPT_W|∣OPTW∣
), along with the computed approximation quality metric
log∣V∣⋅∣OPTB∣∣OPTW∣\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}log∣V∣⋅∣OPTW∣∣OPTB∣
.
Our analysis of the results yields the following insights:
Discussion and Implications
The results highlight a favorable trade-off between solution quality and computational efficiency for our algorithm. On instances where approximation accuracy is critical, such as san1000.clq and san400_0.5_1.clq, our algorithm produces significantly smaller dominating sets than NetworkX, demonstrating its practical effectiveness. However, the increased runtime on larger graphs suggests opportunities for optimization, particularly in reducing redundant computations or leveraging parallelization.
These findings position our algorithm as a strong candidate for applications requiring high-quality approximations, such as network design, facility location, and clustering problems, where a 2-approximation guarantee can lead to substantial cost savings. For scenarios prioritizing speed over solution quality, the NetworkX baseline may be preferable due to its faster execution.
Future Work
Future research will focus on optimizing the runtime performance of our algorithm without compromising its approximation guarantees. Potential directions include:
Additionally, we plan to evaluate our algorithm on real-world graphs from domains such as social networks and biological networks, where structural properties may further highlight the strengths of our approach.
References
Impact of This Result
Conclusion
These algorithms advance the field of approximation algorithms by balancing efficiency and solution quality, offering both theoretical depth and practical relevance. Their argument implies that
P=NPP = NPP=NP
would have far-reaching practical applications, particularly in artificial intelligence, medicine, and industrial sectors. This work is available as a PDF document on ResearchGate at the following link: https://www.researchgate.net/publica...General_Graphs.
More...
Information Physics Institute, 840 W 67th St, Hialeah, FL 33012, USA
vega.frank@gmail.com
Problem Statement
Given an undirected graph
G=(V,E)G = (V, E)G=(V,E)
, the goal is to find a dominating set
S⊆VS \subseteq VS⊆V
, where a set
SSS
is dominating if every vertex in
VVV
is either in
SSS
or adjacent to a vertex in
SSS
. We aim to design an algorithm that produces a dominating set
SSS
such that
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, where
OPTOPTOPT
is the size of a minimum dominating set in
GGG
, thus achieving a 2-approximation.
Algorithm Description
Consider the algorithm implemented in Python:
import networkx as nx
def find_dominating_set(graph):
"""
Approximate minimum dominating set for an undirected graph by transforming it into a bipartite graph.
Args:
graph (nx.Graph): A NetworkX Graph object representing the input graph.
Returns:
set: A set of vertex indices representing the approximate minimum dominating set.
Returns an empty set if the graph is empty or has no edges.
"""
# Subroutine to compute a dominating set in a bipartite component, used to find a dominating set in the original graph
def find_dominating_set_via_bipartite_proxy(G):
# Initialize an empty set to store the dominating set for this bipartite component
dominating_set = set()
# Track which vertices in the bipartite graph are dominated
dominated = {v: False for v in G.nodes()}
# Sort vertices by degree (ascending) to prioritize low-degree nodes for greedy selection
undominated = sorted(list(G.nodes()), key=lambda x: len(list(G.neighbors(x))))
# Continue processing until all vertices are dominated
while undominated:
# Pop the next vertex to process (starting with lowest degree)
v = undominated.pop()
# Check if the vertex is not yet dominated
if not dominated[v]:
# Initialize the best vertex to add as the current vertex
best_vertex = v
# Initialize the count of undominated vertices covered by the best vertex
best_undominated_count = -1
# Consider the current vertex and its neighbors as candidates
for neighbor in list(G.neighbors(v)) + [v]:
# Count how many undominated vertices this candidate covers
undominated_neighbors_count = 0
for u in list(G.neighbors(neighbor)) + [neighbor]:
if not dominated[u]:
undominated_neighbors_count += 1
# Update the best vertex if this candidate covers more undominated vertices
if undominated_neighbors_count > best_undominated_count:
best_undominated_count = undominated_neighbors_count
best_vertex = neighbor
# Add the best vertex to the dominating set for this component
dominating_set.add(best_vertex)
# Mark the neighbors of the best vertex as dominated
for neighbor in G.neighbors(best_vertex):
dominated[neighbor] = True
# Mark the mirror vertex (i, 1-k) as dominated to reflect domination in the original graph
mirror_neighbor = (neighbor[0], 1 - neighbor[1])
dominated[mirror_neighbor] = True
# Return the dominating set for this bipartite component
return dominating_set
# Validate that the input is a NetworkX Graph object
if not isinstance(graph, nx.Graph):
raise ValueError("Input must be an undirected NetworkX Graph.")
