Dimer coverings on the Sierpinski gasket with possible vacancies on the outmost vertices

Abstract

We present the number of dimers Nd(n) on the Sierpinski gasket SGd(n) at stage n with dimension d equal to two, three, four or five, where one of the outmost vertices is not covered when the number of vertices v(n) is an odd number. The entropy of absorption of diatomic molecules per site, defined as SSGd=n ∞ Nd(n)/v(n), is calculated to be (2)/3 exactly for SG2(n). The numbers of dimers on the generalized Sierpinski gasket SGd,b(n) with d=2 and b=3,4,5 are also obtained exactly. Their entropies are equal to (6)/7, (28)/12, (200)/18, respectively. The upper and lower bounds for the entropy are derived in terms of the results at a certain stage for SGd(n) with d=3,4,5. As the difference between these bounds converges quickly to zero as the calculated stage increases, the numerical value of SSGd with d=3,4,5 can be evaluated with more than a hundred significant figures accurate.