User contributions
(newest | oldest) View (newer 20 | older 20) (20 | 50 | 100 | 250 | 500)
- 20:47, 4 October 2014 (diff | hist) . . (+2,005) . . m Gegenbauer C (→Properties)
- 20:42, 4 October 2014 (diff | hist) . . (+1,104) . . N Gegenbauer C (Created page with "The Gegenbauer polynomial of degree $n$ and order $\lambda$ is the coefficient of $t^n$ in the expansion of $\dfrac{1}{(1-2xt+t^2)^{\lambda}}$ in the sense that $$\dfrac{1}{(...")
- 20:37, 4 October 2014 (diff | hist) . . (+33) . . Main Page (→Polynomials)
- 20:24, 4 October 2014 (diff | hist) . . (+260) . . Laguerre L (→Properties)
- 19:20, 4 October 2014 (diff | hist) . . (+500) . . Laguerre L
- 19:19, 4 October 2014 (diff | hist) . . (-16) . . Laguerre L (→Properties)
- 19:18, 4 October 2014 (diff | hist) . . (+379) . . Laguerre L
- 19:16, 4 October 2014 (diff | hist) . . (0) . . Laguerre L
- 19:16, 4 October 2014 (diff | hist) . . (0) . . Laguerre L
- 19:16, 4 October 2014 (diff | hist) . . (+520) . . Laguerre L
- 19:12, 4 October 2014 (diff | hist) . . (+533) . . N Laguerre L (Created page with "Laguerre's equation is $$x\dfrac{y^2x}{dx^2}+(1-x)\dfrac{dy}{dx}+ny=0.$$ One of the solutions of this differential equations are the Laguerre polynomials $$L_n(x) = \displayst...")
- 16:35, 4 October 2014 (diff | hist) . . (+28) . . Main Page
- 16:34, 4 October 2014 (diff | hist) . . (+122) . . N Hurwitz zeta (Created page with "The Hurwitz zeta function is defined for $\Re(s)>1$, $$\zeta(s,a)= \displaystyle\sum_{n=0}^{\infty} \dfrac{1}{(n+a)^s}.$$")
- 16:31, 4 October 2014 (diff | hist) . . (+29) . . Main Page (→Special functions in number theory)
- 16:30, 4 October 2014 (diff | hist) . . (+682) . . N Mangoldt (Created page with "The Mangoldt function is defined by the formula $$\Lambda(n) = \left\{ \begin{array}{ll} \log p &; n=p^k \mathrm{\hspace{2pt}for\hspace{2pt}some\hspace{2pt}prime\hspace{2pt}}p...")
- 16:26, 4 October 2014 (diff | hist) . . (0) . . Main Page (→Special functions in number theory)
- 16:26, 4 October 2014 (diff | hist) . . (+28) . . Main Page (→Special functions in number theory)
- 16:22, 4 October 2014 (diff | hist) . . (-46) . . Euler totient (→Properties)
- 16:21, 4 October 2014 (diff | hist) . . (+403) . . Euler totient (→Properties)
- 16:15, 4 October 2014 (diff | hist) . . (+555) . . N Liouville lambda (Created page with "The Liouville function is defined by the formula $$\lambda(n) = (-1)^{\Omega(n)},$$ where $\Omega(n)$ indicates the number of prime factors of $n$, counted with multiplicity....")
(newest | oldest) View (newer 20 | older 20) (20 | 50 | 100 | 250 | 500)