Mott polynomials explained

In mathematics the Mott polynomials s_n(x) are polynomials given by the exponential generating function:

	x(\sqrt{1-t²
e

-1)/t}=\sum_ns_n(x)t^n/n!.

They were introduced by Nevill Francis Mott who applied them to a problem in the theory of electrons.^[1]

Because the factor in the exponential has the power series

	\sqrt{1-t²
	-1}{t}

=-\sum_k\geC_k\left(

	t
	2

\right)^2k+1

in terms of Catalan numbers

C_k

, the coefficient in front of

x^k

of the polynomial can be written as

[x^k]s_n(x)

k	n!
	k!2ⁿ

=(-1)

\sum
	n=l_1+l_{2+ …}+l_k

C
	(l_1-1)/2

C
	(l_2-1)/2

…

C
	(l_k-1)/2

, according to the general formula for generalized Appell polynomials, where the sum is over all compositions

n=l_1+l_{2+ … +l}_k

into

positive odd integers. The empty product appearing for

k=n=0

equals 1. Special values, where all contributing Catalan numbers equal 1, are

	n]s
[x
	n(x)

	(-1)ⁿ
	2ⁿ

[x^n-2]s_n(x)=

	(-1)ⁿn(n-1)(n-2)
	2ⁿ

By differentiation the recurrence for the first derivative becomes

s'(x)=-

	\lfloor(n-1)/2\rfloor
\sum
	k=0

	n!
	(n-1-2k)!2^2k+1

C_ks_n-1-2k(x).

The first few of them are

s_0(x)=1;

1(x)=-	1
	2

2(x)=	1
	4

x^2;

3(x)=-	3
	4

	1
	8

x^3;

4(x)=	3
	2

2+	1
	16

x^4;

5(x)=-	15
	2

	15
	8

3-	1
	32

x^5;

6(x)=	225
	8

2+	15
	8

4+	1
	64

x^6;

The polynomials s_n(x) form the associated Sheffer sequence for –2t/(1–t²)^[2]

An explicit expression for them in terms of the generalized hypergeometric function ₃F₀:^[3]

	n{}
s
	3F

,1-

0(-n,	1-n
	2

	n	;;-
	2

	4
	x²

)

Notes and References

Mott . N. F. . The Polarisation of Electrons by Double Scattering . 95868 . 1932 . Proceedings of the Royal Society of London. Series A, Containing Papers of a Mathematical and Physical Character . 0950-1207 . 135 . 827 . 429–458 [442] . 10.1098/rspa.1932.0044. free .
Book: Roman . Steven . The umbral calculus . Academic Press Inc. [Harcourt Brace Jovanovich Publishers] . London . Pure and Applied Mathematics . 978-0-12-594380-2 . 741185 . 1984 . 111 . 130. Reprinted by Dover, 2005.
Book: Erdélyi . Arthur . Magnus . Wilhelm . Wilhelm Magnus . Oberhettinger . Fritz .
de:Fritz Oberhettinger
. Tricomi . Francesco G. . Higher transcendental functions. Vol. III . McGraw-Hill Book Company, Inc. . New York-Toronto-London . 0066496 . 1955 . 251 .