0,1

Define a sequence of real numbers R(n) by R(n) := sum {k = 0..inf} (3k)^n/(3k)! for n = 0,1,2... . This constant is R(1); the decimal expansions of R(0) = 1 + 1/3!+ 1/6! + 1/9! + ... and R(2) - R(1) = 1/1! + 1/4! + 1/7! + ... may be found in A143819 and A143820. It is easy to verify that the sequence R(n) satisfies the recurrence relation u(n+3) = 3*u(n+2) - 2*u(n+1) + sum {i = 0..n} binomial(n,i) * 3^(n-i)*u(i). Hence R(n) is an integral linear combination of R(0), R(1) and R(2) and so also an integral linear combination of R(0), R(1) and R(2) - R(1). Some examples are given below.

Constant = (exp(1) + w*exp(w) + w^2*exp(w^2))/3, where w = exp(2*Pi*i/3). A143819 + A143820 + A143821 = exp(1).

R(n) as a linear combination of R(0),R(1)

and R(2) - R(1).

=======================================

..R(n)..|.....R(0).....R(1)...R(2)-R(1)

=======================================

..R(3)..|.......1........1........3....

..R(4)..|.......6........2........7....

..R(5)..|......25.......11.......16....

..R(6)..|......91.......66.......46....

..R(7)..|.....322......352......203....

..R(8)..|....1232.....1730.....1178....

..R(9)..|....5672.....8233.....7242....

..R(10).|...32202....39987....43786....

...

The column entries are from A143815, A143816 and A143817.

A073742, A073743, A143815, A143816, A143817, A143818, A143819, A143820.

Sequence in context: A078119 A085998 A094886 this_sequence A099219 A011441 A141431

Adjacent sequences: A143818 A143819 A143820 this_sequence A143822 A143823 A143824

cons,easy,nonn

Peter Bala (pbala(AT)toucansurf.com), Sep 03 2008

Offset corrected by R. J. Mathar (mathar(AT)strw.leidenuniv.nl), Feb 05 2009