Walter Morris (left) playing Rosendo Balinas in 1989.

T. Miles vs W. Morris, 1980

Updated: Jul 29, 2024, 5:48 AM | 0

Miles vs Morris, 1980

by David Joyner and Geoff Goodson

According to [1], Walter Duff Morris was born September 2, 1958 in Austin, Texas, USA, but spent much his early life in Iowa. His parents divorced several months before the first Fischer-Spassky match in 1972. Morris stayed with his father (a B player) in Ames and they played a lot of chess. In the 1970s, Morris learned the latest chess news from his subscriptions to 64 and Shachmatny Bulletin. When he visited his mother in Oslo, he spent a lot of time at the club Oslo Schakselskap. Morris got his IM title in 1979.

In 1980 his undergraduate advisor A. M. Fink at Iowa State University got Morris interested in the graph isomorphism problem and encouraged him to apply to grad school. After he was accepted to the Cornell ORIE program, that was it for chess. He stopped playing in international tournaments in 1982, but there was a brief flurry in 1989 when he hosted Alexei Dreev and Vladimir Epishin for a tournament they played in together [2].

He is currently a mathematics professor at George Mason University in Virginia. Morris received his B.S. in mathematics from Iowa State University in 1980 and his PhD in Operations Research from Cornell in 1986.

Anthony John Miles was born on April 25, 1955 in Birmingham, England, and was the first Englishman to become a chess grandmaster (1974). Tony won silver at the World Junior Chess Championships in 1973, beating the eventual winner Alexander Beliavsky and won this tournament the following year. During this time, he was majoring in mathematics at the University of Sheffield but gave up his degree to concentrate on chess.

His many significant wins include beating Smyslov, Tal, Spassky and even Karpov (when Karpov was world champion, with the unusual opening 1. e4 a6). In fact, his win over Karpov with 1. e4 a6 was in 1980, the same year the game below was played. He never beat Garry Kasparov. Tony was no stranger to controversy, for example needing a draw to win a Luton tournament, the officials gave the unusual score of 0-0 when he and his opponent agreed to a draw without making a move.

A man who suffered from diabetes, Miles died from heart failure on 12 November 2001. His body was found at his home in Harborne, Birmingham [3].

References:

[1] https://www.chessgames.com/player/walter_d_morris.html

[2] Email communication from Walter Morris, but see also https://chessctr.org/the-capital-international-tournaments/

[3] https://en.wikipedia.org/wiki/Tony_Miles

The game was played in a tournament in Baerum, Norway on 1980-08-20. Miles (then rated 2545) actually won the tournament and this game with Morris (then rated 2380) was his only loss.

King's Indian, Samisch Variation (E80 or E81).

d4 Nf6 2. c4 g6 3. Nc3 Bg7 4. e4 d6 5. f3 O-O 6. Bg5 c5 7. d5 e6 8. Nge2 h6
Be3 exd5 10. cxd5 b6

Here Black could have played Nbd7, the idea being that if White plays Qd2 and g4 then … Ne5 looks strong. Of course, White could defend against … Nc4 by playing Qd2 and Ng3, but this effectively prevents g4.

Qd2 Kh7

Actually, it’s not clear that Bxh6 is threatened: if 12. … Nbd7 13 Bxh6 then Black can play 13 … Nxe4. If White takes the knight with 14. fxe4 or Nxe4 then 14 … Qh4+ wins the White Bishop.

g4 Nbd7 13. Ng3 Ne5 14. Be2 Ba6!

Obviously, White can’t take the bishop without losing his queen.

h4 Bxe2 16. Qxe2 c4 17. g5

Better was 17.O-O, after which the position is about even. Now, Black is slightly better due to the awkward position of White’s king.

17... Nd3+ 18. Kd2 Ng8 19. gxh6 Be5 20. f4 Nxf4 21. Qxc4 Nf6 22. Raf1 N6h5

Nxh5 Nxh5 24. Rf3 b5! 25. Qc6

Better was 25. Qd3, protecting the king. Of course, Qxb5? Leads to … Rb8 and then … Rxb2+

25... b4

Another good option for Black was 25 … Rc8 – if 26 Qxb4 then 26 … Rb8 followed by 27 … Rxb2+

Ne2 Nf6

Again, 25 … Rc8 was good. However, the very tempting move 25 … Bxb2 allows White to coordinate rooks with Rhf1.

Kd3?!

While counterintuitive, 27. Rhf1 was better. In this case, Black could respond with 27 … Nxe4+ 28 Kd3 f5. However, then White can play Qb7+ followed by either Nf4 or h5 and his situation isn’t too bad.

27... Qe7 28. Bg5 Bxb2 29. e5?

