KillingRadical
calculate the Killing radical of a LAVF object.
Calling Sequence
Parameters
Description
Examples
Compatibility
KillingRadical( obj)
obj
-
a LAVF object that is a Lie algebra i.e. IsLieAlgebra(obj) returns true, see IsLieAlgebra.
Let L be a LAVF object which is a Lie algebra. Then KillingRadical method returns the Killing radical of L (i.e. the Killing orthogonal of L in L), as a LAVF object.
This method is associated with the LAVF object. For more detail, see Overview of the LAVF object.
withLieAlgebrasOfVectorFields:
Typesetting:-Settingsuserep=true:
Typesetting:-Suppressξx,y,ηx,y:
V≔VectorFieldξx,yDx+ηx,yDy,space=x,y
V≔ξⅆⅆx+ηⅆⅆy
E2≔LHPDEdiffξx,y,y,y=0,diffηx,y,x=−diffξx,y,y,diffηx,y,y=0,diffξx,y,x=0,indep=x,y,dep=ξ,η
E2≔ξy,y=0,ηx=−ξy,ηy=0,ξx=0,indep=x,y,dep=ξ,η
Construct a LAVF for the Euclidean Lie algebra E(2).
L≔LAVFV,E2
L≔ξⅆⅆx+ηⅆⅆy&whereξy,y=0,ξx=0,ηx=−ξy,ηy=0
IsLieAlgebraL
true
The Killing radical of L is an LAVF for the 2-dimensional translation group.
KR≔KillingRadicalL
KR≔ξⅆⅆx+ηⅆⅆy&whereξx=0,ηx=0,ξy=0,ηy=0
The Killing radical is always solvable.
IsSolvableKR
The KillingRadical command was introduced in Maple 2020.
For more information on Maple 2020 changes, see Updates in Maple 2020.
See Also
LieAlgebrasOfVectorFields (Package overview)
LAVF (Object overview)
LieAlgebrasOfVectorFields[VectorField]
LieAlgebrasOfVectorFields[LHPDE]
LieAlgebrasOfVectorFields[LAVF]
IsLieAlgebra
IsSolvable
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