Definitions from Wiktionary (hyperbolic polynomial)
▸ noun: (mathematics) A real, multivariate homogeneous polynomial p(x) is hyperbolic (in direction e) if p(x-te) = 0 has only real roots as a function of t.
▸ Words similar to hyperbolic polynomial
▸ Usage examples for hyperbolic polynomial
▸ Idioms related to hyperbolic polynomial
▸ Wikipedia articles (New!)
▸ Words that often appear near hyperbolic polynomial
▸ Rhymes of hyperbolic polynomial
▸ Invented words related to hyperbolic polynomial
▸ noun: (mathematics) A real, multivariate homogeneous polynomial p(x) is hyperbolic (in direction e) if p(x-te) = 0 has only real roots as a function of t.
Similar:
hyperbolic function,
hyperbolic space,
antihyperbolic function,
hyperbolic geometry,
hyperbolic sine,
inverse hyperbolic function,
arc-hyperbolic function,
unit hyperbola,
hypergeometric function,
homogeneous function,
more...
▸ Words similar to hyperbolic polynomial
▸ Usage examples for hyperbolic polynomial
▸ Idioms related to hyperbolic polynomial
▸ Wikipedia articles (New!)
▸ Words that often appear near hyperbolic polynomial
▸ Rhymes of hyperbolic polynomial
▸ Invented words related to hyperbolic polynomial