Recent

• Selden Crary, “Beyond Design of Experiments (DOE)“, presented to the Silicon-Valley Chapter of the American Society of Quality, Jan. 15, 2020.
• Selden Crary, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. III. The IMSPE is a LDTRGF in the Cartesian coordinates of vector displacements between any two design points,” Aug. 12, 2019, updated Oct. 22, 2019, https://www.authorea.com/users/270307/articles/402716-the-nu-class-of-low-degree-truncated-rational-generalized-functions-iii-the-imspe-is-a-ldtrgf-in-the-cartesian-coordinates-of-vector-displacements-between-any-two-design-points.
• Selden Crary, Richard Diehl Martinez, Michael Saunders, Amin Mobasher, Nikoloz Chkonia, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. II. IMSPE in Design of Computer Experiments: Low-N, Multifactor, Free-Ranging, Optimal Designs,” Jul. 10, 2019, https://www.authorea.com/users/270307/articles/382230-the-nu-class-of-low-degree-truncated-rational-generalized-functions-ii-imspe-in-design-of-computer-experiments-low-n-multifactor-free-ranging-optimal-designs.

Publications

• S. B. Crary and O. E. Vilches, “Modification of the Low-Density Phases of Adsorbed Helium Monolayer Films Produced by Changes in the Adsorbing Substrate”, Phys. Rev. Lett. 38 (17), pp. 973-976 (1977).
• R. J. Dionne, S. B. Crary, and R. B. Hallock, “Further study of the Kosterlitz-Thouless Transition in 4He films,” Phys. Rev. B 33 (3), pp. 1997-1999 (1986).
• Selden B. Crary, “Thermal Management of Integrated Microsensors,” Sensors and Actuators 12, pp. 303–312 (1987).
• S. B. Crary, “The Finite-Element Method for Microsensors,” Journal of the Electrochemical Society 134 (1111), pp. 2937-2940 (1987).
• S. B. Crary and D. A. Fahey, “Analysis of Critical-Exponent Data Using Efron’s Bootstrap Technique,” Phys. Rev. B 35 (4), pp. 2102-2104 (1987).
• Selden B. Crary, Wayne G. Baer, John C. Cowles, and Kensall D. Wise, “Digital Compensation of High-Performance Silicon Pressure Transducers,” Sensors and Actuators A (Physical) 21 (1-3), Elsevier, pp. 70-72 (1990).
• M. E. Sherwin, G. O. Munns, M. E. Elta, E. G. Woelk, S. B. Crary, F. L. Terry, and G. I. Haddad, “The optimization of InxGa1-xAs and InP growth conditions by CBE,” Journal of Crystal Growth 111, pp. 594-598 (1991).
• M. E. Snow and S. B. Crary, “The Use of Simulated Annealing in the I-Optimal Design of Experiments,” The Michigan Academician XXIV (2), pp. 343-354 (1992).
• S.B. Crary, L. Hoo, M. Tennenhouse (1992), “I-optimality Algorithm and Implementation,” Computational Statistics 2, pp. 209-214 (1992).
• S. Kota, S., G. K. Ananthasuresh, S. B. Crary, and K. D. Wise, “Design and Fabrication of Microelectromechanical Systems”, ASME Journal of Mechanical Design 116 (4), pp. 1081-1088 (1994).
• L. Saggere, S. Kota and S. B. Crary, “A New Design for Suspension of Linear Microactuators,” ASME Journal of Dynamic Systems and Control 55-2, ASME, pp. 671-675 (1994).
• Selden B. Crary and Cosimo Spera, “Optimal experimental design for combinatorial problems,” Computational Economics 9 (3), Springer Netherlands, Kluwer Academic Publishers, pp. 241-255 (1996).
• Y.B. Gianchandani and S.B. Crary; “Parametric Modeling of a Microaccelerometer: Comparing I- and D-Optimal Design of Experiments for Finite Element Analysis,” JMEMS 7, pp. 274-282 (1998).
• Thomas E. Moore, Selden B. Crary, Daniel Koditschek, and Todd A. Conklin, “Directed Locomotion in Cockroaches: “Biobots”,” ACTA Entomological Slovenica 6 (2), Ljubljana, Slovenia, pp. 71-78 (1998).