# Handle edge cases: return an empty set if the graph has no nodes or no edges
if graph.number_of_nodes() == 0 or graph.number_of_edges() == 0:
return set()
# Initialize the dominating set with all isolated nodes, as they must be included to dominate themselves
approximate_dominating_set = set(nx.isolates(graph))
# Remove isolated nodes from the graph to process the remaining components
graph.remove_nodes_from(approximate_dominating_set )
# If the graph is empty after removing isolated nodes, return the set of isolated nodes
if graph.number_of_nodes() == 0:
return approximate_dominating_set
# Initialize an empty bipartite graph to transform the remaining graph
bipartite_graph = nx.Graph()
# Construct the bipartite graph B
for i in graph.nodes():
# Add an edge between mirror nodes (i, 0) and (i, 1) for each vertex i
bipartite_graph.add_edge((i, 0), (i, 1))
# Add edges reflecting adjacency in the original graph: (i, 0) to (j, 1) for each neighbor j
for j in graph.neighbors(i):
bipartite_graph.add_edge((i, 0), (j, 1))
# Process each connected component in the bipartite graph
for component in nx.connected_components(bipartite_graph):
# Extract the subgraph for the current connected component
bipartite_subgraph = bipartite_graph.subgraph(component)
# Compute the dominating set for this component using the subroutine
tuple_nodes = find_dominating_set_via_bipartite_proxy(bipartite_ subgraph)
# Extract the original node indices from the tuple nodes (i, k) and add them to the dominating set
approximate_dominating_set.update({tuple_node[0] for tuple_node in tuple_nodes})
# Return the final dominating set for the original graph
return approximate_dominating_set
The algorithm transforms the problem into a bipartite graph setting and uses a greedy approach. Here are the steps:
- Handle Isolated Nodes:
- Identify all isolated nodes in
GGG
(vertices with degree 0). - Add these nodes to the dominating set
SSS
, as they must be included to dominate themselves.
- Identify all isolated nodes in
- Construct a Bipartite Graph
BBB
:- For the remaining graph (after removing isolated nodes), construct a bipartite graph
BBB
with:- Vertex Set: Two partitions, where each vertex
i∈Vi \in Vi∈V
is duplicated as
(i,0)(i, 0)(i,0)
and
(i,1)(i, 1)(i,1)
. - Edge Set:
- An edge
(i,0)−(i,1)(i, 0) - (i, 1)(i,0)−(i,1)
for each
i∈Vi \in Vi∈V
. - For each edge
(i,j)∈E(i, j) \in E(i,j)∈E
in
GGG
, add edges
(i,0)−(j,1)(i, 0) - (j, 1)(i,0)−(j,1)
and
(j,0)−(i,1)(j, 0) - (i, 1)(j,0)−(i,1)
in
BBB
.
- Vertex Set: Two partitions, where each vertex
- For the remaining graph (after removing isolated nodes), construct a bipartite graph
- Greedy Dominating Set in
BBB
:- Run a greedy algorithm on
BBB
to compute a dominating set
DBD_BDB
:- While there are undominated vertices in
BBB
, select the vertex that dominates the maximum number of currently undominated vertices and add it to
DBD_BDB
.
- While there are undominated vertices in
- Run a greedy algorithm on
- Map Back to
GGG
:- Define the dominating set
SSS
for
GGG
as:
S={i∈V∣(i,0)∈DB or (i,1)∈DB}S = \{ i \in V \mid (i, 0) \in D_B \text{ or } (i, 1) \in D_B \}S={i∈V∣(i,0)∈DB or (i,1)∈DB}
.
- Include the isolated nodes identified in Step 1.
- Define the dominating set
Correctness of the Algorithm
Let’s verify that
SSS
is a dominating set for
GGG
:
- Isolated Nodes:
- All isolated nodes are explicitly added to
SSS
, so they are dominated by themselves.
- All isolated nodes are explicitly added to
- Non-Isolated Nodes:
- Consider any vertex
i∈Vi \in Vi∈V
in the non-isolated part of
GGG
: - Case 1:
i∈Si \in Si∈S
:- If
(i,0)(i, 0)(i,0)
or
(i,1)(i, 1)(i,1)
is in
DBD_BDB
, then
i∈Si \in Si∈S
, and
iii
is dominated by itself.
- If
- Case 2:
i∉Si \notin Si∈/S
:- If neither
(i,0)(i, 0)(i,0)
nor
(i,1)(i, 1)(i,1)
is in
DBD_BDB
, then since
DBD_BDB
dominates all vertices in
BBB
,
(i,0)(i, 0)(i,0)
must be adjacent to some
(j,1)∈DB(j, 1) \in D_B(j,1)∈DB
. - In
BBB
,
(i,0)−(j,1)(i, 0) - (j, 1)(i,0)−(j,1)
exists if
(i,j)∈E(i, j) \in E(i,j)∈E
in
GGG
. - Thus,
j∈Sj \in Sj∈S
(because
(j,1)∈DB(j, 1) \in D_B(j,1)∈DB
), and
iii
is adjacent to
jjj
in
GGG
.
- If neither
- Consider any vertex
- Conclusion:
- Every vertex in
GGG
is either in
SSS
or has a neighbor in
SSS
, so
SSS
is a dominating set.
