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Hypoelliptic_operator abstract "In mathematics, more specifically in the theory of partial differential equations, a partial differential operator defined on an open subset is called hypoelliptic if for every distribution defined on an open subset such that is (smooth), must also be .If this assertion holds with replaced by real analytic, then is said to be analytically hypoelliptic. Every elliptic operator with coefficients is hypoelliptic. In particular, the Laplacian is an example of a hypoelliptic operator (the Laplacian is also analytically hypoelliptic). The heat equation operator (where ) is hypoelliptic but not elliptic. The wave equation operator (where ) is not hypoelliptic.".
Hypoelliptic_operator wikiPageID "9282128".
Hypoelliptic_operator wikiPageRevisionID "544673337".
Hypoelliptic_operator hasPhotoCollection Hypoelliptic_operator.
Hypoelliptic_operator id "8059".
Hypoelliptic_operator title "Hypoelliptic".
Hypoelliptic_operator subject Category:Differential_operators.
Hypoelliptic_operator subject Category:Partial_differential_equations.
Hypoelliptic_operator type Abstraction100002137.
Hypoelliptic_operator type Communication100033020.
Hypoelliptic_operator type DifferentialEquation106670521.
Hypoelliptic_operator type DifferentialOperators.
Hypoelliptic_operator type Equation106669864.
Hypoelliptic_operator type Function113783816.
Hypoelliptic_operator type MathematicalRelation113783581.
Hypoelliptic_operator type MathematicalStatement106732169.
Hypoelliptic_operator type Message106598915.
Hypoelliptic_operator type Operator113786413.
Hypoelliptic_operator type PartialDifferentialEquation106670866.
Hypoelliptic_operator type PartialDifferentialEquations.
Hypoelliptic_operator type Relation100031921.
Hypoelliptic_operator type Statement106722453.
Hypoelliptic_operator comment "In mathematics, more specifically in the theory of partial differential equations, a partial differential operator defined on an open subset is called hypoelliptic if for every distribution defined on an open subset such that is (smooth), must also be .If this assertion holds with replaced by real analytic, then is said to be analytically hypoelliptic. Every elliptic operator with coefficients is hypoelliptic.".
Hypoelliptic_operator label "Hypoelliptic operator".
Hypoelliptic_operator label "Гипоэллиптический оператор".
Hypoelliptic_operator sameAs m.0282xmf.
Hypoelliptic_operator sameAs Q4138816.
Hypoelliptic_operator sameAs Q4138816.
Hypoelliptic_operator sameAs Hypoelliptic_operator.
Hypoelliptic_operator wasDerivedFrom Hypoelliptic_operator?oldid=544673337.
Hypoelliptic_operator isPrimaryTopicOf Hypoelliptic_operator.