Gevrey Order and Summability of Formal Series Solutions of Certain Classes of Inhomogeneous Linear Integro-Differential Equations with Variable Coefficients

被引:14
作者
Remy, Pascal [1 ]
机构
[1] Lycee Les Pierres Vives, 1 Rue Alouettes, F-78420 Carrieres Sur Seine, France
来源
JOURNAL OF DYNAMICAL AND CONTROL SYSTEMS | 2017年 / 23卷 / 04期
关键词
Linear integro-differential equation; Divergent power series; Newton polygon; Gevrey order; Summability; PARTIAL-DIFFERENTIAL-EQUATIONS; BOREL SUMMABILITY; DIVERGENT SOLUTIONS; STOKES PHENOMENON; NEWTON POLYGONS; HEAT-EQUATION; MULTISUMMABILITY;
D O I
10.1007/s10883-017-9371-x
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
In this article, we investigate Gevrey and summability properties of formal power series solutions of certain classes of inhomogeneous linear integro-differential equations with analytic coefficients in a neighborhood of (0, 0) is an element of C-2 . In particular, we give necessary and sufficient conditions under which these solutions are convergent or are k-summable, for a convenient positive rational number k, in a given direction.
引用
收藏
页码:853 / 878
页数:26
相关论文
共 34 条
[1]   Multi summability of formal power series solutions of partial differential equations with constant coefficients [J].
Balser, W .
JOURNAL OF DIFFERENTIAL EQUATIONS, 2004, 201 (01) :63-74
[2]   Divergent solutions of the heat equation: On an article of Lutz, Miyake and Schafke [J].
Balser, W .
PACIFIC JOURNAL OF MATHEMATICS, 1999, 188 (01) :53-63
[3]  
Balser W., 1999, ACTA SCI MATH, V65, P543
[4]  
BALSER W., 2000, Formal power series and linear systems of meromorphic ordinary differential equations
[5]  
Balser W., 1991, ASYMPTOTIC ANAL, V5, P27
[6]  
Balser W., 2009, Adv. Dyn. Syst. Appl, V4, P159
[7]   Gevrey Order of Formal Power Series Solutions of Inhomogeneous Partial Differential Equations with Constant Coefficients [J].
Balser, Werner ;
Yoshino, Masafumi .
FUNKCIALAJ EKVACIOJ-SERIO INTERNACIA, 2010, 53 (03) :411-434
[8]   MULTISUMMABILITY AND STOKES MULTIPLIERS OF LINEAR MEROMORPHIC DIFFERENTIAL-EQUATIONS [J].
BRAAKSMA, BLJ .
JOURNAL OF DIFFERENTIAL EQUATIONS, 1991, 92 (01) :45-75
[9]  
Canalis-Durand M, 2000, J REINE ANGEW MATH, V518, P95
[10]   Borel summability of the heat equation with variable coefficients [J].
Costin, O. ;
Park, H. ;
Takei, Y. .
JOURNAL OF DIFFERENTIAL EQUATIONS, 2012, 252 (04) :3076-3092
1234