TY - JOUR
T1 - Maximum principles and boundary value problems for first-order neutral functional differential equations
AU - Domoshnitsky, Alexander
AU - Maghakyan, Abraham
AU - Shklyar, Roman
N1 - Funding Information:
This research was supported by The Israel Science Foundation (Grant no. 828/07). The authors thank the reviewers for their valuable suggestions.
PY - 2009
Y1 - 2009
N2 - We obtain the maximum principles for the first-order neutral functional differential equation (M x) (t) x ′ (t) - (S x ′) (t) - (A x) (t) + (B x) (t) = f (t), t [ 0, ], where A: C [ 0, ] → L [ 0, ] ∞, B: C [ 0, ] → L [ 0, ] ∞, and S: L [ 0, ] ∞ → L [ 0, ] ∞ are linear continuous operators, A and B are positive operators, C [ 0, ] is the space of continuous functions, and L [ 0, ] ∞ is the space of essentially bounded functions defined on [ 0, ]. New tests on positivity of the Cauchy function and its derivative are proposed. Results on existence and uniqueness of solutions for various boundary value problems are obtained on the basis of the maximum principles.
AB - We obtain the maximum principles for the first-order neutral functional differential equation (M x) (t) x ′ (t) - (S x ′) (t) - (A x) (t) + (B x) (t) = f (t), t [ 0, ], where A: C [ 0, ] → L [ 0, ] ∞, B: C [ 0, ] → L [ 0, ] ∞, and S: L [ 0, ] ∞ → L [ 0, ] ∞ are linear continuous operators, A and B are positive operators, C [ 0, ] is the space of continuous functions, and L [ 0, ] ∞ is the space of essentially bounded functions defined on [ 0, ]. New tests on positivity of the Cauchy function and its derivative are proposed. Results on existence and uniqueness of solutions for various boundary value problems are obtained on the basis of the maximum principles.
UR - http://www.scopus.com/inward/record.url?scp=70449394316&partnerID=8YFLogxK
U2 - 10.1155/2009/141959
DO - 10.1155/2009/141959
M3 - ???researchoutput.researchoutputtypes.contributiontojournal.article???
AN - SCOPUS:70449394316
SN - 1025-5834
VL - 2009
JO - Journal of Inequalities and Applications
JF - Journal of Inequalities and Applications
M1 - 141959
ER -