Shoshana Kamin Explained

Shoshana Kamin
Birth Date:24 December 1930
Birth Place:Moscow, RSFSR, Soviet Union
Nationality:Israeli
Workplaces:
Alma Mater:Moscow University
Doctoral Advisor:Olga Arsenievna Oleinik
Known For:

Shoshana Kamin (Russian: Шошана Камин, Hebrew: שושנה קמין) (born December 24, 1930),[1] born Susanna L'vovna Kamenomostskaya (Russian: Сусанна Львовна Каменомостская),[1] [2] is a Soviet-born Israeli mathematician, working on the theory of parabolic partial differential equations and related mathematical physics problems.

Biography

Shoshana Kamin graduated from Moscow University in 1953 and earned her "candidate of science" degree from the same university in 1959,[1] under the supervision of Olga Oleinik.[3] She and her two sons left the Soviet Union in the early 1971. After that she became a professor in Tel Aviv University,[4] where she is now professor emeritus.[5]

Contributions

In the late 1950s, she gave the first proof of the existence and uniqueness of the generalized solution of the three-dimensional Stefan problem.[6] Her proof was generalised by Oleinik.[7]

Later, she made important contributions to the study of the porous medium equation,[8]

\partialtu=\Deltaxum,m>1,

and to non-linear elliptic equations.[9]

Selected publications

See also

References

Biographical references

Scientific references

External links

Notes and References

  1. See reference .
  2. See her paper and her author page at All-Russian Mathematical Portal.
  3. See the list of Olga Oleinik Candidate of Sciences students in (Russian version).
  4. See . He precisely states:-"The emigration of the mid-1970s had already brought mathematicians of the highest caliber and of all ages to Israel: Mikhail Lifshits and David Milman, Israel Gohberg and Il'ya Pyatetskii-Shapiro, Shoshana Kamin, Boris Moishezon, Yurii Gurevich and I (I include myself in this group)."
  5. Web site: List of senior faculty members at the School of Mathematical Sciences. Tel Aviv University.
  6. See references and, as well as the historical survey on the Stefan problem in .
  7. See and .
  8. See .
  9. See .