From Wikipedia, the free encyclopedia
Serge B. Provost is a
full professor at the
University of Western Ontario in the Department of Statistical and Actuarial Sciences.
[1]
Books
Mathai, A. M.; Provost, Serge B.; Hayakawa, Takesi (1995). Bilinear Forms and Zonal Polynomials . New York, NY:
Springer New York .
doi :
10.1007/978-1-4612-4242-0_2 .
ISBN
978-1-4612-4242-0 .
OCLC
852789931 .
[2]
Mathai, A. M.; Provost, Serge B.; Haubold, H.J. (2022). Multivariate statistical analysis in the real and complex domains . Cham.
doi :
10.1007/978-3-030-95864-0_13 .
ISBN
978-3-030-95864-0 .
OCLC
1347381548 . {{
cite book }}
: CS1 maint: location missing publisher (
link )
Mathai, A. M.; Provost, Serge B. (1992). Quadratic forms in random variables : theory and applications . New York: M. Dekker.
ISBN
0-8247-8691-2 .
OCLC
24953650 .
[3]
Saboor, Abdus; Provost, Serge B.; Ahmad, Munir (2010). Univariate and Bivariate Gamma-Type Distributions .
Lambert Academic Publishing .
ISBN
978-3838345536 .
Selected publications
Provost, Serge B.; Ha, Hyung-Tae (2015-06-29).
"Distribution approximation and modelling via orthogonal polynomial sequences" . Statistics : 1–17.
doi :
10.1080/02331888.2015.1053809 .
ISSN
0233-1888 .
Jiang, Min; Provost, Serge B. (2014-03-04).
"A hybrid bandwidth selection methodology for kernel density estimation" . Journal of Statistical Computation and Simulation . 84 (3): 614–627.
doi :
10.1080/00949655.2012.721366 .
ISSN
0094-9655 .
Mathai, Arak M.; Provost, Serge B. (2022-07-04).
"On the singular gamma, Wishart, and beta matrix‐variate density functions" . Canadian Journal of Statistics : cjs.11710.
doi :
10.1002/cjs.11710 .
ISSN
0319-5724 .
Provost, Serge B.; Yang, Zhaoqi; Ahmed, S. Ejaz (June 2022).
"Securing Density Estimates via Smooth Moment-Based Empirical Distribution Function Approximants" . Journal of the Indian Society for Probability and Statistics . 23 (1): 1–18.
doi :
10.1007/s41096-022-00119-4 .
ISSN
2364-9569 .
References
^
"Serge Provost" . University of Western Ontario .
^ Reviews of Bilinear forms and zonal polynomials :
^ Reviews of Quadratic Forms in Random Variables :