terms |
semicontinuous |
As a noun terms
is .
As an adjective semicontinuous is
(mathematics) (
of a function ) that it is continuous almost everywhere, except at certain points at which it is either upper semi-continuous or lower semi-continuous.
hemicontinuous |
semicontinuous |
Related terms |
Semicontinuous is a related term of hemicontinuous.
Hemicontinuous is likely misspelled.
Hemicontinuous has no English definition.
As an adjective semicontinuous is
(
of a function) That it is continuous almost everywhere, except at certain points at which it is either upper semi-continuous or lower semi-continuous.
semicontinuity |
semicontinuous |
Related terms |
Semicontinuity is a related term of semicontinuous.
In mathematics|lang=en terms the difference between semicontinuity and semicontinuous
is that
semicontinuity is (mathematics) the condition of being semicontinuous while
semicontinuous is (mathematics) (
of a function ) that it is continuous almost everywhere, except at certain points at which it is either upper semi-continuous or lower semi-continuous.
As a noun semicontinuity
is (mathematics) the condition of being semicontinuous.
As an adjective semicontinuous is
(mathematics) (
of a function ) that it is continuous almost everywhere, except at certain points at which it is either upper semi-continuous or lower semi-continuous.
semicontinuously |
semicontinuous |
Derived terms |
Semicontinuously is a derived term of semicontinuous.
As an adjective semicontinuous is
(mathematics) (
of a function ) that it is continuous almost everywhere, except at certain points at which it is either upper semi-continuous or lower semi-continuous.
continuous |
semicontinuous |
As adjectives the difference between continuous and semicontinuous
is that
continuous is without break, cessation, or interruption; without intervening time while
semicontinuous is (
of a function) That it is continuous almost everywhere, except at certain points at which it is either upper semi-continuous or lower semi-continuous.