標題: | ZETA FUNCTIONS FOR HIGHER-DIMENSIONAL SHIFTS OF FINITE TYPE |
作者: | Hu, Wen-Guei Lin, Song-Sun 應用數學系 Department of Applied Mathematics |
關鍵字: | Zeta function;shift of finite type;patterns generation problem;phase-transition;Ising model;cellular neural networks |
公開日期: | 1-Nov-2009 |
摘要: | This work investigates zeta functions for d-dimensional shifts of finite type, d >= 3. First, the three-dimensional case is studied. The trace operator T(a1,a2;b12) and rotational matrices R(x;a1,a2;b12) and R(y;a1,a2;b12) are introduced to study [GRAPHICS] -periodic patterns. The rotational symmetry of T(a1,a2;b12) induces the reduced trace operator tau(a1,a2;b12) and then the associated zeta function zeta(a1,a2;b12) = (det(I - s(a1a2)tau(a1,a2;b12)))(-1). The zeta function zeta is then expressed as zeta = Pi(infinity)(a1=1) Pi(infinity)(a2=1) Pi(a1-1)(b12=0) zeta(a1,a2;b12), a reciprocal of an infinite product of polynomials. The results hold for any inclined coordinates, determined by unimodular transformation in GL(3)(Z). Hence, a family of zeta functions exists with the same integer coefficients in their Taylor series expansions at the origin, and yields a family of identities in number theory. The methods used herein are also valid for d-dimensional cases, d >= 4, and can be applied to thermodynamic zeta functions for the three-dimensional Ising model with finite range interactions. |
URI: | http://dx.doi.org/10.1142/S0218127409025055 http://hdl.handle.net/11536/6540 |
ISSN: | 0218-1274 |
DOI: | 10.1142/S0218127409025055 |
期刊: | INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS |
Volume: | 19 |
Issue: | 11 |
起始頁: | 3671 |
結束頁: | 3689 |
Appears in Collections: | Articles |
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