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Preference Theories on Weak Orders. [PDF]

, 2019
We study the rational preferences of an agent participating to a mechanism whose outcome is a weak order among participants. We propose a set of self-interest axioms and characterize the resulting preference theories.
Faella M., Sauro L.
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“Weak” stochastic orderings and dependence measures

Journal of Statistical Planning and Inference, 2009
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Fountain, R. L., Talebi, Aaron
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Weak and strong fuzzy interval orders

Fuzzy Sets and Systems, 1996
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Bernard De Baets, Bartel A. Van de Walle
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Partial Order Semantics and Weak Fairness

1995
Causality-based partial order semantics allows an easy formulation of weak fairness. It is demonstrated that this is true also for other partial order semantics, namely for partial words and interval semiwords.
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A Weak First-Order Theory of Sequences

We introduce a first-order theory Seq which is mutually interpretable with Robinson’s Q. The universe of a standard model for Seq consists of sequences. We prove that Seq directly interprets the adjunctive set theory AST, and we prove that Seq interprets the tree theory T and the set theory AST+EXT.
Lars Kristiansen, Juvenal Murwanashyaka
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Stability of weak second-order semantics

Studia Logica, 1988
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Relativized Weak Mixing of Uncountable Order

Canadian Journal of Mathematics, 1980
We show that if Y is a metric minimal flow and θ: Y→Z in an open homomorphism that has a section (i.e., a RIM), and if S(θ)= R(θ),then °YΩ contains a dense set of transitive points, where Ω is the first uncountable ordinalYΩ = П{Y:1 ≦ α < Ω and α not a limit ordinal}, and°YΩ = {y ∈ YΩ:θ(yα)= θ(yβ)for 1 ≦ α,β < Ω and α, β not limit ordinals},S(θ ...
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Two‐order superconvergence for a weak Galerkin method on rectangular and cuboid grids

Numerical Methods for Partial Differential Equations, 2023
JunPing Wang, Xiaoshen Wang, Xiu Ye
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A stabilizer free weak Galerkin finite element method with supercloseness of order two

Numerical Methods for Partial Differential Equations, 2021
Ahmed Al-Taweel, Xiaoshen Wang, Xiu Ye   +2 more
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A high-order nonlinear Schrödinger equation with the weak non-local nonlinearity and its optical solitons

Results in Physics, 2021
K Hosseini, Khadijeh Sadri, Mohammad Mirzazadeh   +2 more
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