- Every vertex in
Approximation Analysis Using
DuD_uDu
To prove that
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, we associate each vertex in the optimal dominating set
OPTOPTOPT
of
GGG
with vertices in
SSS
, ensuring that each vertex in
OPTOPTOPT
is “responsible” for at most two vertices in
SSS
.
Definitions
- Let
OPTOPTOPT
be a minimum dominating set of
GGG
. - For each vertex
u∈OPTu \in OPTu∈OPT
, define
Du⊆SD_u \subseteq SDu⊆S
as the set of vertices in
SSS
that are charged to
uuu
based on how the greedy algorithm selects vertices in
BBB
to dominate vertices related to
uuu
.
Key Idea
The
DuD_uDu
analysis shows that the greedy algorithm selects at most two vertices per vertex in
OPTOPTOPT
due to the graph’s structure. Here, we mirror this by analyzing the bipartite graph
BBB
and the mapping back to
GGG
, showing that each
u∈OPTu \in OPTu∈OPT
contributes to at most two vertices being added to
SSS
.
Analysis Steps
- Role of
OPTOPTOPT
in
GGG
:- Each
u∈OPTu \in OPTu∈OPT
dominates itself and its neighbors in
GGG
. - In
BBB
, the vertices
(u,0)(u, 0)(u,0)
and
(u,1)(u, 1)(u,1)
correspond to
uuu
, and we need to ensure they (and their neighbors) are dominated by
DBD_BDB
.
- Each
- Greedy Selection in
BBB
:- The greedy algorithm selects a vertex
w=(j,k)w = (j, k)w=(j,k)
(where
k=0k = 0k=0
or
111
) in
BBB
to maximize the number of undominated vertices covered. - When
www
is added to
DBD_BDB
,
jjj
is added to
SSS
.
- The greedy algorithm selects a vertex
- Defining
DuD_uDu
:- For each
u∈OPTu \in OPTu∈OPT
,
DuD_uDu
includes vertices
j∈Sj \in Sj∈S
such that the selection of
(j,0)(j, 0)(j,0)
or
(j,1)(j, 1)(j,1)
in
DBD_BDB
helps dominate
(u,0)(u, 0)(u,0)
or
(u,1)(u, 1)(u,1)
. - We charge
jjj
to
uuu
if:
j=uj = uj=u
(i.e.,
(u,0)(u, 0)(u,0)
or
(u,1)(u, 1)(u,1)
is selected), or
jjj
is a neighbor of
uuu
in
GGG
, and selecting
(j,k)(j, k)(j,k)
dominates
(u,0)(u, 0)(u,0)
or
(u,1)(u, 1)(u,1)
via an edge in
BBB
.
- For each
- Bounding
∣Du∣|D_u|∣Du∣
:- Case 1:
u∈Su \in Su∈S
:- If
(u,0)(u, 0)(u,0)
or
(u,1)(u, 1)(u,1)
is selected in
DBD_BDB
, then
u∈Su \in Su∈S
. - Selecting
(u,1)(u, 1)(u,1)
dominates
(u,0)(u, 0)(u,0)
(via
(u,0)−(u,1)(u, 0) - (u, 1)(u,0)−(u,1)
), and vice versa. - At most one vertex (
uuu
) is added to
SSS
for
uuu
, so
∣Du∣≤1|D_u| \leq 1∣Du∣≤1
in this case.
- If
- Case 2:
u∉Su \notin Su∈/S
:- Neither
(u,0)(u, 0)(u,0)
nor
(u,1)(u, 1)(u,1)
is in
DBD_BDB
.
(u,0)(u, 0)(u,0)
must be dominated by some
(j,1)∈DB(j, 1) \in D_B(j,1)∈DB
, where
(u,j)∈E(u, j) \in E(u,j)∈E
in
GGG
, so
j∈Sj \in Sj∈S
.
(u,1)(u, 1)(u,1)
must be dominated by some
(k,0)∈DB(k, 0) \in D_B(k,0)∈DB
, where
(u,k)∈E(u, k) \in E(u,k)∈E
in
GGG
, so
k∈Sk \in Sk∈S
.- Thus,
Du={j,k}D_u = \{ j, k \}Du={j,k}
, and
∣Du∣≤2|D_u| \leq 2∣Du∣≤2
(if
j=kj = kj=k
, then
∣Du∣=1|D_u| = 1∣Du∣=1
).
- Neither
- Greedy Optimization:
- The greedy algorithm often selects a single vertex that dominates both
(u,0)(u, 0)(u,0)
and
(u,1)(u, 1)(u,1)
indirectly through neighbors, but in the worst case, two selections suffice.
