Herbert Kenneth Kunen (August 2, 1943August 14, 2020) was a professor of

mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

at the University of Wisconsin–Madison who worked in set theory and its applications to various areas of mathematics, such as set-theoretic topology and

measure theory In mathematics, the concept of a measure is a generalization and formalization of geometrical measures (length, area, volume) and other common notions, such as magnitude (mathematics), magnitude, mass, and probability of events. These seemingl ...

. He also worked on non-associative algebraic systems, such as loops, and used computer software, such as the Otter theorem prover, to derive theorems in these areas.

Personal life

Kunen was born in

New York City New York, often called New York City (NYC), is the most populous city in the United States, located at the southern tip of New York State on one of the world's largest natural harbors. The city comprises five boroughs, each coextensive w ...

in 1943 and died in 2020. He lived in Madison, Wisconsin, with his wife Anne, with whom he had two sons, Isaac and Adam.

Education

Kunen completed his undergraduate degree at the California Institute of Technology and received his Ph.D. in 1968 from Stanford University, where he was supervised by Dana Scott.

Career and research

Kunen showed that if there exists a nontrivial elementary embedding ''j'' : ''L'' → ''L'' of the constructible universe, then 0^# exists. He proved the consistency of a normal,

\aleph_2

-saturated ideal on

\aleph_1

from the consistency of the existence of a huge cardinal. He introduced the method of iterated ultrapowers, with which he proved that if

\kappa

is a measurable cardinal with

2^\kappa>\kappa^+

\kappa

is a strongly compact cardinal then there is an inner model of set theory with

\kappa

many measurable cardinals. He proved Kunen's inconsistency theorem showing the impossibility of a nontrivial elementary embedding

V\to  V

, which had been suggested as a large cardinal assumption (a Reinhardt cardinal). Away from the area of large cardinals, Kunen is known for intricate forcing and combinatorial constructions. He proved that it is consistent that Martin's axiom first fails at a singular cardinal and constructed under the continuum hypothesis a compact L-space supporting a nonseparable measure. He also showed that

P(\omega)/Fin

has no increasing chain of length

\omega_2

in the standard Cohen model where the continuum is

\aleph_2

. The concept of a Jech–Kunen tree is named after him and Thomas Jech.

Bibliography

The journal '' Topology and its Applications'' has dedicated a special issue to "Ken" Kunen, containing a biography by Arnold W. Miller, and surveys about Kunen's research in various fields by Mary Ellen Rudin, Akihiro Kanamori, István Juhász, Jan van Mill, Dikran Dikranjan, and Michael Kinyon.

Selected publications

* ''Set Theory''. College Publications, 2011. . * ''The Foundations of Mathematics''. College Publications, 2009. . * '' Set Theory: An Introduction to Independence Proofs''. North-Holland, 1980. . * (co-edited with Jerry E. Vaughan). ''Handbook of Set-Theoretic Topology''. North-Holland, 1984. .

References

External links

Kunen's home page
* {{DEFAULTSORT:Kunen, Kenneth 1943 births 2020 deaths 20th-century American mathematicians 21st-century American mathematicians Set theorists Stanford University alumni American topologists Educators from New York City Writers from New York City University of Wisconsin–Madison faculty American logicians