Home

About

Advanced Search

Browse by Discipline

Scientific Societies

E-print Alerts

Add E-prints

E-print Network
FAQHELPSITE MAPCONTACT US


  Advanced Search  

 
HIGHER ORDER BERNOULLI POLYNOMIALS AND NEWTON POLYGONS Arnold Adelberg, Grinnell College, Grinnell, IA 50112
 

Summary: HIGHER ORDER BERNOULLI POLYNOMIALS AND NEWTON POLYGONS
Arnold Adelberg, Grinnell College, Grinnell, IA 50112
1. INTRODUCTION
The Bernoulli polynomials B (l)
n (x) of degree n and order l can be defined by
1
X
n=0
B (l)
n
(x) t n
n!
= e xt
/
t
e t \Gamma 1
! l
: (1:1)
They are monic of degree n in x. The constant coefficients B (l)
n = B (l)

  

Source: Adelberg, Arnold - Department of Mathematics and Computer Science, Grinnell College

 

Collections: Mathematics