Definitions from Wiktionary (Laplacian matrix)
▸ noun: (graph theory) A square n×n matrix which describes an undirected graph of n vertices by letting rows and columns correspond to vertices, letting its diagonal elements contain the degrees of corresponding vertices and letting its non-diagonal elements contain either −1 or 0 depending on whether there is or there is not (respectively) an edge connecting the pair of corresponding vertices.
▸ Words similar to laplacian matrix
▸ Usage examples for laplacian matrix
▸ Idioms related to laplacian matrix
▸ Wikipedia articles (New!)
▸ Words that often appear near laplacian matrix
▸ Rhymes of laplacian matrix
▸ Invented words related to laplacian matrix
▸ noun: (graph theory) A square n×n matrix which describes an undirected graph of n vertices by letting rows and columns correspond to vertices, letting its diagonal elements contain the degrees of corresponding vertices and letting its non-diagonal elements contain either −1 or 0 depending on whether there is or there is not (respectively) an edge connecting the pair of corresponding vertices.
Similar:
Laplacian,
antilaplacian,
sublaplacian,
Laplace expansion,
adjacency matrix,
defective matrix,
Plücker matrix,
conference matrix,
invertible matrix,
main diagonal,
more...
Opposite:
▸ Words similar to laplacian matrix
▸ Usage examples for laplacian matrix
▸ Idioms related to laplacian matrix
▸ Wikipedia articles (New!)
▸ Words that often appear near laplacian matrix
▸ Rhymes of laplacian matrix
▸ Invented words related to laplacian matrix