References
- Chang, J.T. (1992). On moments of the first ladder height of random walks with small drift. Ann. Appl. Prob. 2:714–738.
- Coad, D.S., Woodroofe, M. (1998). Approximate bias calculations for sequentially designed experiments. Seq. Anal. 17:1–31.
- Ding, K., Wu, Y. (2006). On the biases of change point and change magnitude estimation after CUSUM test. J. Stat. Plann. Inf. 136:1258–1280.
- Siegmund, D. (1978). Estimation following Sequential tests. Biometrika 65:341–349.
- Siegmund, D. (1979). Corrected diffusion approximations in certain random walk problems. Adv. Appl. Prob. 11:701–719.
- Siegmund, D. (1985). Sequential Analysis: Tests and Confidence Intervals. New York: Springer.
- Srivastava, M.S., Wu, Y. (1999). Quasi-stationary biases of change point and change magnitude estimation after sequential CUSUM test. Seq. Anal. 18:203–216.
- Stone, C. (1965). On moment generating functions and renewal theory. Ann. Math. Stat. 36:1298–1301.
- Whitehead, J. (1986). On the bias of maximum likelihood estimation following a sequential test. Biometrika 73:573–581.
- Woodroofe, M. (1992). Estimation after sequential testing: A simple approach for a truncated sequential probability ratio test. Biometrika 79:347–352.
- Wu, Y. (2004). Bias of change point estimator detected by a CUSUM procedure. Ann. Inst. Stat. Math. 56:127–142.
- Wu, Y. (2005). Inference for Change-point and Post-change Means after a CUSUM Test. Lecture Notes in Statistics(p. 180), New York: Springer.
- Wu, Y. (2006). Inference for post-change mean detected by a CUSUM procedure. J. Stat. Plann. Inf. 136:3625–3646.
- Wu, Y. (2007). Detecting sparse signals with a large scale of sequential probability ratio tests. Proceedings of 2006 Joint Statistical Meeting, Seattle, pp 1253–1259.