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| == Car Insurance - How To Get The Absolute Cheapest Car Insurance ==
| | Strichartz estimates are spacetime estimates on homogeneous and |
| | inhomogeneous linear dispersive and wave equations. They are |
| | particularly useful for solving semilinear perturbations of such |
| | equations, in which no derivatives are present in the nonlinearity. |
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| | Strichartz estimates can be derived abstractly as a consequence of a |
| | dispersive inequality and an energy inequality. |
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| | ==Linear Strichartz estimate == |
| | Let <math> \dot H^{\alpha}(\Bbb R^n) </math> denote the homogeneous |
| | Sobolev space with norm |
| | <center> |
| | <math> |
| | \left\| u \right\|_{\dot H^{\alpha}(\Bbb R^n)} |
| | = \left\|(-\Delta^{\alpha/2}) u \right\|_{L^2(\Bbb R^n)} |
| | </math> |
| | </center> |
| | If <math> u </math> solves the ''linear wave equation'' |
| | <center> |
| | <math> |
| | \Box u = F(t,x) |
| | </math> |
| | </center> |
| | with data |
| | <center> |
| | <math> |
| | u(0,\cdot)=f \qquad \partial_t u (0,\cdot )=g |
| | </math> |
| | </center> |
| | then the Strichartz estimates states that |
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| In many times on your life and your expenditures and this [http://www.insurancebuffs.com/ '''Car Insurance'''] comes in your way for you do like to save hundred of bucks in your pocket. And if you like to look at the advertisement you can save hundred dollars with this van insurance that they offer. So here are things that you need to do if you like to make for real on the '''insurance''' policies. Most people do not consider to have a safe driving in some way if you do have a good driving record for sure you will find yourself that you will have a better rate on the service. One of the option for other people also is that they will contact several companies that offer this auto insurance so that you can find a better offer. Try to ask also a higher deductible on the '''vehicle insurance''' policies because it will help you a lot from your concern.
| | <center> <math> |
| | \left\| u \right\|_{L^{4}({{\Bbb R}^{3+1}}_+)} |
| | \leq C \left( |
| | \left\| f \right\|_{{\dot H^{1/2}}(\Bbb R^3)} |
| | + \left\| g \right\|_{{\dot H^{-1/2}}(\Bbb R^3)} |
| | + \int\limits_0^{\infty} \left\| F \right\|_{L^2(\Bbb R^{3})} |
| | \right) |
| | </math> </center> |
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| In the coverage on the [http://simple.wiktionary.org/wiki/Category:Ordinal_adjectives '''Car Insurance'''] you can even cut the cost like eliminating such coverage like medical '''insurance''' and other that you do not need most. Just carry the appropriate liability on the '''vehicle insurance''' so that you will not be put in the middle of problem. Try to bundle also your '''insurance''' from one company for sure you will do have a better rate on the policies.
| | [[Category:Estimates]] [[Category:Schrodinger]] [[Category:Wave]] |
| | [[Category:Airy]] |
Revision as of 08:30, 4 February 2011
Strichartz estimates are spacetime estimates on homogeneous and
inhomogeneous linear dispersive and wave equations. They are
particularly useful for solving semilinear perturbations of such
equations, in which no derivatives are present in the nonlinearity.
Strichartz estimates can be derived abstractly as a consequence of a
dispersive inequality and an energy inequality.
Linear Strichartz estimate
Let 
denote the homogeneous
Sobolev space with norm
If 
solves the linear wave equation
with data
then the Strichartz estimates states that
