Examples of 'functionals' in a sentence
Meaning of "functionals"
Functional (noun): Functional usually refers to something that is in proper working order, serving its purpose efficiently and effectively
Show more definitions
- plural of functional
How to use "functionals" in a sentence
Basic
Advanced
functionals
Distributions are linear functionals on appropriate spaces of functions.
Functionals of linear growth on metric measure spaces.
But most of the functionals who tried.
And functionals can not have kids.
Theory of continuous linear operators and functionals.
New functionals for total energy calculations.
Complex convexity and analytic functionals.
General form of linear functionals in some functional spaces.
Both these integrals commute with linear functionals.
Linear continuous functionals in normalized spaces.
Laplacians and continuous linear functionals.
A world used by functionals as a prison of sorts.
Multivalued functions and functionals.
Hitchin functionals arise in many areas of string theory.
The impact of different energy density functionals is discussed.
See also
The adiabatic functionals are the most commonly used.
It becomes commutative when the two functionals are the same.
Two important functionals can be defined in terms of iterated functions.
The ratio of customs officers to all functionals is surprisingly high.
Linear functionals with the same kernel are proportional.
They are called biorthogonal functionals.
The orthogonalized basis functionals will generally be quite complicated.
Hence they are linear functionals.
Functionals use this universe as a political prison for their enemies.
Theories of higher type functionals.
Functionals are often expressed as definite integrals involving functions and their derivatives.
Forward ray on functionals.
Also functionals and estimates of multivariate skewness and kurtosis are addressed.
It can also be used to denote abstract vectors and linear functionals.
We also give an application to integral functionals on left continuous functions of bounded variation.
This embedding makes it possible to obtain almost sure convergences of functionals.
We give real examples of such functionals for which these convergence holds.
It is easy to see that both of the above formulae represent density functionals.
The set of functionals we minimize contains a regularization term and a classification one.
Bras as linear functionals.
The resulted functionals can be minimized by iterative algorithms which convergence is proved.
This section is concerned with positive linear functionals and representations.
Finding the extrema of functionals is similar to finding the maxima and minima of functions.
Theory of density functionals.
The deduced functionals remain rather complex and lacks of predictive power in general.
It can also be used to denote abstract vectors and linear functionals in mathematics.
Do not functionals.
The performance of all correlation factor models was evaluated against commonly used functionals.
Distribution theory reinterprets functions as linear functionals acting on a space of test functions.
Functionals have superhuman abilities related to their function as well as all the necessary knowledge.
This technique is based on minimizing the error functionals in the space domain.
There are hundreds of functionals available but they fail when applied to strongly correlated systems.
Some theoretical background of convex analysis and integral functionals is briefly reviewed.
Is it true that functionals can not have kids?
Several forms have been developed in conjunction with IDA correlation functionals.
