Integrability of Discrete Equations Modulo a Prime

被引:3
|
作者
Kanki, Masataka [1 ]
机构
[1] Univ Tokyo, Grad Sch Math Sci, Tokyo 1538914, Japan
来源
SYMMETRY INTEGRABILITY AND GEOMETRY-METHODS AND APPLICATIONS | 2013年 / 9卷
关键词
integrability test; good reduction; discrete Painleve equation; finite field; MAPPINGS; SYSTEMS;
D O I
10.3842/SIGMA.2013.056
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
We apply the "almost good reduction" (AGR) criterion, which has been introduced in our previous works, to several classes of discrete integrable equations. We verify our conjecture that AGR plays the same role for maps of the plane define over simple finite fields as the notion of the singularity confinement does. We first prove that q-discrete analogues of the Painleve III and IV equations have AGR. We next prove that the Hietarinta Viallet equation, a non-integrable chaotic system also has AGR.
引用
收藏
页数:8
相关论文
共 50 条
  • [41] On the distribution of arithmetic functions prime modulo
    Zhimbo, E.K.
    Chubarikov, V.N.
    [J]. Discrete Mathematics and Applications, 2001, 11 (05): : 461 - 470
  • [42] CONGRUENCES OF THE FIBONACCI NUMBERS MODULO A PRIME
    Zyuz'kov, V. M.
    [J]. VESTNIK TOMSKOGO GOSUDARSTVENNOGO UNIVERSITETA-MATEMATIKA I MEKHANIKA-TOMSK STATE UNIVERSITY JOURNAL OF MATHEMATICS AND MECHANICS, 2021, (69): : 15 - 21
  • [43] POLYNOMIALS REDUCIBLE MODULO EVERY PRIME
    CHILDS, L
    [J]. AMERICAN MATHEMATICAL MONTHLY, 1977, 84 (05): : 390 - 391
  • [44] Reducibility type of polynomials modulo a prime
    Harrington, Joshua
    Jones, Lenny
    [J]. INDIAN JOURNAL OF PURE & APPLIED MATHEMATICS, 2023,
  • [45] ON THE DISTRIBUTION OF QUADRATIC RESIDUES MODULO A PRIME
    WALUM, H
    [J]. JOURNAL OF NUMBER THEORY, 1982, 15 (02) : 248 - 251
  • [46] THE PARTITION FUNCTION MODULO PRIME POWERS
    Boylan, Matthew
    Webb, John J.
    [J]. TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 2013, 365 (04) : 2169 - 2206
  • [47] Double and triple sums modulo a prime
    Gyarmati, Katalin
    Konyagin, Sergei
    Ruzsa, Imre Z.
    [J]. ADDITIVE COMBINATORICS, 2007, 43 : 271 - 277
  • [48] Classification theorems for sumsets modulo a prime
    Nguyen, Hoi H.
    Vu, Van H.
    [J]. JOURNAL OF COMBINATORIAL THEORY SERIES A, 2009, 116 (04) : 936 - 959
  • [49] CONGRUENCE MODULO-A POWER OF A PRIME
    MONZINGO, MG
    [J]. FIBONACCI QUARTERLY, 1976, 14 (01): : 23 - 24
  • [50] On the distribution of primitive roots modulo a prime
    Yi, Y
    Zhang, WP
    [J]. PUBLICATIONES MATHEMATICAE-DEBRECEN, 2002, 61 (3-4): : 383 - 391
12345