This simply drops a pawn. Better was 29. Rf4 or even Bxf6. Black now has a decisive advantage.

29... Bxe5 30. Rhf1 Rac8 31. Qa6 Rfe8 32. Re3 Qc7 33. Rc1 Qd7 34. Rxe5 Rxc1 35. Rxe8 Qf5+ 36. Kd2 Rc2+ 37. Kd1 Rb2 38. Nd4 Qb1+ 39. Bc1 Nxe8 40. Qc4 f5 41. Nf3 Qxa2 42. Ng5+ Kxh6 43. Ne4+ Kh7 44. Qd4 Rh2

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This post is copied from my earlier post here.

Conel Hugh O’Donel Alexander (1909-1974), late British chess champion. Alexander may not have had a PhD in mathematics but taught mathematics and he did mathematical work during WWII (code and cryptography), as did the famous Soviet chess player David Bronstein (see the book Kahn, Kahn on codes). He was the strongest English player after WWII, until Jonathan Penrose appeared.
Adolf Anderssen (1818-1879). Pre World Championships but is regarded as the strongest player in the world between 1859 and 1866. He received a degree (probably not a PhD) in mathematics from Breslau University and taught mathematics at the Friedrichs gymnasium from 1847 to 1879. He was promoted to Professor in 1865 and was given an honorary doctorate by Breslau (for his accomplishments in chess) in 1865.
Magdy Amin Assem (195?-1996) specialized in p-adic representation theory and harmonic analysis on p-adic reductive groups. He published several important papers before a ruptured aneurysm tragically took his life. He was IM strength (rated 2379) in 1996.
Gedeon Barcza (1911-1986), pronounced bartsa, was a Hungarian professor of mathematics and a chess grandmaster. The opening 1.Nf3 d5 2.g3 is called the Barcza System. The opening 1.e4 e6 2.d4 c5 is known as the Barcza-Larsen Defense.
Ludwig Erdmann Bledow (1795-1846) was a German professor of mathematics (PhD). He founded the first German chess association, Berliner Schachgesellschaft, in 1827. He was the first person to suggest an international chess tournament (in a letter to von der Lasa in 1843). His chess rating is not known but he did at one point win a match against Adolf Anderssen.
Robert Coveyou (1915 – 1996) completed an M.S. degree in Mathematics, and joined the Oak Ridge National Laboratory as a research mathematician. He became a recognized expert in pseudo-random number generators. He is known for the quotation “The generation of random numbers is too important to be left to chance,” which is based on a title of a paper he wrote. An excellent tournament chess player, he was Tennessee State Champion eight times.
Nathan Divinsky (1925-2012) earned a PhD in Mathematics in 1950 from the University of Chicago and was a mathematics professor at the University of British Columbia in Vancouver. He tied for first place in the 1959 Manitoba Open.
Noam Elkies (1966-), a Professor of Mathematics at Harvard University specializing in number theory, is a study composer and problem solver (ex-world champion). Prof. Elkies, at age 26, became the youngest scholar ever to have attained a tenured professorship at Harvard. One of his endgame studies is mentioned, for example, in the book Technique for the tournament player, by GM Yusupov and IM Dvoretsky, Henry Holt, 1995. He wrote 11 very interesting columns on Endgame Exporations (posted by permission).
Some other retrograde chess constructions of his may be found at the interesting Dead Reckoning web site of Andrew Buchanan.
See also Professor Elkies’s very interesting Chess and Mathematics Seminar pages.
Thomas Ernst earned a Ph.D. in mathematics from Uppsala Univ. in 2002 and does research in algebraic combinatorics with applications to mathematical physics. His chess rating is about 2400 (FIDE).
Machgielis (Max) Euwe (1901-1981), World Chess Champion from 1935-1937, President of FIDE (Fédération Internationale des Echecs) from 1970 to 1978, and arbitrator over the turbulent Fischer – Spassky World Championship match in Reykjavik, Iceland in 1972. I don’t know as many details of his mathematical career as I’d like. One source gives: PhD (or actually its Dutch equivalent) in Mathematics from Amsterdam University in 1926. Another gives: Doctorate in philosophy in 1923 and taught as a career. Published a paper on the mathematics of chess “Mengentheoretische Betrachtungen uber das Schachspiel”.
Ed Formanek (194?-), International Master. Ph.D. Rice University 1970. Retired from the mathematics faculty at Penn State Univ. Worked primarily in matrix theory and representation theory.
Stephen L. Jones is an attorney in LA, but when younger, taught math in the UMass system and spent a term as a member of the Institute for Advanced Study in Princeton NJ. He is one rung below the level of International Master at over the board chess; in correspondence chess, he has earned two of the three norms needed to become a Grandmaster.
