HOW TO REDUCE A GENERALIZATION OF THE TRICOMI PROBLEM FOR A SYSTEM OF EQUATIONS TO THE CONVENTIONAL TRICOMI PROBLEM

被引：0

作者：

KRASILNIKOV, MG ^{[1
]}

机构：

[1] NIZHNII NOVGOROD POLYTECH INST,NIZHNII NOVGOROD,RUSSIA

来源：

关键词：

D O I：

暂无

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

引用

页码：310 / 313

页数：4

共 50 条

[1] Generalization of the Tricomi Problem
Mirsaburov, M.
Begaliev, O.
Khurramov, N. Kh.
[J]. DIFFERENTIAL EQUATIONS, 2019, 55 (08) : 1084 - 1093
[2] Generalization of the Tricomi Problem
M. Mirsaburov
O. Begaliev
N. Kh. Khurramov
[J]. Differential Equations, 2019, 55 : 1084 - 1093
[3] Tricomi Problem and Integral Equations
Pleshchinskii, N. B.
[J]. UCHENYE ZAPISKI KAZANSKOGO UNIVERSITETA-SERIYA FIZIKO-MATEMATICHESKIE NAUKI, 2024, 166 (01): : 74 - 91
[4] THE PROPERTIES OF SOLUTIONS OF THE TRICOMI PROBLEM FOR EULER-TRICOMI EQUATIONS
BABENKO, KI
[J]. DOKLADY AKADEMII NAUK SSSR, 1986, 288 (05): : 1033 - 1038
[5] THE TRICOMI PROBLEM
BABENKO, KI
[J]. DOKLADY AKADEMII NAUK SSSR, 1986, 291 (01): : 14 - 19
[6] ON THE TRICOMI PROBLEM
ADOMIAN, G
BELLOMO, N
[J]. COMPUTERS & MATHEMATICS WITH APPLICATIONS-PART A, 1986, 12 (4-5): : 557 - 563
[7] SPECIAL CASES OF THE DARBU PROBLEM FOR THE SYSTEM OF EQUATIONS OF TRICOMI TYPE EQUATIONS
ROMASHEVSKAYA, EF
[J]. IZVESTIYA VYSSHIKH UCHEBNYKH ZAVEDENII MATEMATIKA, 1983, (12): : 73 - 75
[8] THE TRICOMI PROBLEM FOR A SYSTEM OF EQUATIONS OF PARABOLIC-HYPERBOLIC TYPE
KAPUSTIN, NJ
[J]. DOKLADY AKADEMII NAUK SSSR, 1982, 264 (01): : 38 - 39
[9] TRICOMI PROBLEM FOR A SYSTEM OF MIXED-TYPE EQUATIONS ON A PLANE
PONOMAREV, SM
[J]. DOKLADY AKADEMII NAUK SSSR, 1978, 242 (06): : 1256 - 1257
[10] TRICOMI PROBLEM FOR NONLINEAR EQUATIONS OF MIXED TYPE
BITSADZE, AV
[J]. DOKLADY AKADEMII NAUK SSSR, 1977, 235 (04): : 733 - 736