terms |
semipositone |
As a noun terms
is .
As an adjective semipositone is
(mathematics) an eigenvalue problem that would be a positone eigenvalue problem except that the nonlinear function is not positive when its argument is zero.
taxonomy |
semipositone |
As a noun taxonomy
is the science or the technique used to make a classification.
As an adjective semipositone is
an eigenvalue problem that would be a positone eigenvalue problem except that the nonlinear function is not positive when its argument is zero.
semipositone |
positone |
Derived terms |
Semipositone is a derived term of positone.
In mathematics|lang=en terms the difference between semipositone and positone
is that
semipositone is (mathematics) an eigenvalue problem that would be a positone eigenvalue problem except that the nonlinear function is not positive when its argument is zero while
positone is (mathematics) of a particular kind of eigenvalue problem involving a nonlinear function on the reals that is continuous, positive, and monotone.
As adjectives the difference between semipositone and positone
is that
semipositone is (mathematics) an eigenvalue problem that would be a positone eigenvalue problem except that the nonlinear function is not positive when its argument is zero while
positone is (mathematics) of a particular kind of eigenvalue problem involving a nonlinear function on the reals that is continuous, positive, and monotone.