The discussion centers on the relationship between the Penrose process, which involves energy extraction from rotating black holes, and the Hawking area theorem, which states that the area of a black hole's event horizon generally does not decrease. Participants explore how changes in mass and angular momentum affect the area of a black hole, particularly in the context of the Penrose process.
Participants express differing views on the relationship between mass, angular momentum, and area. While some assert that a decrease in both mass and angular momentum must lead to a decrease in area, others argue that the area can still increase depending on the specific conditions of the black hole.
The discussion relies on a heuristic understanding of the relationships between mass, angular momentum, and area, and does not resolve the mathematical intricacies involved. The implications of quantum effects on the Hawking area theorem are also noted as excluded from the discussion.
Sumarna said:Hawking area theorem says that area of black hole generally never decrease.
Sumarna said:Penrose process says that energy can be extracted from black hole. Energy extraction will decrease mass?
Sumarna said:if mass is decreased then will area also decrease?
This has confused me more.. if both mass and angular momentum are decreasing then area must also decrease. How it end up increasing?PeterDonis said:Yes. (Note that this theorem excludes any quantum effects.)
Yes, but this only happens with a rotating black hole, and the hole also loses angular momentum in this process.
No, because for a rotating hole the area does not just depend on the mass. It depends on, heuristically, ##\sqrt{M^2 - a^2}##, where ##a## is the hole's angular momentum per unit mass. In the Penrose process, ##M## decreases, but ##a## also decreases, in such a way that the horizon area ends up larger.
Sumarna said:if both mass and angular momentum are decreasing then area must also decrease.
Consider ##A=8\pi M(M+\sqrt{M^2-a^2})## which is area of rotating black hole. So if both mass M and angular momentum a are decreasing then area will increase? when i am decreasing these two terms, area is also decreasing.PeterDonis said:No. Look at the minus sign in front of ##a^2## in the heuristic formula I gave. If angular momentum decreases, the area increases.
Sumarna said:Consider ##A=8\pi M(M+\sqrt{M^2-a^2})## which is area of rotating black hole. So if both mass M and angular momentum a are decreasing then area will increase? when i am decreasing these two terms, area is also decreasing.