Multi-stage minimum risk point estimation strategies for comparing the locations from two negative exponential models and second-order asymptotics: illustrations with simulated data and bone marrow transplant data
DOI10.1007/s42519-023-00361-4zbMath1536.62076MaRDI QIDQ6537391
Anhar S. Aloufi, Nitis Mukhopadhyay
Publication date: 14 May 2024
Published in: Journal of Statistical Theory and Practice (Search for Journal in Brave)
two-stage samplingpurely sequential samplingnegative exponentialrisk efficiencymulti-stage samplingaccelerated sequential samplingthree-stage samplingunequal scalessecond-order regretsecond-order (s.o.) efficiencyfirst-order (f.o.) efficiency
Applications of statistics to biology and medical sciences; meta analysis (62P10) Sequential statistical analysis (62L10) Sequential estimation (62L12)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Sequential estimation of a linear function of location parameters of two negative exponential distributions
- Sequential analysis. Tests and confidence intervals
- A consistent and asymptotically efficient two-stage procedure to construct fixed width confidence intervals for the mean
- Asymptotic theory of triple sampling for sequential estimation of a mean
- Second order approximations for sequential point and interval estimation
- A nonlinear renewal theory with applications to sequential analysis. I
- A nonlinear renewal theory with applications to sequential analysis II
- Improved sequential estimation of means of exponential distributions
- Survival analysis. Techniques for censored and truncated data.
- Purely sequential minimum risk point estimation (MRPE) for a survival function in an exponential distribution: illustration with remission times for bladder cancer patients
- Purely sequential point estimation of a function of the mean in an exponential distribution
- Sample path analysis and distributions of boundary crossing times
- On the non-existence of tests of ``Student's hypothesis having power functions independent of \(\sigma\).
- Exact Bounded Risk Estimation When the Terminal Sample Size and Estimator Are Dependent: The Exponential Case
- Stage‐Wise Adaptive Designs
- Sequential estimation problems for negative exponential populations
- Sequential Methods and Their Applications
- Logistic Regression, Survival Analysis, and the Kaplan-Meier Curve
- Sequential estimation of the difference of means of two negative exponential populations
- Sequential methodologies for comparing exponential mean survival times
- Sequential Estimation of Location Parameter in Exponential Distributions
- Minimum risk point estimation (MRPE) of the mean in an exponential distribution under powered absolute error loss (PAEL) due to estimation plus cost of sampling
- Bounded risk estimation of a linear combination of location parameters in negative exponential distributions via three-stage sampling
- Fixed width confidence intervals for the location parameter of an exponential distribution
- A New Approach to Determine the Pilot Sample Size in Two-Stage Sampling
- On the Asymptotic Theory of Fixed-Width Sequential Confidence Intervals for the Mean
- On a sequential rule for estimating the location parameter of an exponential distribution
- Further Remarks on Sequential Estimation: The Exponential Case
- Two-stage estimation of the combination of location and scale parameter of the exponential distribution under the constraint of bounded risk per unit cost index
- A general theory of three-stage estimation strategy with second-order asymptotics and its applications
- Second-order (s.o.) multi-stage fixed-width confidence interval (FWCI) estimation strategies for comparing location parameters from two negative exponential (NE) populations: illustrations with cancer data
This page was built for publication: Multi-stage minimum risk point estimation strategies for comparing the locations from two negative exponential models and second-order asymptotics: illustrations with simulated data and bone marrow transplant data
