Permutator
An eigen value 
of a stochastic kernel that it is different from one and such that 
. A non-negative continuous function 
given on a compact set 
in a finite-dimensional space is called a stochastic kernel if
 |
The eigen values of such a kernel satisfy the condition 
. In operator theory, the name permutator is also given to an operator 
if the range of its values, 
, is finite dimensional and if there exists a basis 
in 
such that 
, 
.
References
| [1] | P.P. Zabreiko (ed.) A.I. Koshelev (ed.) M.A. Krasnoselskii (ed.) S.G. Mikhlin (ed.) L.S. Rakovshchik (ed.) V.Ya. Stet'senko (ed.) T.O. Shaposhnikova (ed.) R.S. Anderssen (ed.) , Integral equations - a reference text , Noordhoff (1975) (Translated from Russian) |
Comments
Given a kernel 
, one considers the homogeneous integral equation
 |
A regular point of a kernel 
is one for which this equation has only the trivial solution; a characteristic point (value) is one for which there is a non-trivial solution. If 
is characteristic, 
is called an eigen value of the kernel 
. Note that it is then an eigen value of the integral operator defined by 
; cf. [1], pp. 27ff.
Permutator. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Permutator&oldid=48163