Difference between revisions of "Transition function"
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| − | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> J. Neveu, "Bases mathématiques du calcul des probabilités" , Masson (1970) {{MR|0272004}} {{ZBL|0203.49901}} </TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> I.I. [I.I. Gikhman] Gihman, A.V. [A.V. Skorokhod] Skorohod, "The theory of stochastic processes" , '''2''' , Springer (1975) (Translated from Russian) {{MR|0375463}} {{ZBL|0305.60027}} </TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> S.E. Kuznetsov, "Any Markov process in a Borel space has a transition function" ''Theory Probab. Appl.'' , '''25''' : 2 (1980) pp. 384–388 ''Teor. Veroyatnost. i ee Primenen.'' , '''25''' : 2 (1980) pp. 389–393 {{MR|0572574}} {{ZBL|0456.60077}} {{ZBL|0431.60071}} </TD></TR></table> |
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====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> C. Dellacherie, P.A. Meyer, "Probabilities and potential" , '''1–3''' , North-Holland (1978–1988) pp. Chapts. XII-XVI (Translated from French) {{MR|0939365}} {{MR|0898005}} {{MR|0727641}} {{MR|0745449}} {{MR|0566768}} {{MR|0521810}} {{ZBL|0716.60001}} {{ZBL|0494.60002}} {{ZBL|0494.60001}} </TD></TR><TR><TD valign="top">[a2]</TD> <TD valign="top"> M.J. Sharpe, "General theory of Markov processes" , Acad. Press (1988) {{MR|0958914}} {{ZBL|0649.60079}} </TD></TR><TR><TD valign="top">[a3]</TD> <TD valign="top"> S. Albeverio, Z.M. Ma, "A note on quasicontinuous kernels representing quasilinear positive maps" ''Forum Math.'' , '''3''' (1991) pp. 389–400</TD></TR></table> |
Revision as of 10:32, 27 March 2012
transition probability
A family of measures used in the theory of Markov processes for determining the distribution at future instants from known states at previous times. Let a measurable space 
be such that the 
-algebra 
contains all one-point subsets from 
, and let 
be a subset of the real line 
. A function 
given for 
, 
, 
and 
is called a transition function for 
if: a) for given 
, 
and 
, it is a measure on 
, with 
; b) for given 
, 
and 
, it is a 
-measurable function of the point 
; c) 
and for all limit points 
of 
from the right in the topology of 
,
 |
and d) for all 
, 
and 
from 
, the Kolmogorov–Chapman equation is fulfilled:
 | (*) |
(in some cases, requirement c) may be omitted or weakened). A transition function is called a Markov transition function if 
, and a subMarkov transition function otherwise. If 
is at most countable, then the transition function is specified by means of the matrix of transition probabilities
 |
(see Transition probabilities; Matrix of transition probabilities). It often happens that for any admissible 
, 
and 
the measure 
has a density 
with respect to a certain measure. If in this case the following form of equation (*) is satisfied:
 |
for any 
and 
from 
and 
from 
, then 
is called a transition density.
Under very general conditions (cf. [1], [2]), the transition function 
can be related to a Markov process 
for which 
(in the case of a Markov transition function, this process does not terminate, i.e. 
-a.s.). On the other hand, the Markov property for a random process enables one, as a rule, to put the process into correspondence with a transition function [3].
Let 
be homogeneous in the sense that the set of values of 
for 
from 
forms a semi-group 
in 
under addition (for example, 
, 
, 
). If, moreover, the transition function 
depends only on the difference 
, i.e. if 
, where 
is a function of 
, 
, 
satisfying the corresponding form of conditions a)–d), then 
is called a homogeneous transition function. The latter name is also given to a function 
for which (*) takes the form
 |
 |
For certain purposes (such as regularizing transition functions) it is necessary to extend the definition. For example, one takes as given a family of measurable spaces 
, 
, while a transition function with respect to this family is defined as a function 
, where 
, 
, 
, 
, that satisfies a suitable modification of conditions a)–d).
References
| [1] | J. Neveu, "Bases mathématiques du calcul des probabilités" , Masson (1970) MR0272004 Zbl 0203.49901 |
| [2] | I.I. [I.I. Gikhman] Gihman, A.V. [A.V. Skorokhod] Skorohod, "The theory of stochastic processes" , 2 , Springer (1975) (Translated from Russian) MR0375463 Zbl 0305.60027 |
| [3] | S.E. Kuznetsov, "Any Markov process in a Borel space has a transition function" Theory Probab. Appl. , 25 : 2 (1980) pp. 384–388 Teor. Veroyatnost. i ee Primenen. , 25 : 2 (1980) pp. 389–393 MR0572574 Zbl 0456.60077 Zbl 0431.60071 |
Comments
For additional references see also Markov chain; Markov process.
References
| [a1] | C. Dellacherie, P.A. Meyer, "Probabilities and potential" , 1–3 , North-Holland (1978–1988) pp. Chapts. XII-XVI (Translated from French) MR0939365 MR0898005 MR0727641 MR0745449 MR0566768 MR0521810 Zbl 0716.60001 Zbl 0494.60002 Zbl 0494.60001 |
| [a2] | M.J. Sharpe, "General theory of Markov processes" , Acad. Press (1988) MR0958914 Zbl 0649.60079 |
| [a3] | S. Albeverio, Z.M. Ma, "A note on quasicontinuous kernels representing quasilinear positive maps" Forum Math. , 3 (1991) pp. 389–400 |
Transition function. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Transition_function&oldid=12769