Charles Kalme (1939-2002), earned his master title in chess at 15, was US Junior champ in 1954, 1955, US Intercollegiate champ in 1957, and drew in his game against Bobby Fischer in the 1960 US championship. In 1960, he also was selected to be on the First Team All-Ivy Men’s Soccer team, as well as the US Student Olympiad chess team. (Incidently, it is reported that this team, which included William Lombary on board one, did so well against the Soviets in their match that Boris Spassky, board one on the Soviet team, was denied forieng travel for two years as punishment.) In 1961 graduated 1st in his class at the Moore School of Electrical Engineering, The University of Pennsylvania, in Philadelphia. He also received the Cane award (a leadership award) that year. After getting his PhD from NYU (advisor Lipman Bers) in 1967 he to UC Berkeley for 2 years then to USC for 4-5 years. He published 2 papers in mathematics in this period, “A note on the connectivity of components of Kleinian groups”, Trans. Amer. Math. Soc. 137 1969 301–307, and “Remarks on a paper by Lipman Bers”, Ann. of Math. (2) 91 1970 601–606. He also translated Siegel and Moser, Lectures on celestial mechanics, Springer-Verlag, New York, 1971, from the German original. He was important in the early stages of computer chess programming. In fact, his picture and annotations of a game were featured in the article “An advice-taking chess computer” which appeared in the June 1973 issue of Scientific American. He was an associate editor at Math Reviews from 1975-1977 and then worked in the computer industry. Later in his life he worked on trying to bring computers to elementary schools in his native Latvia A National Strategy for Bringing Computer Literacy to Latvian Schools. His highest chess rating was acheived later in his life during a “chess comeback”: 2458.
Miroslav Katetov (1918 -1995) earned his PhD from Charles Univ in 1939. Katetov was IM chess player (earned in 1951) and published about 70 research papers, mostly from topology and functional analysis.
Martin Kreuzer (1962-), CC Grandmaster, is rated over 2600 in correspondence chess (ICCF, as of Jan 2000). His OTB rating is over 2300. His specialty is computational commutative algebra and applications. Here is a recent game of his:
Kreuzer, M – Stickler, A
Emanuel Lasker (1868-1941), World Chess Champion from 1894-1921, PhD (or more precisely its German equivalent) in Mathematics from Erlangen Univ in 1902. Author of the influential paper “Zur theorie der moduln und ideale,” Math. Ann. 60(1905)20-116, where the well-known Lasker-Noether Primary Ideal Decomposition Theorem in Commutative Algebra was proven (it can be downloaded for free here). Lasker wrote and published numerous books and papers on mathematics, chess (and other games), and philosophy.
Vania Mascioni, former IECG Chairperson (IECG is the Internet Email Chess Group), is rated 2326 by IECG (as of 4-99). His area is Functional Analysis and Operator Theory.
A. Jonathan Mestel, grandmaster in over-the-board play and in chess problem solving, is an applied mathematician specializing in fluid mechanics and is the author of numerous research papers. He is on the mathematics faculty of the Imperial College in London.
Walter D. Morris (196?-), International Master. Currently on the mathematics faculty at George Mason Univ in Virginia.
Karsten Müller earned the Grandmaster title in 1998 and a PhD in mathematics in 2002 at the University of Hamburg.
John Nunn (1955-), Chess Grandmaster, D. Phil. (from Oxford Univ.) in 1978 at the age of 23. His PhD thesis is in algebraic topology. Nunn is also a GM chess problem solver.
Hans-Peter Rehm (1942-), earned his PhD in Mathematics from Karlsruhe Univ. (1970) then taught there for many years. He is a grandmaster of chess composition. He has written several papers in mathematics, such as “Prime factorization of integral Cayley octaves”, Ann. Fac. Sci. Toulouse Math (1993), but most in differential algebra, his specialty. A collection of his problems has been published as: Hans+Peter+Rehm=Schach Ausgewählte Schachkompositionen & Aufsätze (= selected chess problems and articles), Aachen 1994.
Kenneth W. Regan, Professor of Computer Science at the State Univ. of New York Buffalo, is currently rated 2453. His research is in computational complexity, a field of computer science which has a significant mathematical component.
Jakob Rosanes obtained his mathematics doctorate from the Univ. of Breslau in 1865 where he taught for the rest of his life. In the 1860s he played a match against A. Anderssen which ended with 3 wins, 3 losses, and 1 draw.
Jan Rusinek (1950-) obtained his mathematics PhD in 1978 and earned a Grandmaster of Chess Composition in 1992.
Jon Speelman (1956-) is an English Grandmaster chess player and chess writer. He earned his PhD in mathematics from Oxford.