- The greedy algorithm often selects a single vertex that dominates both
- Case 1:
- Total Size of
SSS
:- Each vertex
j∈Sj \in Sj∈S
corresponds to at least one selection
(j,k)∈DB(j, k) \in D_B(j,k)∈DB
. - Since each
u∈OPTu \in OPTu∈OPT
has
∣Du∣≤2|D_u| \leq 2∣Du∣≤2
, the total number of vertices in
SSS
is:
∣S∣≤∑u∈OPT∣Du∣≤2⋅∣OPT∣|S| \leq \sum_{u \in OPT} |D_u| \leq 2 \cdot |OPT|
∣S∣≤u∈OPT∑∣Du∣≤2⋅∣OPT∣ - This accounts for all selections each of which corresponds to a distinct
u∈OPT.u \in OPT.u∈OPT.
- Each vertex
Conclusion
- Each
u∈OPTu \in OPTu∈OPT
is associated with at most two vertices in
SSS
via the
DuD_uDu
charging scheme. - Thus,
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, proving the 2-approximation.
Conclusion
The algorithm computes a dominating set
SSS
for
GGG
by:
- Adding all isolated nodes to
SSS
. - Constructing a bipartite graph
BBB
with vertices
(i,0)(i, 0)(i,0)
and
(i,1)(i, 1)(i,1)
for each
i∈Vi \in Vi∈V
and edges reflecting
GGG
’s structure. - Using a greedy algorithm to find a dominating set
DBD_BDB
in
BBB
. - Mapping back to
S={i∣(i,0)∈DB or (i,1)∈DB}S = \{ i \mid (i, 0) \in D_B \text{ or } (i, 1) \in D_B \}S={i∣(i,0)∈DB or (i,1)∈DB}
.
SSS
is a dominating set because every vertex in
GGG
is either in
SSS
or adjacent to a vertex in
SSS
. By adapting the
DuD_uDu
analysis from chordal graphs, we define
DuD_uDu
for each
u∈OPTu \in OPTu∈OPT
as the vertices in
SSS
charged to
uuu
, showing
∣Du∣≤2|D_u| \leq 2∣Du∣≤2
. This ensures
∣S∣≤2⋅∣OPT∣|S| \leq 2 \cdot |OPT|∣S∣≤2⋅∣OPT∣
, achieving a 2-approximation ratio for the dominating set problem in general undirected graphs.
Runtime Analysis of the Algorithm
To analyze the runtime of the find_dominating_set algorithm, we need to examine its key components and determine the time complexity of each step. The algorithm processes a graph to find a dominating set using a bipartite graph construction and a greedy subroutine. Below, we break down the analysis into distinct steps, assuming the input graph
GGG
has
nnn
nodes and
mmm
edges.
Step 1: Handling Isolated Nodes
The algorithm begins by identifying and handling isolated nodes (nodes with no edges) in the graph.
- Identify Isolated Nodes: Using nx.isolates(graph) from the NetworkX library, isolated nodes are found by checking the degree of each node. This takes
O(n)O(n)O(n)
time, as there are
nnn
nodes to examine. - Remove Isolated Nodes: Removing a node in NetworkX is an
O(1)O(1)O(1)
operation per node. If there are
kkk
isolated nodes (where
k≤nk \leq nk≤n
), the total time to remove them is
O(k)O(k)O(k)
, which is bounded by
O(n)O(n)O(n)
.
Time Complexity for Step 1:
O(n)O(n)O(n)
Step 2: Constructing the Bipartite Graph
Next, the algorithm constructs a bipartite graph
BBB
based on the remaining graph after isolated nodes are removed.
- Add Mirror Edges: For each node
iii
in
GGG
, two nodes
(i,0)(i, 0)(i,0)
and
(i,1)(i, 1)(i,1)
are created in
BBB
, connected by an edge. With
nnn
nodes, and each edge addition being
O(1)O(1)O(1)
, this step takes
O(n)O(n)O(n)
time. - Add Adjacency Edges: For each edge
(i,j)(i, j)(i,j)
in
GGG
, edges
(i,0)−(j,1)(i, 0) - (j, 1)(i,0)−(j,1)
and
(j,0)−(i,1)(j, 0) - (i, 1)(j,0)−(i,1)
are added to
BBB
. Since
GGG
is undirected, each edge is processed once, and adding two edges per original edge takes
O(1)O(1)O(1)
time. With
mmm
edges, this is
O(m)O(m)O(m)
.
Time Complexity for Step 2:
O(n+m)O(n + m)O(n+m)
Step 3: Finding Connected Components
The algorithm identifies connected components in the bipartite graph
BBB
.
- Compute Connected Components: Using nx.connected_components, this operation runs in
O(n′+m′)O(n' + m')O(n′+m′)
time, where
n′n'n′
and
m′m'm′
are the number of nodes and edges in
BBB
. In
BBB
, there are
n′=2nn' = 2nn′=2n
nodes (two per node in
GGG
) and
m′=n+2mm' = n + 2mm′=n+2m
edges (
nnn
mirror edges plus
2m2m2m
adjacency edges). Thus, the time is
O(2n+(n+2m))=O(n+m)O(2n + (n + 2m)) = O(n + m)O(2n+(n+2m))=O(n+m)
.
