Quintic NLW/NLKG on R3: Difference between revisions

**Quintic NLW/NLKG on R^3**
Description
Equation
Fields
Data class
Basic characteristics
Structure	Hamiltonian
Nonlinearity	semilinear
Linear component	wave
Critical regularity
Criticality	energy-critical
Covariance	Lorentzian
Theoretical results
LWP	for
GWP	for (+); and sub-ground-state energy (-)
Related equations
Parent class	Quintic NLW/NLKG
Special cases	-
Other related	-

Latest revision as of 21:57, 4 March 2007

Scaling is $s=1$ . Thus this equation is energy-critical.
LWP for $s\geq 1$ $s\geq 1$ by Strichartz estimates (see e.g. LbSo1995; earlier references exist)
- When $s=1$ the time of existence depends on the profile of the data and not just on the norm.
- For $s<s_{c}$ one has instantaneous blowup in the focusing case, and unbounded growth of $H^{s}$ norms in the defocusing case (CtCoTa-p2).
GWP for $s=1$ $s=1$ in the defocussing case (Gl1990, Gl1992). The main new ingredient is energy non-concentration (Sw1988, Sw1992).
- Further decay estimates and scattering were obtained in BaSa1998, Na1999d, Ta2006; global Lipschitz dependence was obtained in BaGd1997.
- For smooth data GWP and scattering was shown in Gl1992; see also SaSw1994
- For radial data GWP and scattering was shown in Sw1988
- For data with small energy this was shown for general quintic non-linearities (and for either NLW or NLKG) in Ra1981.
- Global weak solutions can be constructed by general methods (e.g. Sr1989, Sw1992); uniqueness was shown in Kt1992
- In the focussing case there is blowup from large data by the ODE method.
- When there is a convex obstacle GWP for smooth data is known SmhSo1995.

@@ Line 1: / Line 1: @@
+{{equation
+ | name = Quintic NLW/NLKG on R^3
+ | equation = <math>\Box u = m^2 u \pm u^5</math>
+ | fields = <math>u: \R^{1+3} \to \mathbb{C}</math>
+ | data = <math>u[0] \in H^s \times H^{s-1}(\R^3)</math>
+ | hamiltonian = [[Hamiltonian]]
+ | linear = [[free wave equation|wave]]
+ | nonlinear = [[semilinear]]
+ | critical = <math>\dot H^1 \times L^2(\R^3)</math>
+ | criticality = energy-critical
+ | covariance = [[Lorentzian]]
+ | lwp = <math>H^s \times H^{s-1}(\R)</math> for <math>s \geq 1</math>
+ | gwp = <math>H^s \times H^{s-1}(\R)</math> for <math>s \geq 1</math> (+)<br> <math>s \geq 1</math> and sub-ground-state energy (-)
+ | parent = [[Quintic NLW/NLKG]]
+ | special = -
+ | related = -
+}}
-* Scaling is <math>s=1</math>.
+* Scaling is <math>s=1</math>.  Thus this equation is energy-critical.
-* LWP for <math>s \geq 1</math> by Strichartz estimates (see e.g. [[Bibliography#LbSo1995|LbSo1995]]; earlier references exist)
+* LWP for <math>s \geq 1</math> by Strichartz estimates (see e.g. [[LbSo1995]]; earlier references exist)
 ** When <math>s=1</math> the time of existence depends on the profile of the data and not just on the norm.
-** For <math>s<s_c</math> one has instantaneous blowup in the focusing case, and unbounded growth of <math>H^s</math> norms in the defocusing case [CtCoTa-p2]
+** For <math>s<s_c</math> one has instantaneous blowup in the focusing case, and unbounded growth of <math>H^s</math> norms in the defocusing case ([[CtCoTa-p2]]).
-* GWP for <math>s=1</math> in the defocussing case [[Bibliography#Gl1990|Gl1990]], [[Bibliography#Gl1992|Gl1992]]. The main new ingredient is energy non-concentration [[Bibliography#Sw1988|Sw1988]], [[Bibliography#Sw1992|Sw1992]]
+* GWP for <math>s=1</math> in the defocussing case ([[Gl1990]], [[Gl1992]]). The main new ingredient is energy non-concentration ([[Sw1988]], [[Sw1992]]).
-** Further decay estimates and scattering were obtained in [[Bibliography#BaSa1998|BaSa1998]]; global Lipschitz dependence was obtained in [[Bibliography#BaGd1997|BaGd1997]].
+** Further decay estimates and scattering were obtained in [[BaSa1998]], [[Na1999d]], [[Ta2006]]; global Lipschitz dependence was obtained in [[BaGd1997]].
-** For smooth data GWP and scattering was shown in [[Bibliography#Gl1992|Gl1992]]; see also [[Bibliography#SaSw1994|SaSw1994]]
+** For smooth data GWP and scattering was shown in [[Gl1992]]; see also [[SaSw1994]]
-** For radial data GWP and scattering was shown in [[Bibliography#Sw1988|Sw1988]]
+** For radial data GWP and scattering was shown in [[Sw1988]]
-** For data with small energy this was shown for general quintic non-linearities (and for either NLW or NLKG) in [[Bibliography#Ra1981|Ra1981]].
+** For data with small energy this was shown for general quintic non-linearities (and for either NLW or NLKG) in [[Ra1981]].
-** Global weak solutions can be constructed by general methods (e.g. [[Bibliography#Sr1989|Sr1989]], [[Bibliography#Sw1992|Sw1992]]); uniqueness was shown in [[Bibliography#Kt1992|Kt1992]]
+** Global weak solutions can be constructed by general methods (e.g. [[Sr1989]], [[Sw1992]]); uniqueness was shown in [[Kt1992]]
-** In the focussing case there is blowup from large data by the ODE method.
+** In the focussing case there is blowup from large data by the [[ODE method]].
-** When there is a convex obstacle GWP for smooth data is known [[Bibliography#SmhSo1995|SmhSo1995]].
+** When there is a convex obstacle GWP for smooth data is known [[SmhSo1995]].
+[[Category:Wave]]
-----   [[Category:Equations]]
+[[Category:Equations]]

Description
Equation	$\Box u=m^{2}u\pm u^{5}$
Fields	$u:\mathbb {R} ^{1+3}\to \mathbb {C}$
Data class	$u[0]\in H^{s}\times H^{s-1}(\mathbb {R} ^{3})$
Basic characteristics
Structure	Hamiltonian
Nonlinearity	semilinear
Linear component	wave
Critical regularity	${\dot {H}}^{1}\times L^{2}(\mathbb {R} ^{3})$
Criticality	energy-critical
Covariance	Lorentzian
Theoretical results
LWP	$H^{s}\times H^{s-1}(\mathbb {R} )$ for $s\geq 1$
GWP	$H^{s}\times H^{s-1}(\mathbb {R} )$ for $s\geq 1$ (+) $s\geq 1$ and sub-ground-state energy (-)
Related equations
Parent class	Quintic NLW/NLKG
Special cases	-
Other related	-

Quintic NLW/NLKG on R3: Difference between revisions

Latest revision as of 21:57, 4 March 2007

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