Borel summation method
A method for summing series of functions, proposed by E. Borel [1]. Suppose one is given a series of numbers
 | (*) |
let 
be its partial sums and let 
be a real number. The series (*) is summable by the Borel method (
-method) to the number 
if
 |
There exists an integral summation method due to Borel. This is the 
-method: If
 |
then one says that the series (*) is summable by the 
-method to the number 
. For conditions under which the two methods 
and 
are equivalent, cf. [2]. The 
-method originated in the context of analytic extension of a function regular at a point. Let
 |
be regular at the point 
and let 
be the set of all its singular points. Draw the segment 
and the straight line 
normal to 
through any point 
. The set of points on the same side with 
for each straight line 
is denoted by 
; the boundary 
of the domain 
is then called the Borel polygon of the function 
, while the domain 
is called its interior domain. The following theorem is valid: The series
 |
is summable by the 
-method in 
, but not in the domain 
which is the complement of 
[2].
References
| [1] | E. Borel, "Mémoire sur les séries divergentes" Ann. Sci. École Norm. Sup. (3) , 16 (1899) pp. 9–131 |
| [2] | G.H. Hardy, "Divergent series" , Clarendon Press (1949) |
Comments
References
| [a1] | W. Beekmann, K. Zeller, "Theorie der Limitierungsverfahren" , Springer (1970) |
Borel summation method. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Borel_summation_method&oldid=14305