Obituary:

It is with deep sadness that we announce the passing of James (Jay/Jim) Crew Alexander, beloved husband, father, grandfather, brother and uncle on May 19, 2021 at the age of 79.  James is survived by his wife, Rosemary Alexander; his daughters, Stacey Sperry and Blythe Alexander; his grandchildren, Alexa and Lucia Sperry; his sister, Jean Small; his niece and nephew, Kalen Edwards and Douglas Small; and grandniece and grandnephew, Dalen and Bennett Small. He was preceded in death by his parents and his brother, John Alexander.

James was born in Ohio on March 22, 1942 to James E. Alexander and Jean (Crew) Alexander, and grew up in Ohio, Minnesota and Pennsylvania. He graduated from Mount Lebanon High School in Pittsburgh, PA in 1960. James was a Phi Beta Kappa graduate of Johns Hopkins University in 1964, and a member of the Sigma Phi Epsilon fraternity. He continued at Johns Hopkins to earn his Ph.D. in Mathematics in 1968. In 1969, he joined the Department of Mathematics faculty at the University of Maryland, College Park (UMD). While at UMD, he also served as Program Officer at the National Science Foundation (NSF) for a time. In 1998, he left UMD to join the Mathematics and Cognitive Science Departments at Case Western Reserve University (CWRU) until 2008 where he was Levi Kerr Professor and Department Chair of Mathematics and Chair of CWRU’s Faculty Senate. After retiring from CWRU, he worked again as a Program Officer at NSF until fully retiring in 2012. In 2014, a former UMD Ph.D. student of James’, endowed the James C. Alexander Prize for Graduate Research in Mathematics in his honor.

James met his wife Rosemary in 1971, and they were married on April 1, 1972. With his wife, he took two academic sabbaticals, moving to Mexico City, Mexico in 1974, and then to Bonn, (West) Germany in 1978. James and Rosemary raised their two daughters in Ellicott City, MD, before moving on for some years to Ohio, Virginia, and then back to Maryland. 

James was a devoted father, doting grandfather, and adored his wife. He enjoyed taking his wife on dates for most of their 50 years together, frequently attending the theater, concerts and lectures. James and Rosemary also enjoyed many trips together traveling the world. He was a life-long learner, an avid reader, played golf, badminton, tennis, and softball, as well as coached youth softball. After he retired, he learned and enjoyed cooking. His sense of humor, wit, charm, and ability to craft a good joke carried on throughout his last days. 

At this time, because of the pandemic, no memorial service is planned. James has donated his body to both the Johns Hopkins School of Medicine and to the Maryland State Anatomy Board. His family would appreciate anyone who wants to share memories, photos or videos about James to email them to  for the family’s private memory book collection. 

From his Obituary 

On Thursday, February 15, 2024, William Wells ”Bill” Adams of Silver Spring, Maryland, died peacefully. Beloved husband of Elizabeth Shaw Adams and devoted father of Ruth and Sarah (Dwight Shank) Adams, loving grandfather of Aaron, Hannah and Dylan, and dear brother of the late Carol Steele. Bill was a first generation college student who received his undergraduate degree from UCLA and his Ph.D. from Columbia University. He devoted most of his career to teaching and research in Mathematics at the University of Maryland, writing many articles and a few books on Number Theory. Bill was an avid birder who spent much of his free time looking to the trees in search of ever more elusive birds to add to his extensive life list (2,746 species). Bill shared his birding passion with his wife, Liz, and daughter, Ruth, many friends, and his grandson, Dylan. When not birding, Bill could be found ushering at many theaters in the area, cheering on his grandchildren in all their activities, solving Kenken, reading, playing cards, boating in Southold and cheering on the Washington Nationals and Maryland Terps. 

Report on the Occasion of his Retirement Mathematical Research 

William Adams received his Ph.D. from Columbia University in 1964 under Serge Lang. He then had positions at Berkeley, UCLA, and the Institute for Advanced Study. In 1966, he was hired as Associate Professor by Maryland and he was promoted to Professor in 1971. 

The most significant results of the first twenty years of Bill’s career were in the areas of Diophantine approximation and transcendence theory. The main purpose of Diophantine approximation is to study the approximation of real numbers by rational numbers. An easy application of the box principle, or of continued fractions, shows that, for a given real number α, there are infinitely many pairs of integers p, q such that |qα − p| < 1/q. For all α outside a set of measure zero, the number of solutions of this inequality with 1 ≤ q ≤ x is asymptotic to 2 log x as x → ∞. One of Bill’s early, striking results is that the number of solutions to |qe − p| < 1/q with |q| ≤ x is asymptotic to a constant times (log x/ log log x)^3/2 as x → ∞. This shows that e does not behave like most real numbers in this regard. 

It is well-known that if α is a quadratic irrational, then |qα − p| < 1/(q√5) has infinitely many solutions, and that 1/√5 is the best constant that works for all α. Now suppose that K ⊂ R is a cubic extension of Q and let {1, β₁, β₂} be a basis of K as a Q-vector space. Let c₀ > 0 be the infimum of constants c such that 

|qβ₁ − p₁| < (c/q)1/2, |qβ₂ − p₂| < (c/q)1/2 

has infinitely many solutions in integers p₁, p₂, q, and let C₀ be the supremum of the c₀ as K and β₁, β₂ vary. Cassels and Davenport showed that 2/7 ≤ C₀ ≤ 46−1/4(more generally, for any β₁, β₂ ∈ R such that {1, β₁, β₂} is linearly independent over Q). In a series of papers, Bill completely settled the question in the cubic case by showing that in fact C₀ = 2/7. 

