Question on Weak Energy Condition

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SUMMARY

The discussion centers on the weak energy condition in the context of general relativity, specifically regarding the stress-energy tensor T^{\mu\nu}. It is established that the vector u represents the 4-velocity of a hypothetical observer, which must be timelike to ensure that the observer is moving slower than light. The condition T^{\mu\nu}u^au^b > 0 indicates that the energy density must be positive for all observers with valid timelike 4-velocities. This understanding is crucial for testing the weak energy condition in theoretical physics.

PREREQUISITES
  • Understanding of general relativity concepts
  • Familiarity with the stress-energy tensor T^{\mu\nu}
  • Knowledge of 4-vectors and their properties
  • Basic principles of energy conditions in physics
NEXT STEPS
  • Study the properties of 4-velocities in general relativity
  • Learn about the implications of the weak energy condition
  • Explore the mathematical formulation of the stress-energy tensor
  • Investigate other energy conditions in general relativity, such as the dominant energy condition
USEFUL FOR

The discussion is beneficial for theoretical physicists, graduate students in physics, and anyone studying general relativity and its implications on energy conditions in spacetime.

robousy
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Hi,

I have just read that one of the restrictions on [tex]T^{\mu\nu}[/tex] is that:

[tex]T^{\mu\nu}u^au^b > 0 <br /> [/tex]

where u is a timelike vector.

Can someone please tell me WHAT u actually is (other than saying it is a timelike vector).

What sort of vector is it, what is the context?

i.e Once I have obtained the stress energy tensor and I want to test the weak energy condition then what u's to I multiply it by to see if it is greater than zero?

Thanks!
 
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robousy said:
Hi,

I have just read that one of the restrictions on [tex]T^{\mu\nu}[/tex] is that:

[tex]T^{\mu\nu}u^au^b > 0 <br /> [/tex]

where u is a timelike vector.

Can someone please tell me WHAT u actually is (other than saying it is a timelike vector).

What sort of vector is it, what is the context?

i.e Once I have obtained the stress energy tensor and I want to test the weak energy condition then what u's to I multiply it by to see if it is greater than zero?

Thanks!

u is the 4-velocity of a hypothetical observer. An observer can't have a space-like 4-vector, an observer must be moving slower than light. The above equation is thus telling you that the energy density must be positive for all observers, where an observer can have any 4-velocity as long as it's timelike.
 
aaah, ok thanks a lot.

That makes sense.
 

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