First Order Partial Functional Differential Equations with Unbounded Delay

Z. Kamont; S. Kozie

doi:10.1515/GMJ.2003.509

First Order Partial Functional Differential Equations with Unbounded Delay

Z. Kamont
, S. Kozie

Department of Engineering

Reykjavik University

Research output: Contribution to journal › Article › peer-review

Abstract

The phase space for nonlinear hyperbolic functional differential equations with unbounded delay is constructed. The set of axioms for generalized solutions of initial problems is presented. A theorem on the existence and continuous dependence upon initial data is given. The Cauchy problem is transformed into a system of integral functional equations. The existence of solutions of this system is proved by the method of successive approximations and by using theorems on integral inequalities. Examples of phase spaces are given.

Original language	English
Pages (from-to)	509-530
Number of pages	22
Journal	Georgian Mathematical Journal
Volume	10
Issue number	3
DOIs	https://doi.org/10.1515/GMJ.2003.509
Publication status	Published - 2003

Other keywords

bicharacteristics
generalized solutions
local existence
unbounded delay

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10.1515/GMJ.2003.509

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title = "First Order Partial Functional Differential Equations with Unbounded Delay",

abstract = "The phase space for nonlinear hyperbolic functional differential equations with unbounded delay is constructed. The set of axioms for generalized solutions of initial problems is presented. A theorem on the existence and continuous dependence upon initial data is given. The Cauchy problem is transformed into a system of integral functional equations. The existence of solutions of this system is proved by the method of successive approximations and by using theorems on integral inequalities. Examples of phase spaces are given.",

keywords = "bicharacteristics, generalized solutions, local existence, unbounded delay",

author = "Z. Kamont and S. Kozie",

year = "2003",

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language = "English",

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AU - Kamont, Z.

AU - Kozie, S.

PY - 2003

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N2 - The phase space for nonlinear hyperbolic functional differential equations with unbounded delay is constructed. The set of axioms for generalized solutions of initial problems is presented. A theorem on the existence and continuous dependence upon initial data is given. The Cauchy problem is transformed into a system of integral functional equations. The existence of solutions of this system is proved by the method of successive approximations and by using theorems on integral inequalities. Examples of phase spaces are given.

AB - The phase space for nonlinear hyperbolic functional differential equations with unbounded delay is constructed. The set of axioms for generalized solutions of initial problems is presented. A theorem on the existence and continuous dependence upon initial data is given. The Cauchy problem is transformed into a system of integral functional equations. The existence of solutions of this system is proved by the method of successive approximations and by using theorems on integral inequalities. Examples of phase spaces are given.

KW - bicharacteristics

KW - generalized solutions

KW - local existence

KW - unbounded delay

UR - https://www.scopus.com/pages/publications/84885087392

U2 - 10.1515/GMJ.2003.509

DO - 10.1515/GMJ.2003.509

M3 - Article

SN - 1072-947X

VL - 10

SP - 509

EP - 530

JO - Georgian Mathematical Journal

JF - Georgian Mathematical Journal

IS - 3

ER -

First Order Partial Functional Differential Equations with Unbounded Delay

Abstract

Other keywords

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