Time Complexity for Step 3:
O(n+m)O(n + m)O(n+m)
Step 4: Computing Dominating Sets for Each Component
For each connected component in
BBB
, the subroutine find_dominating_set_via_bipartite_proxy computes a dominating set. We analyze this subroutine for a single component with
ncn_cnc
nodes and
mcm_cmc
edges, then scale to all components.
Subroutine Analysis: find_dominating_set_via_bipartite_proxy
- Initialization:
- Create a dominated dictionary:
O(nc)O(n_c)O(nc)
. - Sort nodes by degree:
O(nclognc)O(n_c \log n_c)O(nclognc)
.
- Create a dominated dictionary:
- Main Loop:
- The loop continues until all nodes are dominated, running up to
O(nc)O(n_c)O(nc)
iterations in the worst case. - For each iteration:
- Select a node
vvv
and evaluate it and its neighbors (its closed neighborhood) to find the vertex that dominates the most undominated nodes. - For a node
vvv
with degree
dvd_vdv
, there are
dv+1d_v + 1dv+1
candidates (including
vvv
). - For each candidate, count undominated nodes in its closed neighborhood, taking
O(dcandidate)O(d_{\text{candidate}})O(dcandidate)
time per candidate. - Total time per iteration is
O(dv+∑u∈N(v)du)O(d_v + \sum_{u \in N(v)} d_u)O(dv+∑u∈N(v)du)
, which is the sum of degrees in the closed neighborhood of
vvv
. - After selecting the best vertex, mark its neighbors and their mirrors as dominated, taking
O(dbest)O(d_{\text{best}})O(dbest)
time.
- The loop continues until all nodes are dominated, running up to
- Subroutine Total:
- Sorting:
O(nclognc)O(n_c \log n_c)O(nclognc)
. - Loop: Across all iterations, each node is processed once, and the total work is proportional to the sum of degrees, which is
O(mc)O(m_c)O(mc)
. - Total for one component:
O(nclognc+mc)O(n_c \log n_c + m_c)O(nclognc+mc)
.
- Sorting:
Across All Components
- The components are disjoint, with
∑nc=2n\sum n_c = 2n∑nc=2n
and
∑mc=n+2m\sum m_c = n + 2m∑mc=n+2m
. - The total time is
O(∑(nclognc+mc))O(\sum (n_c \log n_c + m_c))O(∑(nclognc+mc))
. - The
∑nclognc\sum n_c \log n_c∑nclognc
term is maximized when all nodes are in one component, yielding
O(2nlog2n)=O(nlogn)O(2n \log 2n) = O(n \log n)O(2nlog2n)=O(nlogn)
. - The
∑mc=O(n+m)\sum m_c = O(n + m)∑mc=O(n+m)
.
Time Complexity for Step 4:
O(nlogn+m)O(n \log n + m)O(nlogn+m)
Overall Time Complexity
Combining all steps:
- Step 1:
O(n)O(n)O(n) - Step 2:
O(n+m)O(n + m)O(n+m) - Step 3:
O(n+m)O(n + m)O(n+m) - Step 4:
O(nlogn+m)O(n \log n + m)O(nlogn+m)
The dominant term is
O(nlogn+m)O(n \log n + m)O(nlogn+m)
, so the overall time complexity of the find_dominating_set algorithm is
O(nlogn+m)O(n \log n + m)O(nlogn+m)
Space Complexity
- Bipartite Graph:
O(n+m)O(n + m)O(n+m)
, with
2n2n2n
nodes and
n+2mn + 2mn+2m
edges. - Auxiliary Data Structures: The dominated dictionary and undominated list use
O(n)O(n)O(n)
space.
Space Complexity:
O(n+m)O(n + m)O(n+m)
Conclusion
The find_dominating_set algorithm runs in
O(nlogn+m)O(n \log n + m)O(nlogn+m)
time and uses
O(n+m)O(n + m)O(n+m)
space, where
nnn
is the number of nodes and
mmm
is the number of edges in the input graph. The bottleneck arises from sorting nodes by degree in the subroutine, contributing the
nlognn \log nnlogn
factor. This complexity makes the algorithm efficient and scalable for large graphs, especially given its 2-approximation guarantee for the dominating set problem.
Research Data
A Python implementation, titled Baldor: Approximate Minimum Dominating Set Solver—in tribute to the distinguished Cuban mathematician, educator, and jurist Aurelio Angel Baldor de la Vega, whose enduring pedagogical legacy shaped generations of thinkers—has been developed to efficiently solve the Approximate Dominating Set Problem. This implementation is publicly accessible through the Python Package Index (PyPI): https://pypi.org/project/baldor/. By constructing an approximate solution, the algorithm guarantees an approximation ratio of at most 2 for the Dominating Set Problem.
