https://orcid.org/0000-0001-7871-7499
References
- Bakir, S. T. 2006. “Distribution-Free Quality Control Charts Based on Signed-Rank-Like Statistics.” Communications in Statistics -- Theory and Methods 35 (4): 743–757.
- Capizzi, G., and G. Masarotto. 2013. “Phase I Distribution-free Analysis of Univariate Data.” Journal of Quality Technology 45 (3): 273–284.
- Celano, G., and P. Castagliola. 2018a. “An EWMA Sign Control Chart with Varying Control Limits for Finite Horizon Processes.” Quality and Reliability Engineering International 34 (8): 1717–1731.
- Celano, G., and P. Castagliola. 2018b. “The Shewhart F Control Chart for Monitoring Processes with Finite Number of Inspections.” Quality and Reliability Engineering International 34 (8): 1685–1698.
- Celano, G., P. Castagliola. S. Chakraborti and G. Nenes. 2016a. “On the Implementation of the Shewhart Sign Control Chart for Low-volume Production.” International Journal of Production Research 54 (19): 5886–5900.
- Celano, G., P. Castagliola. S. Chakraborti and G. Nenes. 2016b. “The Performance of the Shewhart Sign Control Chart in Processes with a Finite Production Horizon.” International Journal of Advanced Manufacturing Technology 84 (5–8): 1497–1512.
- Celano, G., P. Castagliola, S. Fichera, and E. Trovato. 2013. “Performance of t Control Charts in Short Runs with Unknown Shift Sizes.” Computers and Industrial Engineering 64 (1): 56–68.
- Chakraborti, S. 2000. “Run Length, Average Run Length, and False Alarm Rate of Shewhart X¯ Chart: Exact Derivations by Conditioning.” Communications in Statistics -- Simulation and Computation 29 (1): 61–81.
- Chakraborti, S., P. van der Laan, and M. A. van de Wiel. 2004. “A Class of Distribution-Free Control Charts.” Journal of the Royal Statistical Society. Series C (Applied Statistics) 53 (3): 443–462.
- Chakraborti, S. and M. A. Graham. 2019a. “Nonparametric (Distribution-free) Control Charts: An Updated Overview and Some Results.” Quality Engineering 31 (4): 523–544.
- Chakraborti, S., and M. A. Graham. 2019b. Nonparametric Statistical Process Control. Hoboken, NJ: Wiley.
- Chakraborti, S. and R. Sparks. 2020. “Distribution-free Methods for Statistical Process Monitoring and Control.” Chap. Statistical Process Monitoring and the Issue of Assumptions in Practice, 137–156. Springer.
- Chakraborti, S. and M. A. van de Wiel.2008. IMS Collections. Beyond Parametrics in Interdisciplinary Research: Festschrift in Honor of Professor Pranab K. Sen, 156–172. Institute of Mathematical Statistics.
- Del Castillo, E. and D. C. Montgomery. 1993. “Optimal Design of Control Charts for Monitoring Short Production Runs.” Economic Quality Contro 8 (4): 225–240.
- Del Castillo, E. and D. C. Montgomery. 1996. “A General Model for the Optimal Economic Design of X¯ Charts Used to Control Short Or Long Run Processes.” IIE Transactions 28 (3): 193–201.
- Hou, S., and K. Yu. 2020. “A Non-Parametric CUSUM Control Chart for Process Distribution Change Detection and Change Type Diagnosis.” International Journal of Production Research 1–21.
- Jardim, F. S., S. Chakraborti and E. K. Epprecht:. 2019a. “Chart with Estimated Parameters: the Conditional ARL Distribution and New Insights.” Production and Operations Management 28 (6): 1545–1557.
- Jardim, F. S., S. Chakraborti and E. K. Epprecht:. 2019b. “Two Perspectives for Designing a Phase II Control Chart with Estimated Parameters: the Case of the Shewhart Chart.” Journal of Quality Technology 52 (2): 198–217.
- Li, C., A. Mukherjee, Q. Su, and M. Xie. 2016. “Optimal Design of a Distribution-free Quality Control Scheme for Cost-efficient Monitoring of Unknown Location.” International Journal of Production Research 54 (24): 7259–7273.
- Li, S.-Y., L.-C. Tang, and S.-H. Ng. 2010. “Nonparametric CUSUM and EWMA Control Charts for Detecting Mean Shifts.” Journal of Quality Technology 42 (2): 209–226. doi:https://doi.org/10.1080/00224065.2010.11917817.
- Malela-Majika, J. C. 2020. “New Distribution-free Memory-type Control Charts Based on the Wilcoxon Rank-sum Statistic.” Quality Technology & Quantitative Management 0 (0): 1–21.
- Malela-Majika, J. C., S. Chakraborti, and M. A. Graham. 2016. “Distribution-free Phase II Mann–Whitney Control Charts with Runs-Rules.” International Journal of Advanced Manufacturing Technology 86 (1-4): 723–735.
- Nenes, G., and G. Tagaras. 2006. “The Economically Designed CUSUM Chart for Monitoring Short Production Runs.” International Journal of Production Research 44 (8): 1569–1587.
- Qiu, P. 2014. Introduction to Statistical Process Control. Boca Raton(USA): Chapman and Hall.
- R Core Team. 2019. R: A Language and Environment for Statistical Computing. Vienna: R Foundation for Statistical Computing. https://www.R-project.org.
- Wang, D., L. Zhang, and Q. Xiong. 2017. “A Non Parametric CUSUM Control Chart Based on the Mann-Whitney Statistic.” Communications in Statistics -- Theory and Methods 46 (10): 4713–4725.
- Zhou, C., C. Zou, Y. Zhang, and Z. Wang. 2009. “Nonparametric Control Chart Based on Change-point Model.” Statistical Papers 50: 13–28.