Existence of solutions for a class of semilinear evolution equations with impulses and delays
H. Leiva
School of Mathematical Sciences and Information Technology, Department of Mathematics, San Miguel de Urcuqui-100119, Imbabura-Ecuador
P. Sundar
Louisiana State University, Department of Mathematics, Baton Rouge, LA -70803, USA
Received on November 12, 2016
Accepted on March 26, 2017
Communicated by Toka Diagana
Abstract. We prove the existence and uniqueness of the solutions for the followingclass of semilinear evolution equations with impulses and delaysz ́ = −Az + F(t, zt), z ∈ Z, t ∈ (0, τ ], t ≠ tk,where 0 t1 p a Banach space, zt defined as a function from [−r, 0] to Z by zt(s) = z(t + s), −r ≤ s ≤ 0, and Jk : [0, τ ] × Zα → Zα, F : [0, τ ] × C(−r, 0;Zα) → Z. In the above problem, A : D(A) ⊂ Z → Z is a sectorial operator in Z with −A being the generator of a strongly continuous compact semigroup {T(t)}t≥0, and Zα = D(Aα). The novelty of this work is that our class of evolution equations contain nonlinear terms that involve spatial derivatives. Our framework includes several important partial differential equations such as Burgers Equation with impulses and delays. |
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| Keywords: | Sectorial operator, Fractional power spaces, Semigroups, Semilinear evolution equations, Impulses, Delays, Karakostas fixed point theorem. |
| 2010 Mathematics Subject Classification: 34K30, 34k35, 35R10; secondary: 93B05, 93C10. | |