• Selden B. Crary, Peter Cousseau, David Armstrong, David M. Woodcock, Eva H. Mok, Olivier Dubochet, Philippe Lerch, and Philippe Renaud, “Optimal Design of Computer Experiments for Metamodel Generation Using I-OPT,” Computer Modeling in Engineering and Sciences 1, pp. 127-140 (2000). Earlier, conference version available at: http://www.comppub.com/publications/MSM/99/pdf/M3302.pdf.
• Pedram Mohseni, Karthik Nagarajan,Babak Ziaie, Khalil Najafi, and Selden B. Crary, “An Ultra-Light Biotelemetry Backpack for Recording EMG Signals in Moths,” IEEE Trans. Biomed. Eng., 48 (6), pp. 734-737 (2001).
• Selden B. Crary, “Design of Computer Experiments for Metamodel Generation,” Analog Integrated Circuits and Signal Processing 32, pp. 7-16 (2002).
• Selden B. Crary, “New Research Directions in Computer Experiments: epsilon-Clustered Designs,” Spring Research Conference (SRC 2012), Cambridge, MA, June 13-15, 2012, published in JSM Proceedings, Statistical Computing Section, Alexandria, VA, USA: ASA, pp. 5692-5706 (2012). Corrected version of October 10, (2013).
• Selden Crary, “Factorization of the Determinant of the Gaussian-Correlation Matrix of Evenly Spaced Points Using an Inter-dimensional Multiset Duality,” (2014), https://arxiv.org/abs/1406.6326.
• Selden Crary, Jan Stormann, “Four-Point, 2D, Free-Ranging, IMSPE-Optimal, Twin-Point Designs,” (2015), https://arxiv.org/abs/1510.01685.
• Selden Crary, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. I. IMSPE in Design of Computer Experiments: Integrals and Very-Low-N, Single-Factor, Free-Ranging Designs,” (2016, updated 2019), https://arxiv.org/abs/1604.05278.
• Selden Crary, Tatiana Nizhegorodova, Michael Saunders, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. Ia. MINOS for IMSPE Evaluation and Optimal-IMSPE-Design Search,” (2017, updated 2019), https://arxiv.org/abs/1704.06250.
• Selden Crary, Richard Diehl Martinez, Michael Saunders, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. Ib. Integrals of Matern-correlation functions for all odd-half-integer class parameters”, (2017, updated 2019), https://arxiv.org/abs/1707.00705.
• Nikoloz Chkonia, Selden Crary, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. Ic. IMSPE-optimal designs with circular-disk prediction domains,” (2017, updated 2019), https://arxiv.org/abs/1709.09599.
• Selden Crary, Richard Diehl Martinez, Michael Saunders, Amin Mobasher, Nikoloz Chkonia, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. II. IMSPE in Design of Computer Experiments: Low-N, Multifactor, Free-Ranging, Optimal Designs,” Jul. 10, 2019, https://www.authorea.com/users/270307/articles/382230-the-nu-class-of-low-degree-truncated-rational-generalized-functions-ii-imspe-in-design-of-computer-experiments-low-n-multifactor-free-ranging-optimal-designs.
• Selden Crary, “The Nu Class of Low-Degree-Truncated, Rational, Generalized Functions. III. The IMSPE is a LDTRGF in the Cartesian coordinates of vector displacements between any two design points,” Aug. 12, 2019, updated Oct. 22, 2019, https://www.authorea.com/users/270307/articles/402716-the-nu-class-of-low-degree-truncated-rational-generalized-functions-iii-the-imspe-is-a-ldtrgf-in-the-cartesian-coordinates-of-vector-displacements-between-any-two-design-points.

More than 35 conference publications, including:

Conference papers

• Selden Crary, “Applications of Epsilon-Clustered Designs“, presented at the US Army Conference on Applied Statistics, Monterey, CA, Oct. 24-26, 2012.
• Selden Crary, “Optimal-Design Search Under the IMSPE Objective“, presented at COMPSTAT 2016, Oviedo, Spain, Aug. 23-24, 2016.

General-technical-audience talks

• Selden Crary, “Beyond Design of Experiments (DOE)“, presented to the Silicon-Valley Chapter of the American Society of Quality, Jan. 15, 2020.