networkx.algorithms.bipartite.matrix.biadjacency_matrix

biadjacency_matrix(G, row_order, column_order=None, dtype=None, weight='weight', format='csr')[source]

Returns the biadjacency matrix of the bipartite graph G.

Let G = (U, V, E) be a bipartite graph with node sets U = u_{1},...,u_{r} and V = v_{1},...,v_{s}. The biadjacency matrix 1 is the r x s matrix B in which b_{i,j} = 1 if, and only if, (u_i, v_j) in E. If the parameter weight is not None and matches the name of an edge attribute, its value is used instead of 1.

Parameters
  • G (graph) – A NetworkX graph

  • row_order (list of nodes) – The rows of the matrix are ordered according to the list of nodes.

  • column_order (list, optional) – The columns of the matrix are ordered according to the list of nodes. If column_order is None, then the ordering of columns is arbitrary.

  • dtype (NumPy data-type, optional) – A valid NumPy dtype used to initialize the array. If None, then the NumPy default is used.

  • weight (string or None, optional (default=’weight’)) – The edge data key used to provide each value in the matrix. If None, then each edge has weight 1.

  • format (str in {‘bsr’, ‘csr’, ‘csc’, ‘coo’, ‘lil’, ‘dia’, ‘dok’}) – The type of the matrix to be returned (default ‘csr’). For some algorithms different implementations of sparse matrices can perform better. See 2 for details.

Returns

M – Biadjacency matrix representation of the bipartite graph G.

Return type

SciPy sparse matrix

Notes

No attempt is made to check that the input graph is bipartite.

For directed bipartite graphs only successors are considered as neighbors. To obtain an adjacency matrix with ones (or weight values) for both predecessors and successors you have to generate two biadjacency matrices where the rows of one of them are the columns of the other, and then add one to the transpose of the other.

See also

adjacency_matrix(), from_biadjacency_matrix()

References

1

https://en.wikipedia.org/wiki/Adjacency_matrix#Adjacency_matrix_of_a_bipartite_graph

2

Scipy Dev. References, “Sparse Matrices”, https://docs.scipy.org/doc/scipy/reference/sparse.html