# Search results

Journal of Differential Equations > 2018 > 265 > 10 > 4993-5030

Numerical Algorithms > 2018 > 78 > 4 > 1019-1044

Computational Mathematics and Mathematical Physics > 2014 > 54 > 11 > 1647-1658

Nonlinear Analysis > 2009 > 71 > 12 > e2023-e2027

Nonlinear Analysis > 2009 > 71 > 12 > e346-e350

Nonlinear Analysis > 2009 > 70 > 5 > 1830-1840

Nonlinear Analysis > 2009 > 70 > 1 > 352-363

Nonlinear Analysis > 2008 > 69 > 1 > 85-109

Journal of Geometry and Physics > 2008 > 58 > 3 > 368-376

Set-Valued and Variational Analysis > 2008 > 16 > 5-6 > 597-619

Nonlinear Differential Equations and Applications NoDEA > 2007 > 14 > 3-4 > 361-376

*X*, where $$A : D\,(A)\, {\subset}\, X \rightarrow X$$ is m-accretive and such that –

*A*generates a compact semigroup, $$F : [0,T] \times X \rightarrow 2^{X}$$ has nonempty, closed and convex values, and is strongly-weakly...

Journal of Mathematical Analysis and Applications > 2006 > 314 > 2 > 631-643

Journal of Mathematical Analysis and Applications > 2005 > 311 > 1 > 162-181

Applied Mathematics Letters > 2005 > 18 > 4 > 401-407

Nonlinear Analysis > 2005 > 60 > 7 > 1219-1237

Computers and Mathematics with Applications > 2005 > 49 > 1 > 147-155

^{X}be an m-accretive operator. Let C : D(T) ⊂ X → X be a bounded operator (not necessarily continuous) such that C(T + I)

^{−1}is compact. Suppose that for every x ∈ D(T) with ∥x∥ > r, there exists jx ∈ Jx such that 〈u+Cx,jx 〉≥0,for all u ∈ Tx. Then, we have 0∈(T+C)(D(T)∩Br(0)),¯ where B

_{r}(0) denotes the open ball of X with...

Computers and Mathematics with Applications > 2004 > 47 > 4-5 > 767-778

Nonlinear Analysis > 2003 > 52 > 1 > 305-314

_{t})u(t)=0,t R, where A(t,φ) are nonlinear operators acting on a Banach space, X. We establish, under certain additional assumptions on X and the operator A, the existence of a ω-periodic generalized solution.

Applied Mathematics and Computation > 2002 > 133 > 2-3 > 389-406

^{*}has a Frechet differentiable norm. Let A:D(A) X->2

^{X}be an m-accretive operator with closed domain D(A) and bounded range R(A) and S:X->X a continuous and α-strongly accretive operator with bounded range R(I-S). It is proved that the Ishikawa and Mann iterative processes with mixed errors converge strongly to...