Burton, E. "On Some Series Involving the Smarandache Function." Smarandache Notions J.6, 13-15, 1995.Burton, E. "On Some Convergent Series." Smarandache Notions J.7, 7-9, 1996.Cojocaru, I. and Cojocaru, S. "The First Constant of Smarandache." Smarandache Notions J.7, 116-118, 1996a.Cojocaru, I. and Cojocaru, S. "The Second Constant of Smarandache." Smarandache Notions J.7, 119-120, 1996b.Cojocaru, I. and Cojocaru, S. "The Third and Fourth Constants of Smarandache." Smarandache Notions J.7, 121-126, 1996c."Constants Involving the Smarandache Function." http://www.gallup.unm.edu/~smarandache/CONSTANT.TXT.Dumitrescu, C. and Seleacu, V. "Numerical Series Involving the Function ." The Smarandache Function in Number Theory. Vail: Erhus University Press, pp. 48-61, 1996.Ibstedt, H. Surfing on the Ocean of Numbers--A Few Smarandache Notions and Similar Topics. Lupton, AZ: Erhus University Press, pp. 27-30, 1997.Sandor, J. "On The Irrationality of Certain Alternative Smarandache Series." Smarandache Notions J.8, 143-144, 1997.Sloane, N. J. A. Sequences A038458, A048799, A048834, A048835, A048836, A048837, A048838, and A071120 in "The On-Line Encyclopedia of Integer Sequences."Smarandache, F. Collected Papers, Vol. 1. Bucharest, Romania: Tempus, 1996.Smarandache, F. Collected Papers, Vol. 2. Kishinev, Moldova: Kishinev University Press, 1997.
(OEIS A038458)。![S_1=sum_(n=2)^infty1/([mu(n)]!)=1.09317...](/images/equations/SmarandacheConstants/NumberedEquation1.svg)
是 Smarandache 函数。Cojocaru 和 Cojocaru (1996a) 证明了 
存在且有界,
。
,并且
收敛。对于小的 
值,
一个自然数(在后一种情况下必须非零)收敛。Dumitrescu 和 Seleacu (1996) 表明
![S_(10)=sum_(n=2)^infty1/([mu(n)]^alphasqrt([mu(n)]!))](/images/equations/SmarandacheConstants/NumberedEquation10.svg)
![S_(11)=sum_(n=2)^infty1/([mu(n)]^alphasqrt([mu(n)+1]!))](/images/equations/SmarandacheConstants/NumberedEquation11.svg)
收敛。
."