The “hot spots” conjecture for a certain class of planar convex domains
We prove the “hot spots” conjecture of Rauch [“Five problems: An introduction to the qualitative theory of partial differential equations,” Partial Differential Equations and R...
We prove the “hot spots” conjecture of Rauch [“Five problems: An introduction to the qualitative theory of partial differential equations,” Partial Differential Equations and R...
Comment on “Existence and regularity for an energy maximization problem in two dimensions” [S. Kamvissis and E. A. Rakhmanov, J. Math. Phys. 46, 083505 (2005)]
A revision of the last appendix of the paper “Existence and regularity for an energy maximization problem in two dimensions” by S. Kamvissis and E. A. Rakhmanov [J. Math. Phys. 46, 083505 ...
A revision of the last appendix of the paper “Existence and regularity for an energy maximization problem in two dimensions” by S. Kamvissis and E. A. Rakhmanov [J. Math. Phys. 46, 083505 ...
On fixed points of Lüders operation
J. Math. Phys. 50, 103531 (2009); doi:10.1063/1.3253574
Published 28 October 2009
You are not logged in to this journal. Log in
In this paper, we give a concrete example of a Lüders operation L![<sub>[script A]</sub>](http://scitation.aip.org/servlet/GetImg?key=JMAPAQ000050000010103531000001%3A0%3A0%3A28&t=a&d=a)
with n=3, such that L(B)=B does not imply that B commutes with all E1, E2, and E3 in ![[script A]](http://scitation.aip.org/servlet/GetImg?key=JMAPAQ000050000010103531000001%3A0%3A1%3A28&t=a&d=a)
, this example answers an open problem of Professor Gudder.
©2009 American Institute of Physics
| History: | Received 27 July 2009; accepted 16 September 2009; published 28 October 2009 |
| Permalink: |
http://link.aip.org/link/?JMAPAQ/50/103531/1 |
| BUY THIS ARTICLE | (US$24) |
|
|
Connotea
CiteULike
del.icio.us
BibSonomy
KEYWORDS and PACS
PUBLICATION DATA
0022-2488 (print)
1089-7658 (online)
AIP
REFERENCES (3)
For access to fully linked references, you need to log in.
For access to fully linked references, you need to Log in.
- A. Arias, A. Gheondea, and S. Gudder, J. Math. Phys. 43, 5872 (2002).
- P. Busch and J. Singh,
Phys. Lett. A 249, 10 (1998) . - S. Gudder,
Int. J. Theor. Phys. 44, 2199 (2005) .
