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On the existence and stability of unfoldings of equivariant two-parameter bifurcation problems.

Li, Bing; Zou, Jiancheng — 2001

Southwest Journal of Pure and Applied Mathematics [electronic only]

Dissipativity of neural networks with continuously distributed delays.

Li, Bing; