Continuum structure function
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In mathematics, a continuum structure function (CSF) is defined by Laurence Baxter as a nondecreasing maping from the unit hypercube to the unit interval. It is used by Baxter to help in the Mathematical modelling of the level of performance of a system in terms of the performance levels of its components.[1][2][3]
References
- ↑ Baxter, Laurence A. (1984). "Continuum structures I". Journal of Applied Probability. 21 (4): 802–815. doi:10.2307/3213697. JSTOR 3213697.
- ↑ Baxter, Laurence A. (1986). "Continuum structures. II". Mathematical Proceedings of the Cambridge Philosophical Society. 99 (2): 331–338. Bibcode:1986MPCPS..99..331B. doi:10.1017/S0305004100064240.
- ↑ Kim, Chul; Baxter, Laurence A. (1987). "Reliability importance for continuum structure functions". Journal of Applied Probability. 24 (3): 779–785. doi:10.2307/3214108. JSTOR 3214108.
Further reading
- Kim, Chul; Baxter, Laurence A. (1987). "Axiomatic characterizations of continuum structure functions". Operations Research Letters. 6 (6): 297–300. doi:10.1016/0167-6377(87)90047-2.
- Baxter, Laurence A.; Lee, Seung Min (2009). "Further Properties of Reliability Importance for Continuum Structure Functions". Probability in the Engineering and Informational Sciences. 3 (2): 237. doi:10.1017/S026996480000111X. Unknown parameter
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