Publication detail
Existence and Asymptotic Estimates of Solutions of Singular Cauchy Problems for Certain Classes of Integrodifferential Equations
ŠMARDA, Z.
Original Title
Existence and Asymptotic Estimates of Solutions of Singular Cauchy Problems for Certain Classes of Integrodifferential Equations
English Title
Existence and Asymptotic Estimates of Solutions of Singular Cauchy Problems for Certain Classes of Integrodifferential Equations
Type
conference paper
Language
en
Original Abstract
asymptotic estimates of solution formulas are studied for certain classes integrodifferential equations in a neighbourhood of a singular point. Solutions are located in a domain homeomorphic to a cone having vertex coinciding with the initial point. The proofs are based on a combination of the topological method of Wazewski and the Schauder fixed point theorem or on the Banach contraction principle, respectively.
English abstract
asymptotic estimates of solution formulas are studied for certain classes integrodifferential equations in a neighbourhood of a singular point. Solutions are located in a domain homeomorphic to a cone having vertex coinciding with the initial point. The proofs are based on a combination of the topological method of Wazewski and the Schauder fixed point theorem or on the Banach contraction principle, respectively.
Keywords
Integodifferential equation
RIV year
2011
Released
28.10.2011
Location
Sanghai- Čína
ISBN
978-1-61284-363-6
Book
Proceedings 2011 World Congress on Engineering and Technology
Edition number
vol.1
Pages from
225
Pages to
229
Pages count
4
Documents
BibTex
@inproceedings{BUT74275,
author="Zdeněk {Šmarda}",
title="Existence and Asymptotic Estimates of Solutions of Singular Cauchy Problems for Certain Classes of Integrodifferential Equations",
annote="asymptotic estimates of solution formulas are studied
for certain classes integrodifferential equations in a neighbourhood
of a singular point. Solutions are located in a domain
homeomorphic to a cone having vertex coinciding with the initial
point. The proofs are based on a combination of the topological
method of Wazewski and the Schauder fixed point theorem
or on the Banach contraction principle, respectively.",
booktitle="Proceedings 2011 World Congress on Engineering and Technology",
chapter="74275",
howpublished="electronic, physical medium",
year="2011",
month="october",
pages="225--229",
type="conference paper"
}