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A modified combined relaxation method for non-linear convex variational inequalities© 2013, © 2013 Taylor & Francis. We consider a class of non-linear problems which is intermediate
Domains of convergence for Ahypergeometric series and integralsWe prove two theorems on the domains of convergence for A-hypergeometric series and for associated
Studying the formation of Si (100) stepped surface in molecular-beam epitaxy in the substrate temperature on the transition to a single-domain structure is non-monotonic: a single-domain
Data Analytics and Management in Data Intensive Domains: ХХI International Conference DAМDIDThe “Data Analytics and Management in Data Intensive Domains”
conference (DAMDID) is held as a
Domains of Convergence for A-hypergeometric Series and IntegralsWe prove two theorems on the domains of convergence for A-hypergeometric series and for associated
A combined relaxation method for nonlinear variational inequalities, rather than one, nonlinear mappings and a nonsmooth convex function. We establish a convergence result
Generalizations of Some Hardy-Littlewood-Pólya Type Inequalities and Related Results for real valued functions and r-convex functions respectively. We also obtain generalizations of some Hardy
Spectral properties of the Neumann-Laplace operator in quasiconformal regular domains regular domains Ω⊂R2. This study is based on the quasiconformal theory of composition operators on Sobolev
Fractional fermion number and Hall conductivity of domain walls governing the fermionic fluctuations around the domain wall. A formula is derived showing that a non null
Hyperbolic equations with growing coefficients in unbounded domains sge0, in the unknown u=u(t,x) on an unbounded domain OmegasubsetBbb{R}^N, Nge2, with smooth boundary
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