BELL POLYNOMIALS AND ITS SOME IDENTITIES
2017-11-06GUOJingLIXiaoxue
GUO Jing,LI Xiao-xue
(1.School of Mathematics and Computer Science,Jiangxi Science&Technology Normal University,Nanchang 330038,China)
(2.School of Mathematics,Northwest University,Xi’an 710127,China)
BELL POLYNOMIALS AND ITS SOME IDENTITIES
GUO Jing1,LI Xiao-xue2
(1.School of Mathematics and Computer Science,Jiangxi Science&Technology Normal University,Nanchang 330038,China)
(2.School of Mathematics,Northwest University,Xi’an 710127,China)
In this paper,we introduce a new polynomial called Bell polynomials.By using the elementary and combinational methods,we prove some identities for this polynomials.As an application of these identities,we give an interesting congruence for Bell numbers.
Bell numbers;Bell polynomials;identity;combinational method
1 Introduction
For any integersn≥k≥0,letS(n,k)denote the number of partitions of a set withnelements intoknonempty blocks.It is clear thatS(n,k)>0 for all 1≤k≤n,andS(n,k)=0 for 1≤n<k.PutS(0,0)=1 andS(0,k)=0 fork≥1,S(n,0)=0 forn≥1.These numbers were introduced by Stirling in his book“Methodus Di ff erentialis”(see[3–5]).Now they are called as the Stirling numbers of the second kind.These numbers satisfy the recurrence relation
The number of all partitions of a set withnelements is
called also a Bell number(or exponential number),related contents can be found in many papers or books.For example,see[6–8].
These numbers satisfy the recurrence formula
whereB(0)=1 by de finition.
The generating function ofB(n)is given by
where exp(y)=ey.
The numbersB(n)can be represented also as the sum of a convergent series(Dobinski’s formula)
see Pólya and Szegö[9]for these basic properties.
In this paper,we introduce a new polynomialsB(x,n)(called Bell polynomials)as follows
It is clear thatB(0,x)=1,B(1,x)=x,B(2,x)=x+x2,B(3,x)=x+3x2+x3,···.Ifx=1,thenB(n,1)=B(n),the well known Bell numbers.About the properties ofB(n,x),it seems that none had studied it yet,at least we have not seen any related papers before.The problem is interesting,because it can help us to further understand the properties of Bell numbers.
The main purpose of this paper is using the elementary and combinational methods to study the computational problem of the sums
Theorem 1Letkbe a positive integer withk≥1.Then for any positive integern≥1,we have the identity
where the polynomialsB(n,x)satisfy the recurrence formulaB(0,x)=1,B(1,x)=x,B(2,x)=x+x2,B(3,x)=x+3x2+x3,and
For the polynomialsB(n,x),we also have a similar Dobinski’s formula.
Theorem 2For any positive integern≥1,we have the identities
From Theorem 1 and the recurrence formula ofB(n,x),we may immediately deduce the following congruence.
Corollary 1Letpbe an odd prime.Then for any positive integerk≥1 with(k,p)=1,we have the congruence
Corollary 2For any positive integern,we have the identity
2 Proof of the Theorems
In this section,we shall complete the proofs of our theorems.First we give a sample lemma,which are necessary in the proof of our theorems.Hereinafter,we shall use some elementary number theory contents and properties of power series,all of these can be found in references[1]and[2],so they will not be repeated here.
LemmaFor any real numberx,let functionf(t)=exp(x(et−1)),then we havef(n)(0)=B(n,x)for all integersn≥0,wheref(n)(t)denotes thenthderivative off(t)for variablet.
ProofWe prove this lemma by complete induction.It is clear thatf(0)=1=B(0,x),f′(t)=xet·exp(x(et−1))=xet·f(t),andf′(0)=x=B(1,x).So the lemma is true forn=0,1.Assume thatf(n)(0)=B(n,x)for all 0≤n≤r.Then note thatf′(t)=xet·f(t),so from the properties of derivative(Newton-Leibnitz formula),we have
Applying(2.1)and inductive hypothesis,we have
That is,f(r+1)(0)=B(r+1,x).
Now the lemma follows from the complete induction.
Proof of Theorem 1For any positive integerk≥2,it is clear thatfk(t)=exp(kx(et−1)),then from(1.4),we have
On the other hand,letg(t)=fk(t)=exp(kx(et−1)),then from the de finition of the power series and lemma,we also have
Combining(2.2)and(2.3)we may immediately deduce the identity
This proves Theorem 1.
Proof of Theorem 2Applying the power serieswe have
Comparing the coefficients oftnin(1.4)and(2.4),we may immediately deduce the identity
This proves Theorem 2.
Proof of Corollary 1Letpbe an odd prime,taken=p+1 in Theorem 1,then from the properties ofB(n,x)and Theorem 1,we have
or
Note thatk≥2 anda1+a2+···+ak=p+1,so if there are three ofa1,a2,···,akare positive integers,then
If there are only two ofa1,a2,···,akare positive integers,and both of them are greater than one,then we also have
If there are only two ofa1,a2,···,akare positive integers,and one isp,another is 1,then we also have
If only one ofa1,a2,···,akare positive integers,then it must bep+1.This time we have
Combining(2.5)–(2.10)and note that identity
we have
or
This proves the first congruence of Corollary 1.The second congruence follows from the second identity of Corollary 2 withn=p.
Proof of Corollary 2Letf(t,x)=exp(x(et−1)),then from(1.4),we have
On the other hand,from the de finition off(t,x),we also have
Comparing the coefficients oftnin(2.11)and(2.12),we may immediately deduce the identity
Note that the recurrence formulafrom(2.13)we may immediately deduce the identityThis completes the proofs of our all results.
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关于Bell多项式及其它的一些恒等式
过 静1,李小雪2
(1.江西科技师范大学数学与计算机科学学院,江西南昌 330038)
(2.西北大学数学学院,陕西西安 710127)
本文引入了一个新的多项式,即Bell多项式.利用初等数论及组合方法,证明了包含该多项式的一些恒等式.作为这些恒等式的应用,给出了关于Bell数的同余式.
Bell数;Bell多项式;恒等式;组合方法
O157.1
11B37;11B83
A
0255-7797(2017)06-1201-06
date:2015-04-14Accepted date:2015-07-06
Supported by National Natural Science Foundation of China(11371291);Jiangxi Science and Technology Normal University(xjzd2015002).
Biography:Guo Jing(1973–),female,born at Jinxian,Jiangxi,associate professor,major in mathematics.
