Bridgeland stability condition

In mathematics, and especially algebraic geometry, a Bridgeland stability condition, defined by Tom Bridgeland, is an algebro-geometric stability condition defined on elements of a triangulated category. The case of original interest and particular importance is when this triangulated category is the derived category of coherent sheaves on a Calabi–Yau manifold, and this situation has fundamental links to string theory and the study of D-branes.

Such stability conditions were introduced in a rudimentary form by Michael Douglas called $\Pi$ -stability and used to study BPS B-branes in string theory.^[1] This concept was made precise by Bridgeland, who phrased these stability conditions categorically, and initiated their study mathematically.^[2]

^ Douglas, M.R., Fiol, B. and Römelsberger, C., 2005. Stability and BPS branes. Journal of High Energy Physics, 2005(09), p. 006.
^ Bridgeland, Tom (2006-02-08). "Stability conditions on triangulated categories". arXiv:math/0212237.

[douglas-1] Douglas, M.R., Fiol, B. and Römelsberger, C., 2005. Stability and BPS branes. Journal of High Energy Physics, 2005(09), p. 006.

[bridgeland-2] Bridgeland, Tom (2006-02-08). "Stability conditions on triangulated categories". arXiv:math/0212237.

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