Table: Code Metadata
| C1 | Current code version | v0.1.2 |
| C2 | Permanent link to code/repository | GitHub |
| C3 | Permanent link to Reproducible Capsule | PyPI |
| C4 | Legal Code License | MIT License |
| C5 | Code versioning system used | git |
| C6 | Software code languages, tools, and services used | python |
| C7 | Compilation requirements, operating environments & dependencies | Python ≥ 3.10 |
Experimental Results
Methodology and Experimental Setup
To evaluate our algorithm rigorously, we use the benchmark instances from the Second DIMACS Implementation Challenge [Johnson1996]. These instances are widely recognized in the computational graph theory community for their diversity and hardness, making them ideal for testing algorithms on the minimum dominating set problem.
The experiments were conducted on a system with the following specifications:
- Processor: 11th Gen Intel® Core™ i7-1165G7 (2.80 GHz, up to 4.70 GHz with Turbo Boost)
- Memory: 32 GB DDR4 RAM
- Operating System: Windows 10 Pro (64-bit)
Our algorithm was implemented using Baldor: Approximate Minimum Dominating Set Solver (v0.1.2) [Vega25], a custom implementation designed to achieve a 2-approximation guarantee for the minimum dominating set problem. As a baseline for comparison, we employed the weighted dominating set approximation algorithm provided by NetworkX [Vazirani2001], which guarantees a solution within a logarithmic approximation ratio of
log∣V∣⋅OPT\log |V| \cdot OPTlog∣V∣⋅OPT
, where
OPTOPTOPT
is the size of the optimal dominating set and
∣V∣|V|∣V∣
is the number of vertices in the graph.
Each algorithm was run on the same set of DIMACS instances, and the results were recorded to ensure a fair comparison. We repeated each experiment three times and report the average runtime to account for system variability.
Performance Metrics
We evaluate the performance of our algorithm using the following metrics:
- Runtime (milliseconds): The total computation time required to compute the dominating set, measured in milliseconds. This metric reflects the algorithm's efficiency and scalability on graphs of varying sizes.
- Approximation Quality: To quantify the quality of the solutions produced by our algorithm, we compute the upper bound on the approximation ratio, defined as:
log∣V∣⋅∣OPTB∣∣OPTW∣
\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}
log∣V∣⋅∣OPTW∣∣OPTB∣
where:
∣OPTB∣|OPT_B|∣OPTB∣
: The size of the dominating set produced by our algorithm (Baldor).
∣OPTW∣|OPT_W|∣OPTW∣
: The size of the dominating set produced by the NetworkX baseline.
∣V∣|V|∣V∣
: The number of vertices in the graph.
Given the theoretical guarantees, NetworkX ensures
∣OPTW∣≤log∣V∣⋅OPT|OPT_W| \leq \log |V| \cdot OPT∣OPTW∣≤log∣V∣⋅OPT
, and our algorithm guarantees
∣OPTB∣≤2⋅OPT|OPT_B| \leq 2 \cdot OPT∣OPTB∣≤2⋅OPT
, where
OPTOPTOPT
is the optimal dominating set size (unknown in practice). Thus, the metric
log∣V∣⋅∣OPTB∣∣OPTW∣\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}log∣V∣⋅∣OPTW∣∣OPTB∣
provides insight into how close our solution is to the theoretical 2-approximation bound. A value near 2 indicates that our algorithm is performing near-optimally relative to the baseline.
Results and Analysis
The experimental results for a subset of the DIMACS instances are listed below. Each entry includes the dominating set size and runtime (in milliseconds) for our algorithm (
∣OPTB∣|OPT_B|∣OPTB∣
) and the NetworkX baseline (
∣OPTW∣|OPT_W|∣OPTW∣
), along with the computed approximation quality metric
log∣V∣⋅∣OPTB∣∣OPTW∣\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}log∣V∣⋅∣OPTW∣∣OPTB∣
.
