James Lewin McGregor

James Lewin McGregor's AcademicInfluence.com Rankings

Mathematics

#9619

Historical Rank

Measure Theory

#3478

Historical Rank

mathematics Degrees

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Mathematics

Why Is James Lewin McGregor Influential?

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According to Wikipedia, James Lewin McGregor was a mathematician who introduced Karlin–McGregor polynomials. A native of Canada he served in the Canadian military during World War II. He received his undergrad degree from the University of British Columbia. He received his PhD from Cal Tech and then became a professor of mathematics at Stanford University.

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James Lewin McGregor's Published Works

Number of citations in a given year to any of this author's works

Total number of citations to an author for the works they published in a given year. This highlights publication of the most important work(s) by the author

Published Works

The differential equations of birth-and-death processes, and the Stieltjes moment problem (1957) (445)
The classification of birth and death processes (1957) (327)
COINCIDENT PROPERTIES OF BIRTH AND DEATH PROCESSES (1959) (174)
Polymorphisms for genetic and ecological systems with weak coupling. (1972) (161)
Application of method of small parameters to multi-niche population genetic models. (1972) (154)
Many server queueing processes with Poisson input and exponential service times (1958) (153)
The number of mutant forms maintained in a population (1967) (153)
Towards a theory of the evolution of modifier genes. (1974) (152)
LINEAR GROWTH, BIRTH AND DEATH PROCESSES (1958) (147)
Addendum to a paper of W. Ewens. (1972) (138)
Ehrenfest urn models (1965) (98)
Elementary Partial Differential Equations (1966) (87)
On a Genetics Model of Moran (1962) (79)
DIRECT PRODUCT BRANCHING PROCESSES AND RELATED MARKOV CHAINS. (1964) (68)
Rates and probabilities of fixation for two locus random mating finite populations without selection. (1968) (65)
Embeddability of discrete time simple branching processes into continuous time branching processes (1968) (62)
Classical diffusion processes and total positivity (1960) (61)
Linear Growth Models with Many Types and Multidimensional Hahn Polynomials (1975) (54)
Embedding iterates of analytic functions with two fixed points into continuous groups (1968) (53)
A CHARACTERIZATION OF BIRTH AND DEATH PROCESSES. (1959) (53)
On mutation selection balance for two-locus haploid and diploid populations. (1971) (40)
The evolutionary development of modifier genes. (1972) (36)
Generalized translation operators (1954) (34)
REPRESENTATION OF A CLASS OF STOCHASTIC Processes. (1955) (33)
Occupation Time Laws for Birth and Death Processes (1961) (26)
Solvability criteria for certain N-dimensional moment problems☆ (1980) (26)
Spectral theory of branching processes. I (1966) (24)
Determinants of orthogonal polynomials (1962) (22)
Extremal Properties Of Hermitian Matrices (1956) (20)
The role of the poisson progeny distribution in population genetic models (1968) (18)
The rate of production of recombinants between linked genes in finite populations (1967) (13)
Spectral representation of branching processes. II (1966) (8)
TOTAL POSITIVITY OF FUNDAMENTAL SOLUTIONS OF PARABOLIC EQUATIONS (1962) (7)
Equilibria for genetic systems with weak interaction (1972) (7)
Parabolic Cylinder Functions of Large Order (1954) (6)
On the spectral representation of branching processes with mean one (1968) (5)
Properties of the Stationary Measure of the Critical Case Simple Branching Process (1967) (4)
Some Properties of Determinants of Orthogonal Polynomials (1975) (4)
An integral of the Perron type (1951) (3)
Uniqueness of stationary measures for branching processes and applications (1967) (3)
The application of the minimal energy hypothesis to a Casson fluid. (1970) (2)
Modern Probability Theory and Its Applications (Emanuel Parzen) (1961) (0)
ON THE HOMOLOGY AND HOMOTOPY DECOMPOSITION OF CONTINUOUS MAPS (0)

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