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regularise

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The answer REGULARISE has 0 possible clue(s) in existing crosswords.

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Definitions of regularise in various dictionaries:

verb - bring into conformity with rules or principles or usage

verb - make regular or more regular

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Possible Dictionary Clues
Alternative spelling of regularize.
make regular or more regular
bring into conformity with rules or principles or usage impose regulations

Regularise might refer to
The Benjamin–Bona–Mahony equation (or BBM equation) – also known as the regularized long-wave equation (RLWE) – is the partial differential equation* * * * * u * * t * * * + * * u * * x * * * + * u * * u * * x * * * − * * u * * x * x * t * * * = * 0. * * * * {\displaystyle u_{t}+u_{x}+uu_{x}-u_{xxt}=0.\,} * This equation was studied in Benjamin, Bona, and Mahony (1972) as an improvement of the Korteweg–de Vries equation (KdV equation) for modeling long surface gravity waves of small amplitude – propagating uni-directionally in 1+1 dimensions. They show the stability and uniqueness of solutions to the BBM equation. This contrasts with the KdV equation, which is unstable in its high wavenumber components. Further, while the KdV equation has an infinite number of integrals of motion, the BBM equation only has three.Before, in 1966, this equation was introduced by Peregrine, in the study of undular bores.A generalized n-dimensional version is given by * * * * * * u * * t * * * − * * ∇ * * 2 * * * * u * * t * * * + * div * * φ * ( * u * ) * = * 0. * * * * {\displaystyle u_{t}-\nabla ^{2}u_{t}+\operatorname {div} \,\varphi (u)=0.\,} * where * * * * φ * * * {\displaystyle \varphi } * is a sufficiently smooth function from * * * * * R * * * * {\displaystyle \mathbb {R} } * to * * * * * * R * * * n * * * * * {\displaystyle \mathbb {R} ^{n}} * . Avrin & Goldstein (1985) proved global existence of a solution in all dimensions.

Regularise might refer to

The Benjamin–Bona–Mahony equation (or BBM equation) – also known as the regularized long-wave equation (RLWE) – is the partial differential equation*
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* {\displaystyle u_{t}+u_{x}+uu_{x}-u_{xxt}=0.\,}
* This equation was studied in Benjamin, Bona, and Mahony (1972) as an improvement of the Korteweg–de Vries equation (KdV equation) for modeling long surface gravity waves of small amplitude – propagating uni-directionally in 1+1 dimensions. They show the stability and uniqueness of solutions to the BBM equation. This contrasts with the KdV equation, which is unstable in its high wavenumber components. Further, while the KdV equation has an infinite number of integrals of motion, the BBM equation only has three.Before, in 1966, this equation was introduced by Peregrine, in the study of undular bores.A generalized n-dimensional version is given by
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* {\displaystyle u_{t}-\nabla ^{2}u_{t}+\operatorname {div} \,\varphi (u)=0.\,}
* where
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* is a sufficiently smooth function from
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* {\displaystyle \mathbb {R} ^{n}}
* . Avrin & Goldstein (1985) proved global existence of a solution in all dimensions.

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