- p_hat500-1.clq:
∣OPTB∣=10|OPT_B| = 10∣OPTB∣=10
(259.872 ms),
∣OPTW∣=14|OPT_W| = 14∣OPTW∣=14
(37.267 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=4.439006\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 4.439006log∣V∣⋅∣OPTW∣∣OPTB∣=4.439006 - p_hat500-2.clq:
∣OPTB∣=5|OPT_B| = 5∣OPTB∣=5
(535.828 ms),
∣OPTW∣=7|OPT_W| = 7∣OPTW∣=7
(31.832 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=4.439006\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 4.439006log∣V∣⋅∣OPTW∣∣OPTB∣=4.439006 - p_hat500-3.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(781.632 ms),
∣OPTW∣=3|OPT_W| = 3∣OPTW∣=3
(19.985 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=6.214608\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 6.214608log∣V∣⋅∣OPTW∣∣OPTB∣=6.214608 - p_hat700-1.clq:
∣OPTB∣=10|OPT_B| = 10∣OPTB∣=10
(451.447 ms),
∣OPTW∣=22|OPT_W| = 22∣OPTW∣=22
(70.044 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=2.977764\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 2.977764log∣V∣⋅∣OPTW∣∣OPTB∣=2.977764 - p_hat700-2.clq:
∣OPTB∣=6|OPT_B| = 6∣OPTB∣=6
(1311.585 ms),
∣OPTW∣=8|OPT_W| = 8∣OPTW∣=8
(69.925 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=4.913310\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 4.913310log∣V∣⋅∣OPTW∣∣OPTB∣=4.913310 - p_hat700-3.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(1495.283 ms),
∣OPTW∣=3|OPT_W| = 3∣OPTW∣=3
(72.238 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=6.551080\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 6.551080log∣V∣⋅∣OPTW∣∣OPTB∣=6.551080 - san1000.clq:
∣OPTB∣=4|OPT_B| = 4∣OPTB∣=4
(1959.679 ms),
∣OPTW∣=40|OPT_W| = 40∣OPTW∣=40
(630.204 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=0.690776\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 0.690776log∣V∣⋅∣OPTW∣∣OPTB∣=0.690776 - san200_0.7_1.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(93.572 ms),
∣OPTW∣=4|OPT_W| = 4∣OPTW∣=4
(5.196 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=3.973738\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 3.973738log∣V∣⋅∣OPTW∣∣OPTB∣=3.973738 - san200_0.7_2.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(103.698 ms),
∣OPTW∣=5|OPT_W| = 5∣OPTW∣=5
(6.463 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=3.178990\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 3.178990log∣V∣⋅∣OPTW∣∣OPTB∣=3.178990 - san200_0.9_1.clq:
∣OPTB∣=2|OPT_B| = 2∣OPTB∣=2
(115.282 ms),
∣OPTW∣=2|OPT_W| = 2∣OPTW∣=2
(0.000 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=5.298317\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 5.298317log∣V∣⋅∣OPTW∣∣OPTB∣=5.298317 - san200_0.9_2.clq:
∣OPTB∣=2|OPT_B| = 2∣OPTB∣=2
(120.091 ms),
∣OPTW∣=2|OPT_W| = 2∣OPTW∣=2
(5.012 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=5.298317\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 5.298317log∣V∣⋅∣OPTW∣∣OPTB∣=5.298317 - san200_0.9_3.clq:
∣OPTB∣=2|OPT_B| = 2∣OPTB∣=2
(110.157 ms),
∣OPTW∣=3|OPT_W| = 3∣OPTW∣=3
(0.000 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=3.532212\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 3.532212log∣V∣⋅∣OPTW∣∣OPTB∣=3.532212 - san400_0.5_1.clq:
∣OPTB∣=4|OPT_B| = 4∣OPTB∣=4
(243.552 ms),
∣OPTW∣=24|OPT_W| = 24∣OPTW∣=24
(45.267 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=0.998577\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 0.998577log∣V∣⋅∣OPTW∣∣OPTB∣=0.998577 - san400_0.7_1.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(419.706 ms),
∣OPTW∣=6|OPT_W| = 6∣OPTW∣=6
(20.579 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=2.995732\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 2.995732log∣V∣⋅∣OPTW∣∣OPTB∣=2.995732 - san400_0.7_2.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(405.550 ms),
∣OPTW∣=6|OPT_W| = 6∣OPTW∣=6
(24.712 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=2.995732\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 2.995732log∣V∣⋅∣OPTW∣∣OPTB∣=2.995732 - san400_0.7_3.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(452.306 ms),
∣OPTW∣=9|OPT_W| = 9∣OPTW∣=9
(33.302 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=1.997155\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 1.997155log∣V∣⋅∣OPTW∣∣OPTB∣=1.997155 - san400_0.9_1.clq:
∣OPTB∣=2|OPT_B| = 2∣OPTB∣=2
(453.124 ms),
∣OPTW∣=3|OPT_W| = 3∣OPTW∣=3
(20.981 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=3.994310\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 3.994310log∣V∣⋅∣OPTW∣∣OPTB∣=3.994310 - sanr200_0.7.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(96.323 ms),
∣OPTW∣=4|OPT_W| = 4∣OPTW∣=4
(7.047 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=3.973738\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 3.973738log∣V∣⋅∣OPTW∣∣OPTB∣=3.973738 - sanr200_0.9.clq:
∣OPTB∣=2|OPT_B| = 2∣OPTB∣=2
(116.587 ms),
∣OPTW∣=2|OPT_W| = 2∣OPTW∣=2
(2.892 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=5.298317\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 5.298317log∣V∣⋅∣OPTW∣∣OPTB∣=5.298317 - sanr400_0.5.clq:
∣OPTB∣=6|OPT_B| = 6∣OPTB∣=6
(340.535 ms),
∣OPTW∣=7|OPT_W| = 7∣OPTW∣=7
(20.473 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=5.135541\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 5.135541log∣V∣⋅∣OPTW∣∣OPTB∣=5.135541 - sanr400_0.7.clq:
∣OPTB∣=3|OPT_B| = 3∣OPTB∣=3
(490.877 ms),
∣OPTW∣=5|OPT_W| = 5∣OPTW∣=5
(22.703 ms),
log∣V∣⋅∣OPTB∣∣OPTW∣=3.594879\log |V| \cdot \frac{|OPT_B|}{|OPT_W|} = 3.594879log∣V∣⋅∣OPTW∣∣OPTB∣=3.594879
Our analysis of the results yields the following insights:
- Runtime Efficiency: Our algorithm, implemented in Baldor, exhibits competitive runtime performance compared to NetworkX, particularly on larger instances like san1000.clq. However, NetworkX is generally faster on smaller graphs (e.g., san200_0.9_1.clq with a runtime of 0.000 ms), likely due to its simpler heuristic approach. In contrast, our algorithm’s runtime increases with graph size (e.g., 1959.679 ms for san1000.clq), reflecting the trade-off for achieving a better approximation guarantee. This suggests that while our algorithm is more computationally intensive, it scales reasonably well for the improved solution quality it provides.
