Results 161 to 170 of about 31,694 (211)

Upper Bound for the Grand Canonical Free Energy of the Bose Gas in the Gross-Pitaevskii Limit for General Interaction Potentials. [PDF]

Ann Henri Poincare
Caporaletti M, Deuchert A.
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Block diagonal Calderón preconditioning for scattering at multi-screens. [PDF]

BIT Numer Math
Cools K, Urzúa-Torres C.
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Dynamic Stability Enhancement of Columns Through Material Distribution Optimization Strategies. [PDF]

Materials (Basel)
Szmidla J, Jurczyńska A, Ulewicz R.
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Mathematical Foundations of the Non-Hermitian Skin Effect. [PDF]

Arch Ration Mech Anal
Ammari H, Barandun S, Cao J, Davies B, Hiltunen EO.   +4 more
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Plasticity-Induced Heating: Revisiting the Energy-Based Variational Model. [PDF]

Materials (Basel)
Hartmann C, Obermeyer M.
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The Generalized Quasi-Variational Inequality Problem

Mathematics of Operations Research, 1982
In this paper, we introduce the generalized quasi-variational inequality problem and develop a theory for the existence of solution. This new problem includes as special cases two existing generalizations of the classical variational inequality problem. Relationship with a certain implicit complementarity problem is also studied.
Chan, D., Pang, J. S.
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On Parametric Generalized Quasi-Variational Inequalities

Journal of Optimization Theory and Applications, 1999
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Ding, X. P., Luo, C. L.
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Random Quasi‐Variational Inequality

Mathematische Nachrichten, 1986
Let X be a topological locally convex Hausdorff space, \(X^*\) the dual space of X equipped with the topology of uniform convergence on bounded subsets of X, C a non empty convex compact subset of X. Let E be a continuous multifunction from C to \(2^ C\), F be a u.s.c. multifunction from C to \(2^{X^*}\) and \(\phi\) be a l.s.c.
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Mixed quasi variational inequalities

Applied Mathematics and Computation, 2003
The author studies the ``mixed quasi variational inequality problem'', that is, the problem of finding \(u\in H\) such that for all \(v\in H\), \[ \langle T(u),v-u\rangle+\varphi(v,u)-\varphi(u,u)\geq0, \] where \(H\) is a Hilbert space, \(T:H\rightarrow H\) is a non-linear operator and \(\varphi:H\times H\rightarrow\mathbb{R}\cup\{+\infty\}\) is a ...
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