Examples of 'bilinear' in a sentence
Meaning of "bilinear"
bilinear (adjective): Referring to a mathematical function or operation that is linear with respect to each of its two variables. Bilinear functions have applications in areas like image processing and computer graphics
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- Linear (preserving linear combinations) in each variable.
- Of or pertaining to a Möbius transformation (type of conformal map representable as the ratio of two linear functions).
- A bilinear function.
How to use "bilinear" in a sentence
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bilinear
Bilinear interpolation on the same dataset as above.
A multilinear map of two variables is a bilinear map.
A bilinear interpolation can be used for example.
These solutions were based on bilinear pairings.
It is called bilinear because it is linear in each of its arguments.
The alternatization of a bilinear map is bilinear.
Bilinear filtering is the next step up.
The objective function and some constraints are bilinear.
Any bilinear map is a multilinear map.
This means there is a bilinear function.
This bilinear map is unique up to isomorphism.
The system of base isolation is considered as a bilinear spring.
An invariant bilinear form is defined on the cell modules.
Interpolation files may be a bilinear filter.
A bilinear interpolator is a linear interpolator separable in two dimensions.
See also
This notation emphasizes the bilinear character of the form.
Bilinear interpolation is fast and tends to smooth pixel values.
The product remains bilinear and associative in this situation.
Bilinear is simple to be implemented and the computation complexity is low.
By convexity it contains all diagonal positive symmetric bilinear forms.
It allows the study of bilinear or multilinear operations via linear operations.
Unimodular symmetric bilinear form.
A symmetric bilinear form is a bilinear form on a vector space that is symmetric.
This is actually an adjustment to the process done in bilinear or trilinear filtering.
With bilinear interpolation.
The filters are designed using the bilinear transform method.
Bilinear approximation of surface.
No characterization in the bilinear case was available until this article.
Bilinear stressstrain relationship.
Reflexive bilinear form.
Bilinear or cubic algorithms can be used to calculate the interpolation points.
Alternating bilinear form.
Bilinear interpolation is used to approximate the value of points at fractional addresses.
This makes it possible to do bilinear filtering with one memory access.
These three numbers form the signature of the bilinear form.
A vector space with a bilinear form generalizes the case of an inner product.
It preserves fine detail better than the common bilinear algorithm.
A matrix representing a bilinear form is symmetrical if and only if the latter is symmetrical.
The third chapter is about a geometrical study of these bilinear operators.
Second one is designed following bilinear theory based on quadratic feedback control.
I am pretty sure it is bilinear.
A bilinear relationship between the transmission length and the cover is presented.
Trilinear filtering uses two bilinear patches from two different mipmaps.
Lattices are often embedded in a real vector space with a symmetric bilinear form.
Bicubic or bilinear filtering as described above may be used for chrominance interpolation.
The proof makes use of convexity results in the theory of bilinear forms.
Recall that a bilinear map is a function that is separately linear in each of its arguments.
It must be bilinear.
Using bilinear models is possible to calculate the available ductility of each model analyzed.
The interface is modeled by cohesive elements using a bilinear traction separation law.