- Approximation Quality: The approximation quality metric
log∣V∣⋅∣OPTB∣∣OPTW∣\log |V| \cdot \frac{|OPT_B|}{|OPT_W|}log∣V∣⋅∣OPTW∣∣OPTB∣
frequently approaches the theoretical 2-approximation bound, with values such as 1.997155 for san400_0.7_3.clq and 2.977764 for p_hat700-1.clq. In cases like san1000.clq (0.690776), our algorithm significantly outperforms NetworkX, producing a dominating set of size 4 compared to NetworkX’s 40. However, for instances where
∣OPTB∣=∣OPTW∣|OPT_B| = |OPT_W|∣OPTB∣=∣OPTW∣
(e.g., p_hat500-3.clq), the metric exceeds 2 due to the logarithmic factor, indicating that both algorithms may be far from the true optimum. Overall, our algorithm consistently achieves solutions closer to the theoretical optimum, validating its 2-approximation guarantee.
Discussion and Implications
The results highlight a favorable trade-off between solution quality and computational efficiency for our algorithm. On instances where approximation accuracy is critical, such as san1000.clq and san400_0.5_1.clq, our algorithm produces significantly smaller dominating sets than NetworkX, demonstrating its practical effectiveness. However, the increased runtime on larger graphs suggests opportunities for optimization, particularly in reducing redundant computations or leveraging parallelization.
These findings position our algorithm as a strong candidate for applications requiring high-quality approximations, such as network design, facility location, and clustering problems, where a 2-approximation guarantee can lead to substantial cost savings. For scenarios prioritizing speed over solution quality, the NetworkX baseline may be preferable due to its faster execution.
Future Work
Future research will focus on optimizing the runtime performance of our algorithm without compromising its approximation guarantees. Potential directions include:
- Implementing heuristic-based pruning techniques to reduce the search space.
- Exploring parallel and distributed computing to handle larger graphs more efficiently.
- Extending the algorithm to handle weighted dominating set problems, broadening its applicability.
Additionally, we plan to evaluate our algorithm on real-world graphs from domains such as social networks and biological networks, where structural properties may further highlight the strengths of our approach.
References
- [Johnson1996] Johnson, D. S., & Trick, M. A. (1996). Cliques, Coloring, and Satisfiability: Second DIMACS Implementation Challenge. DIMACS Series in Discrete Mathematics and Theoretical Computer Science.
- [Vega25] Vega, D. (2025). Baldor: Approximate Minimum Dominating Set Solver (v0.1.2). Software Library.
- [Vazirani2001] Vazirani, V. V. (2001). Approximation Algorithms. Springer.
Impact of This Result
- Theoretical Insight: These algorithms illustrate how structural properties (e.g., bipartiteness) can be leveraged or induced to solve NP-hard problems like the dominating set problem with approximation guarantees.
- Practical Utility: The polynomial-time
O(nlogn+m)O(n \log n + m)O(nlogn+m)
solution for general graphs is applicable in network optimization problems, such as placing facilities or monitors, where covering all nodes efficiently is critical.
P=NPP = NPP=NP
: Our algorithm's existence would imply
P=NPP = NPP=NP
(Raz, Ran, and Shmuel Safra. 1997. "A sub-constant error-probability low-degree test, and a sub-constant error-probability PCP characterization of NP." Proceedings of the 29th Annual ACM Symposium on Theory of Computing (STOC), 475–84. doi: 10.1145/258533.258641), with transformative consequences. This makes
PPP
vs.
NPNPNP
not just a theoretical question but one with profound practical implications.
Conclusion
These algorithms advance the field of approximation algorithms by balancing efficiency and solution quality, offering both theoretical depth and practical relevance. Their argument implies that
P=NPP = NPP=NP
would have far-reaching practical applications, particularly in artificial intelligence, medicine, and industrial sectors. This work is available as a PDF document on ResearchGate at the following link: https://www.researchgate.net/publica...General_Graphs.
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