ON P-ADIC ASPECTS OF SOME PERTURBATION-SERIES

被引：5

作者：

DRAGOVIC, BG

机构：

来源：

THEORETICAL AND MATHEMATICAL PHYSICS | 1992年 / 93卷 / 02期

关键词：

D O I：

10.1007/BF01083520

中图分类号：

O4 [物理学];

学科分类号：

0702 ;

摘要：

Series with factorial terms, which are of potential interest in quantum field theory and string theory, are considered. Divergent series in the real case are usually p-adic convergent. Using simple and number field invariant methods of summation, rational sums are obtained. Sums of the convergent and divergent counterparts of the same series are connected by adelic summability.

引用

页码：1225 / 1231

页数：7

共 50 条

[31] PERTURBATION-SERIES EXPANSIONS
SCHWEITZER, PJ
COMPUTER NETWORKS AND ISDN SYSTEMS, 1986, 12 (01): : 65 - 65
[32] On some p-adic functional equations
Boutabaa, A
P-ADIC FUNCTIONAL ANALYSIS, 1997, 192 : 49 - 59
[33] Some p-adic model theory
Delon, F
EUROPEAN WOMEN IN MATHEMATICS, 1999, : 63 - 76
[34] ON SOME EXPANSIONS OF P-ADIC FUNCTIONS
RUTKOWSKI, J
ACTA ARITHMETICA, 1988, 51 (03) : 233 - 245
[35] Perturbation of a p-adic dynamical system in two variables
Aguayo, J
Goméz, J
Saavedra, M
Wallace, M
Ultrametric Functional Analysis, 2005, 384 : 39 - 51
[36] Real and p-Adic aspects of quantization of tachyons
Djordjevic, GS
Nesic, L
Mathematical, Theoretical and Phenomenological Challenges Beyond the Standard Model: PERSPECTIVES OF THE BALKAN COLLABORATIONS, 2005, : 197 - 207
[37] On the p-adic Leopoldt transform of a power series
Angles, Bruno
ACTA ARITHMETICA, 2008, 134 (04) : 349 - 367
[38] Remarks on p-Adic Cantor Series Expansions
Kanasri, N. R.
Laohakosol, V.
PROCEEDINGS OF THE INTERNATIONAL CONFERENCE ON ALGEBRA 2010: ADVANCES IN ALGEBRAIC STRUCTURES, 2012, : 346 - 355
[39] An irrationality criterion for p-adic binomial series
Matala-aho, T
NUMBER THEORY, 2001, : 193 - 199
[40] Complementary Bell Numbers and p-adic Series
Subedi, Deepak
JOURNAL OF INTEGER SEQUENCES, 2014, 17 (03)

← 1 2 3 4 5 →