The Brownian transport map. [PDF]
Probab Theory Relat FieldsMikulincer D, Shenfeld Y.
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Computer-Assisted Proofs of Hopf Bubbles and Degenerate Hopf Bifurcations. [PDF]
J Dyn Differ EquChurch K, Queirolo E.
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Modeling and analysis using piecewise hybrid fractional operator in time scale measure for ebola virus epidemics under Mittag-Leffler kernel. [PDF]
Sci RepNaik PA +5 more
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On mathematical modelling of measles disease via collocation approach. [PDF]
AIMS Public HealthAhmed S, Jahan S, Shah K, Abdeljawad T.
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Existence of Traveling Waves of a Diffusive Susceptible-Infected-Symptomatic-Recovered Epidemic Model with Temporal Delay. [PDF]
Mathematics (Basel)Miranda JC +3 more
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Optimal control of monomers and oligomers degradation in an Alzheimer's disease model. [PDF]
J Math BiolBulai IM, Ferraresso F, Gladiali F.
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Uniformly convex Banach spaces are reflexive—constructively [PDF]
Mathematical Logic Quarterly, 2013 We propose a natural definition of what it means in a constructive context for a Banach space to be reflexive, and then prove a constructive counterpart of the Milman‐Pettis theorem that uniformly convex Banach spaces are reflexive.
Douglas S. Bridges +2 more
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BASES IN UNIFORMLY CONVEX AND UNIFORMLY FLATTENED BANACH SPACES
Mathematics of the USSR-Izvestiya, 1971The aim of this article is to obtain two-sided estimates for the norm of an element x in a uniformly convex and uniformly flattened Banach space E in terms of lp-norms of the sequence of coefficients which occur in the expansion of x in a basis .
V I Gurariĭ, N I Gurariĭ
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On nearly uniformly convex Banach spaces
Mathematical Proceedings of the Cambridge Philosophical Society, 1983A real Banach space (X, ‖ · ‖) is said to be uniformly convex (UC) (or uniformly rotund) if for all ∈ > 0 there is a δ > 0 such that if ‖x| ≤ 1, ‖y‖ ≤ 1 and ‖x−y‖ ≥ ∈, then ‖(x + y)/2‖ ≤ 1− δ.
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Uniformly smooth renormings of uniformly convex Banach spaces
Journal of Soviet Mathematics, 1985Translation from Zap. Nauchn. Semin. Leningr. Otd. Mat. Inst. Steklova 135, 120-134 (Russian) (1984; Zbl 0538.46014).
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