Gisbert F. R. Hasenjaeger (June 1, 1919 – September 2, 2006) was a German
mathematical logician. Independently and simultaneously with
Leon Henkin in 1949, he developed a new proof of the
completeness theorem of
Kurt Gödel
Kurt Friedrich Gödel ( , ; April 28, 1906 – January 14, 1978) was a logician, mathematician, and philosopher. Considered along with Aristotle and Gottlob Frege to be one of the most significant logicians in history, Gödel had an imme ...
for
predicate logic.
He worked as an assistant to
Heinrich Scholz at Section IVa of
Oberkommando der Wehrmacht Chiffrierabteilung
The Cipher Department of the High Command of the Wehrmacht (german: Amtsgruppe Wehrmachtnachrichtenverbindungen, Abteilung Chiffrierwesen) (also ''Oberkommando der Wehrmacht Chiffrierabteilung'' or ''Chiffrierabteilung of the High Command of the W ...
, and was responsible for the security of the
Enigma machine.
Personal life
Gisbert Hasenjaeger went to high school in
Mülheim, where his father was a lawyer and local politician. After completing school in 1936, Gisbert volunteered for labor service. He was drafted for military service in
World War II, and fought as an artillerist in the
Russian campaign, where he was badly wounded in January 1942. After his recovery, in October 1942,
Heinrich Scholz got him employment in the
Cipher Department of the High Command of the Wehrmacht (OKW/Chi), where he was the youngest member at 24. He attended a
cryptography training course by
Erich Hüttenhain, and was put into the recently founded Section IVa "Security check of own Encoding Procedures" under
Karl Stein, who assigned him the security check of the
Enigma machine.
[ Cited from ]German Wikipedia
The German Wikipedia (german: Deutschsprachige Wikipedia) is the German-language edition of Wikipedia, a free and publicly editable online encyclopedia.
Founded on March 16, 2001, it is the second-oldest Wikipedia (after the English Wikipedia), ...
At the end of the war as OKW/Chi disintegrated, Hasenjaeger managed to escape
TICOM, the United States effort to roundup and seize captured German intelligence people and material.
[
From the end of 1945, he studied mathematics and especially mathematical logic with Heinrich Scholz at the Westfälische Wilhelms-Universität University in Münster. In 1950 received his doctorate ''Topological studies on the semantics and syntax of an extended predicate calculus'' and completed his habilitation in 1953.]
In Münster, Hasenjaeger worked as an assistant to Scholz and later co-author, to write the textbook ''Fundamentals of Mathematical Logic'' in ''Springer's Grundlehren series'' (Yellow series of Springer-Verlag), which he published in 1961 fully 6 years after Scholz's death. In 1962, he became a professor at the University of Bonn, where he was Director of the newly created Department of Logic.
In 1962, Dr Hasenjaeger left Münster University to take a full professorship at Bonn University, where he became Director of the newly established Department of Logic and Basic Research. In 1964/65, he spent a year at Princeton University at the Institute for Advanced Study His doctoral students at Bonn included Ronald B. Jensen, his most famous pupil.
Hasenjaeger became professor emeritus in 1984.
Work
Safety Testing the Enigma Machine
In October 1942, after starting work at OKW/Chi, Hasenjaeger was trained in cryptology, given by the mathematician, Erich Hüttenhain, who was widely considered the most important German cryptologist of his time. Hasenjaeger was put into a newly formed department, whose principal responsibility was the defensive testing and security control of their own methods and devices. Hasenjaeger was ordered, by the mathematician Karl Stein who was also conscripted at OKW/Chi, to examine the Enigma machine for cryptologic weaknesses, while Stein was to examine the Siemens and Halske T52 and the Lorenz SZ-42. The Enigma machine that Hasenjaeger examined was a variation that worked with 3 rotors and had no plugboard. Germany sold this version to neutral countries to accrue foreign exchange. Hasenjaeger was presented with a 100 character encrypted message for analysis and found a weakness which enabled the identification of the correct wiring rotors and also the appropriate rotor positions, to decrypt the messages. Further success eluded him, however. He crucially failed to identify the most important weakness of the Enigma machine: the lack of fixed points (letters encrypting to themselves) due to the reflector. Hasenjaeger could take some comfort from the fact that even Alan Turing missed this weakness. Instead, the honour was attributed to Gordon Welchman, who used the knowledge to decrypt several hundred thousand Enigma messages during the war. In fact fixed points were earlier used by Polish codebreaker, Henryk Zygalski, as the basis for his method of attack on Enigma cipher, referred to by the Poles as "Zygalski sheets" ( Zygalski sheets) (płachty Zygalskiego) and by the British as the "Netz method".
Proof of Gödel's completeness theorem
It was while Hasenjaeger was working at Westfälische Wilhelms-Universität University in Münster in the period between 1946 and 1953 that Hasenjaeger made a most amazing discovery - a proof
Proof most often refers to:
* Proof (truth), argument or sufficient evidence for the truth of a proposition
* Alcohol proof, a measure of an alcoholic drink's strength
Proof may also refer to:
Mathematics and formal logic
* Formal proof, a con ...
of Kurt Gödel
Kurt Friedrich Gödel ( , ; April 28, 1906 – January 14, 1978) was a logician, mathematician, and philosopher. Considered along with Aristotle and Gottlob Frege to be one of the most significant logicians in history, Gödel had an imme ...
