Template:Equation
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Description | |
---|---|
Equation | {{{equation}}} |
Fields | {{{fields}}} |
Data class | {{{data}}} |
Basic characteristics | |
Structure | {{{hamiltonian}}} |
Nonlinearity | {{{nonlinear}}} |
Linear component | {{{linear}}} |
Critical regularity | {{{critical}}} |
Criticality | {{{criticality}}} |
Covariance | {{{covariance}}} |
Theoretical results | |
LWP | {{{lwp}}} |
GWP | {{{gwp}}} |
Related equations | |
Parent class | {{{parent}}} |
Special cases | {{{special}}} |
Other related | {{{related}}} |
How to use this template
To insert an infobox such as the one on the right onto any page, add the following text near the top of the page (and edit the text in angled brackets appropriately):
{{equation | name = <name of equation> | equation = <formula for equation> | fields = <the fields involved in the equation> | data = <the initial data class> | hamiltonian = <the degree of hamiltonian structure> | linear = <the linear component of the equation> | nonlinear = <the strength of the nonlinearity> | critical = <the scale invariant initial data class> | criticality = <subcritical, critical, or supercritical> | covariance = <the geometric symmetry group> | lwp = <best known local wellposedness> | gwp = <best known global wellposedness> | parent = <more general equation> | special = <more specific equation> | related = <related equations> }}
See for instance the page on NLS for an instance of this template in action.
Some commentary on the less self-explanatory of these tags:
- hamiltonian: The options here are non-Hamiltonian, Hamiltonian, and completely integrable.
- linear: For most equations the options will be Schrodinger, wave, or Airy.
- nonlinear: The options here are linear, semilinear, semilinear with derivatives, quasilinear, and fully nonlinear.
- criticality: Describe here whether the equation is sub-critical, critical, or super-critical with respect to mass, energy, or scattering (if appropriate). See Critical.
- covariance: Typically one has Galilean or Lorentzian symmetry, sometimes supplemented by gauge invariance; occasionally one also has conformal or pseudoconformal symmetry.