A New Topological Degree Theory for Perturbations of Demicontinuous Operators and Applications to Nonlinear Equations with Nonmonotone Nonlinearities. (5th December 2016)
- Record Type:
- Journal Article
- Title:
- A New Topological Degree Theory for Perturbations of Demicontinuous Operators and Applications to Nonlinear Equations with Nonmonotone Nonlinearities. (5th December 2016)
- Main Title:
- A New Topological Degree Theory for Perturbations of Demicontinuous Operators and Applications to Nonlinear Equations with Nonmonotone Nonlinearities
- Authors:
- Asfaw, Teffera M.
- Other Names:
- Petrusel Adrian Academic Editor.
- Abstract:
- Abstract : Let X be a real reflexive locally uniformly convex Banach space with locally uniformly convex dual space X ⁎ . Let T : X ⊇ D T → 2 X ⁎ be maximal monotone of type Γ d ϕ (i.e., there exist d ≥ 0 and a nondecreasing function ϕ : 0, ∞ → 0, ∞ with ϕ ( 0 ) = 0 such that 〈 v ⁎, x - y 〉 ≥ - d x - ϕ y for all x ∈ D T, v ⁎ ∈ T x, and y ∈ X ), L : X ⊃ D ( L ) → X ⁎ be linear, surjective, and closed such that L - 1 : X ⁎ → X is compact, and C : X → X ⁎ be a bounded demicontinuous operator. A new degree theory is developed for operators of the type L + T + C . The surjectivity of L can be omitted provided that R L is closed, L is densely defined and self-adjoint, and X = H, a real Hilbert space. The theory improves the degree theory of Berkovits and Mustonen for L + C, where C is bounded demicontinuous pseudomonotone. New existence theorems are provided. In the case when L is monotone, a maximality result is included for L and L + T . The theory is applied to prove existence of weak solutions in X = L 2 0, T ; H 0 1 Ω of the nonlinear equation given by ∂ u / ∂ t - ∑ i = 1 N ( ∂ / ∂ x i ) A i x, u, ∇ u + H λ x, u, ∇ u = f x, t, x, t ∈ Q T ; u x, t = 0, x, t ∈ ∂ Q T ; and u x, 0 = u x, T, x ∈ Ω, where λ > 0, Q T = Ω × 0, T, ∂ Q T = ∂ Ω × 0, T, A i x, u, ∇ u = ∂ / ∂ x i ρ x, u, ∇ u + a i x, u, ∇ u ( i = 1, 2, …, N ), H λ x, u, ∇ u = - λ Δ u + g x, u, ∇ u, Ω is a nonempty, bounded, and open subset of R N with smooth boundary, and ρ, a i, g : Ω ¯ × R × R N → R satisfyAbstract : Let X be a real reflexive locally uniformly convex Banach space with locally uniformly convex dual space X ⁎ . Let T : X ⊇ D T → 2 X ⁎ be maximal monotone of type Γ d ϕ (i.e., there exist d ≥ 0 and a nondecreasing function ϕ : 0, ∞ → 0, ∞ with ϕ ( 0 ) = 0 such that 〈 v ⁎, x - y 〉 ≥ - d x - ϕ y for all x ∈ D T, v ⁎ ∈ T x, and y ∈ X ), L : X ⊃ D ( L ) → X ⁎ be linear, surjective, and closed such that L - 1 : X ⁎ → X is compact, and C : X → X ⁎ be a bounded demicontinuous operator. A new degree theory is developed for operators of the type L + T + C . The surjectivity of L can be omitted provided that R L is closed, L is densely defined and self-adjoint, and X = H, a real Hilbert space. The theory improves the degree theory of Berkovits and Mustonen for L + C, where C is bounded demicontinuous pseudomonotone. New existence theorems are provided. In the case when L is monotone, a maximality result is included for L and L + T . The theory is applied to prove existence of weak solutions in X = L 2 0, T ; H 0 1 Ω of the nonlinear equation given by ∂ u / ∂ t - ∑ i = 1 N ( ∂ / ∂ x i ) A i x, u, ∇ u + H λ x, u, ∇ u = f x, t, x, t ∈ Q T ; u x, t = 0, x, t ∈ ∂ Q T ; and u x, 0 = u x, T, x ∈ Ω, where λ > 0, Q T = Ω × 0, T, ∂ Q T = ∂ Ω × 0, T, A i x, u, ∇ u = ∂ / ∂ x i ρ x, u, ∇ u + a i x, u, ∇ u ( i = 1, 2, …, N ), H λ x, u, ∇ u = - λ Δ u + g x, u, ∇ u, Ω is a nonempty, bounded, and open subset of R N with smooth boundary, and ρ, a i, g : Ω ¯ × R × R N → R satisfy suitable growth conditions. In addition, a new existence result is given concerning existence of weak solutions for nonlinear wave equation with nonmonotone nonlinearity. … (more)
- Is Part Of:
- Journal of function spaces. Volume 2016(2016)
- Journal:
- Journal of function spaces
- Issue:
- Volume 2016(2016)
- Issue Display:
- Volume 2016, Issue 2016 (2016)
- Year:
- 2016
- Volume:
- 2016
- Issue:
- 2016
- Issue Sort Value:
- 2016-2016-2016-0000
- Page Start:
- Page End:
- Publication Date:
- 2016-12-05
- Subjects:
- Function spaces -- Periodicals
515.7305 - Journal URLs:
- https://www.hindawi.com/journals/jfs/ ↗
- DOI:
- 10.1155/2016/3970621 ↗
- Languages:
- English
- ISSNs:
- 2314-8896
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library HMNTS - ELD Digital store
- Ingest File:
- 22801.xml