In the area of transcendence theory, Bill developed a p-adic analogue of Gel'fond and Schneider’s theory of transcendence and algebraic differential equations. This gave new proofs of the transcendency of the p-adic numbers eα and αβ, where α and β are p-adic numbers algebraic over Q (satisfying some standard conditions), and also gave the first p-adic transcendence measures for such numbers. He also proved that if β has degree r ≥ 4 over Q, then the transcendence degree over Q of Q(αβ, αβ2, . . . , αβr−1) is at least 2. 

In the late 1980s, Bill started working in computational ring theory, in partic ular the theory of Gröbner bases. Recall that a polynomial ring in one variable over of field is a principal ideal domain and the generator of an ideal can be found from a set of generators, essentially by the Euclidean algorithm. This is no longer possible for polynomials in several variables. The Gröbner basis algorithm, which is in some ways a cross between the Euclidean algorithm and the Gaussian reduction algorithm from linear algebra, is a replacement that finds generators of ideals in rings of polynomials in several variables. The method, which found early success in Hironaka’s work on resolution of singularities, is now indispensable in many computer algebra calculations. One of Bill’s most important contributions to the subject is his book An Introduction to Gröbner Bases, written jointly with Philippe Loustaunau. This is a well-written introduction to the subject and is described by Math. Reviews as “excellent” (I have read the book and heartily agree). Bill has written many papers on Gröbner bases and their applications. As an example of how wide reaching the techniques are, consider the following result from a paper written by Adams jointly with Berenstein, Loustaunau, Sabadini, and Struppa. Let K be a compact subset of n-dimensional quaternionic space Hⁿ, with n > 1, such that Hⁿ \K is connected. If f is a regular function on Hⁿ \K, then f extends to an entire function. This is of course the analogue of Hartogs’ theorem in several complex variables. It was proved by Pertici, but the proof in the present paper is almost purely algebraic. 

They consider the Cauchy–Fueter complex of differential operators whose solution sheaf is the sheaf of regular functions of several quaternionic variables, and they study a free resolution of this complex. Gröbner basis techniques allow them to prove the vanishing of some of its Ext-modules and explicitly calculate the degrees of syzygies. It is quite surprising that these techniques work even in this non-commutative setting. This and related papers are featured in the book Analysis of Dirac Systems and Computational Algebra by Colombo, Sabadini, Sommen, and Struppa (Birkhäuser, 2004). 

Teaching Accomplishments 

Bill had a distinguished career in teaching. On the graduate level, he directed 13 Ph.D. theses and 4 M.A. theses and has taught numerous graduate courses. On the undergraduate level, he excelled in both large lectures and small sections, and he was the advisor for many undergraduates. He gave several talks to high school students, including one to the US Mathematical Olympiad Team. In the summer of 1990, he and L. Washington co-mentored three students from the Research Science Institute (including future Fields Medalist Terry Tao). 

Three times, for a total of 8 years, Bill served as Associate Chair for Un dergraduate Studies. He also served on numerous curriculum development and review committees. 

Service 

Bill had an impressive service record at both the national and the local levels. He served for two and one half years as the Program Director for Algebra/Number Theory for the National Science Foundation. He was the Editor for Number Theory for the Proceedings of the American Math. Society for 9 years, and was Associate Editor of the Journal of Symbolic Computation for 7 years. 

In the early 1990’s, Bill was Project Director for the JPBM Committee on Professional Recognition and Rewards. This was a major committee sponsored by the AMS, MAA, and SIAM, and Bill personally conducted 19 site visits at various universities during his directorship. 

At the university level, Bill served on the Faculty Senate and many com mittees for the Faculty Senate, including chair of the Senate Faculty Affairs Committee, several program review committees, and several search commit tees. At the department level, in addition to being Undergraduate Chair, he served on numerous committees. 

Bill helped design and was the main organizer of the new Developmental Mathematics Program in the mathematics department. This very successful program was featured as the cover story in the December 2003 issue of Focus, a publication of the MAA.Finally, Bill deserves much credit for building the number theory group at the University of Maryland. He arrived at Maryland at the same time as 

L. Goldstein and H. Jacquet. In the next few years, G. Cooke, T. Kubota, D. Garbanati, M. Razar, and S. Kudla were hired. Bill was one of the main organizers of the Special Year in Number Theory in 1977-1978, which featured talks by many of the top number theorists in the world and which resulted in the hiring of L. Washington and D. Zagier. Bill’s efforts over the years greatly enhanced the university’s international reputation. 

Bill played an unintended role in the history of the University. He openly opposed an action of the administration in response to some campus protests in the late 1960’s. In retaliation, the administration turned down his promotion to full professor. The chair of the math department resigned in protest, and Kirwan (for whom our building is named) became acting chair, starting him on the path that led to becoming chancellor of the Maryland system. During the controversy, one of the regents told Bill Adams, ”You’re too idealistic to work in a university.” No comment, except that Bill was very idealistic and principled, and a wonderful person.