Definitions from Wikipedia (Laplacian of the indicator)
▸ noun: In potential theory, a branch of mathematics, the Laplacian of the indicator of the domain D is a generalisation of the derivative of the Dirac delta function to higher dimensions, and is non-zero only on the surface of D. It can be viewed as the surface delta prime function.
▸ Words similar to laplacian of the indicator
▸ Usage examples for laplacian of the indicator
▸ Idioms related to laplacian of the indicator
▸ Wikipedia articles (New!)
▸ Words that often appear near laplacian of the indicator
▸ Rhymes of laplacian of the indicator
▸ Invented words related to laplacian of the indicator
▸ noun: In potential theory, a branch of mathematics, the Laplacian of the indicator of the domain D is a generalisation of the derivative of the Dirac delta function to higher dimensions, and is non-zero only on the surface of D. It can be viewed as the surface delta prime function.
▸ Words similar to laplacian of the indicator
▸ Usage examples for laplacian of the indicator
▸ Idioms related to laplacian of the indicator
▸ Wikipedia articles (New!)
▸ Words that often appear near laplacian of the indicator
▸ Rhymes of laplacian of the indicator
▸ Invented words related to laplacian of the indicator