Intersection - Maple Help

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Intersection

find a LHPDE object whose solution space is the intersection of solution spaces of given LHPDE objects.

 Calling Sequence Intersection( obj1, obj2, ..., depname = vars )

Parameters

 obj1, obj2, ... - a sequence of LHPDE objects living on the same space vars - (optional) a list of new dependent variable names

Description

 • Let obj1, obj2, ... be a sequence of LHPDE objects living on the same space (see AreSameSpace). The Intersection method finds a LHPDEs system whose solution space is the intersection of solutions of obj1,obj2,....
 • The method returns a rif-reduced LHPDE object.
 • By default, the dependent variable names of the returned object are taken from obj1. The dependent variable names will be vars if the optional argument depname = vars is specified.
 • This method is associated with the LHPDE object. For more detail, see Overview of the LHPDE object.

Examples

 > $\mathrm{with}\left(\mathrm{LieAlgebrasOfVectorFields}\right):$
 > $\mathrm{Typesetting}:-\mathrm{Settings}\left(\mathrm{userep}=\mathrm{true}\right):$
 > $\mathrm{Typesetting}:-\mathrm{Suppress}\left(\left\{\mathrm{\alpha },\mathrm{\beta },\mathrm{\eta },\mathrm{\phi },\mathrm{\psi },\mathrm{\xi }\right\}\left(x,y\right)\right)$
 > $S≔\mathrm{LHPDE}\left(\left[\mathrm{diff}\left(\mathrm{\xi }\left(x,y\right),x\right)=0,\mathrm{diff}\left(\mathrm{\eta }\left(x,y\right),y\right)=0,\mathrm{diff}\left(\mathrm{\xi }\left(x,y\right),y\right)+\mathrm{diff}\left(\mathrm{\eta }\left(x,y\right),x\right)=0,\mathrm{diff}\left(\mathrm{\xi }\left(x,y\right),y,y\right)=0,\mathrm{diff}\left(\mathrm{\eta }\left(x,y\right),x,x\right)=0\right]\right)$
 ${S}{≔}\left[{{\mathrm{\xi }}}_{{x}}{=}{0}{,}{{\mathrm{\eta }}}_{{y}}{=}{0}{,}{{\mathrm{\xi }}}_{{y}}{+}{{\mathrm{\eta }}}_{{x}}{=}{0}{,}{{\mathrm{\xi }}}_{{y}{,}{y}}{=}{0}{,}{{\mathrm{\eta }}}_{{x}{,}{x}}{=}{0}\right]{,}{\mathrm{indep}}{=}\left[{x}{,}{y}\right]{,}{\mathrm{dep}}{=}\left[{\mathrm{\eta }}{,}{\mathrm{\xi }}\right]$ (1)
 > $\mathrm{S1}≔\mathrm{LHPDE}\left(\left[\mathrm{diff}\left(\mathrm{\alpha }\left(x,y\right),x,x\right)=0,\mathrm{diff}\left(\mathrm{\alpha }\left(x,y\right),y\right)=0,\mathrm{diff}\left(\mathrm{\beta }\left(x,y\right),x\right)=0,\mathrm{diff}\left(\mathrm{\beta }\left(x,y\right),y,y\right)=0,\mathrm{diff}\left(\mathrm{\alpha }\left(x,y\right),x\right)-\mathrm{diff}\left(\mathrm{\beta }\left(x,y\right),y\right)=0\right],\mathrm{indep}=\left[x,y\right],\mathrm{dep}=\left[\mathrm{\alpha },\mathrm{\beta }\right]\right)$
 ${\mathrm{S1}}{≔}\left[{{\mathrm{\alpha }}}_{{x}{,}{x}}{=}{0}{,}{{\mathrm{\alpha }}}_{{y}}{=}{0}{,}{{\mathrm{\beta }}}_{{x}}{=}{0}{,}{{\mathrm{\beta }}}_{{y}{,}{y}}{=}{0}{,}{{\mathrm{\alpha }}}_{{x}}{-}{{\mathrm{\beta }}}_{{y}}{=}{0}\right]{,}{\mathrm{indep}}{=}\left[{x}{,}{y}\right]{,}{\mathrm{dep}}{=}\left[{\mathrm{\alpha }}{,}{\mathrm{\beta }}\right]$ (2)
 > $\mathrm{Intersection}\left(S,\mathrm{S1}\right)$
 $\left[{{\mathrm{\eta }}}_{{x}}{=}{0}{,}{{\mathrm{\xi }}}_{{x}}{=}{0}{,}{{\mathrm{\eta }}}_{{y}}{=}{0}{,}{{\mathrm{\xi }}}_{{y}}{=}{0}\right]{,}{\mathrm{indep}}{=}\left[{x}{,}{y}\right]{,}{\mathrm{dep}}{=}\left[{\mathrm{\eta }}{,}{\mathrm{\xi }}\right]$ (3)
 > $\mathrm{Intersection}\left(S,\mathrm{S1},\mathrm{depname}=\left[\mathrm{\phi },\mathrm{\psi }\right]\right)$
 $\left[{{\mathrm{\phi }}}_{{x}}{=}{0}{,}{{\mathrm{\psi }}}_{{x}}{=}{0}{,}{{\mathrm{\phi }}}_{{y}}{=}{0}{,}{{\mathrm{\psi }}}_{{y}}{=}{0}\right]{,}{\mathrm{indep}}{=}\left[{x}{,}{y}\right]{,}{\mathrm{dep}}{=}\left[{\mathrm{\phi }}{,}{\mathrm{\psi }}\right]$ (4)

Compatibility

 • The Intersection command was introduced in Maple 2020.
 • For more information on Maple 2020 changes, see Updates in Maple 2020.

 See Also