's Gödel's completeness theorem for full predicate logic with identity and function symbols. Gödel's proof of 1930 for predicate logic did not automatically establish a procedure for the general case. When he had solved the problem in late 1949, he was frustrated to find that a young American mathematician Leon Henkin, had also created a proof. Both construct from extension of a term model
In first-order logic, a Herbrand structure ''S'' is a structure over a vocabulary σ that is defined solely by the syntactical properties of σ. The idea is to take the symbols of terms as their values, e.g. the denotation of a constant symbol '' ...
, which is then the model for the initial theory. Although the Henkin proof was considered by Hasenjaeger and his peers to be more flexible, Hasenjaeger' is considered simpler and more transparent.
Hasenjaeger continued to refine his proof through to 1953 when he made a breakthrough. According to the mathematicians Alfred Tarski, Stephen Cole Kleene and Andrzej Mostowski
Andrzej Mostowski (1 November 1913 – 22 August 1975) was a Polish mathematician. He is perhaps best remembered for the Mostowski collapse lemma.
Biography
Born in Lemberg, Austria-Hungary, Mostowski entered University of Warsaw in 1931. He was ...
, the Arithmetical hierarchy of formulas is the set of arithmetical propositions that are true in the standard model, but not arithmetically definable. So, what does the concept of truth for the term model mean, the results for the recursively axiomatized Peano arithmetic
In mathematical logic, the Peano axioms, also known as the Dedekind–Peano axioms or the Peano postulates, are axioms for the natural numbers presented by the 19th century Italian mathematician Giuseppe Peano. These axioms have been used nearly u ...
from the Hasenjaeger method? The result was the truth predicate
In formal theories of truth, a truth predicate is a fundamental concept based on the sentences of a formal language as interpreted logically. That is, it formalizes the concept that is normally expressed by saying that a sentence, statement or i ...
is well arithmetically, it is even . So far down in the arithmetic hierarchy, and that goes for any recursively axiomatized (countable, consistent) theories. Even if you are true in all the natural numbers
In mathematics, the natural numbers are those numbers used for counting (as in "there are ''six'' coins on the table") and ordering (as in "this is the ''third'' largest city in the country").
Numbers used for counting are called ''cardinal n ...
formulas to the axioms.
This classic proof is a very early, original application of the arithmetic hierarchy theory to a general-logical problem. It appeared in 1953 in the '' Journal of Symbolic Logic''.[ Gödel proof.]
Construction of Turing Machines
In 1963, Hasenjaeger built a Universal Turing machine out of old telephone relays. Although Hasenjaeger's work on UTMs was largely unknown and he never published any details of the machinery during his lifetime, his family decided to donate the machine to the Heinz Nixdorf Museum
The Heinz Nixdorf MuseumsForum (HNF) in Paderborn, Germany, is the largest computer museum in the world (as of 2018). It is named after the Paderborn computer pioneer and entrepreneur Heinz Nixdorf.
History
In 1977, Heinz Nixdorf received numero ...
in Paderborn, Germany, after his death. In an academic paper presented at the ''International Conference of History and Philosophy of Computing'' in 2012. Rainer Glaschick, Turlough Neary, Damien Woods, Niall Murphy had examined Hasenjaeger's UTM machine at the request of Hasenjaeger family and found that the UTM was remarkably small and efficiently universal. Hasenjaeger UTM contained 3-tapes, 4 states, 2 symbols and was an evolution of ideas from Edward F. Moore
Edward Forrest Moore (November 23, 1925 in Baltimore, Maryland – June 14, 2003 in Madison, Wisconsin) was an American professor of mathematics and computer science, the inventor of the Moore machine, Moore finite state machine, and an early pione ...
's first universal machine and Hao Wang's B-machine. Hasenjaeger went on to build a small efficient Wang B-machine simulator. This was again proven by the team assembled by Rainer Glaschick to be efficiently universal.
Comments on the Enigma Machine weakness
It was only in the 1970s that Hasenjaeger learned that the Enigma Machine had been so comprehensively broken. It impressed him that Alan Turing himself, considered one of the greatest mathematicians of the 20th century, had worked on breaking the device. The fact that the Germans had so comprehensively underestimated the weaknesses of the device, in contrast to Turing and Welchman's work, was seen by Hasenjaeger today as entirely positive. Hasenjaeger stated:
Bibliography
*
References
Further reading
* Rebecca Ratcliffe: Searching for Security. The German Investigations into Enigma's security. In: Intelligence and National Security 14 (1999) Issue 1 (Special Issue) S.146–167.
* Rebecca Ratcliffe: How Statistics led the Germans to believe Enigma Secure and Why They Were Wrong: neglecting the practical Mathematics of Cipher machines Add:. Brian J. angle (eds.) The German Enigma Cipher Machine. Artech House: Boston, London of 2005.
{{DEFAULTSORT:Hasenjaeger, Gisbert
1919 births
2006 deaths
People from Hildesheim
University of Münster alumni
20th-century German mathematicians
German logicians
Mathematical logicians
German male writers
German cryptographers
German Army personnel of World War II
Academic staff of the University of Münster
Academic staff of the University of Bonn