The maximum size of the planar sections of random spheres and its application to metallurgy
- 1 March 1996
- journal article
- Published by Springer Nature in Annals of the Institute of Statistical Mathematics
- Vol. 48 (1) , 127-144
- https://doi.org/10.1007/bf00049294
Abstract
No abstract availableKeywords
This publication has 16 references indexed in Scilit:
- Inclusion rating by statistics of extreme values and its application to fatigue strength prediction and quality control of materialsJournal of Research of the National Institute of Standards and Technology, 2012
- Tail Behavior in Wicksell’s Corpuscle ProblemPublished by Springer Nature ,1992
- The Measurement of Particle Size Distribution of Al2O3 Inclusion in Ultra Low Oxygen SteelTetsu-to-Hagane, 1991
- The kernel method for unfolding sphere size distributionsJournal of Computational Physics, 1988
- Effect of toughness and inclusion on fatigue strength of high strength steel.TRANSACTIONS OF THE JAPAN SOCIETY OF MECHANICAL ENGINEERS Series A, 1988
- Estimation of the Generalized Extreme-Value Distribution by the Method of Probability-Weighted MomentsTechnometrics, 1985
- Quantitative Evaluation of MnS Inclusion in Rolled Steels Detected by Ultrasonic TestingTetsu-to-Hagane, 1985
- Penultimate limiting forms in extreme value theoryAnnals of the Institute of Statistical Mathematics, 1984
- Convergence rates for the ultimate and pentultimate approximations in extreme-value theoryAdvances in Applied Probability, 1982
- The Effect of Ingot Size and Capping Time on the Distribution, Composition and Type of Non-Metallic Inclusion in Large Rimming IngotsTetsu-to-Hagane, 1968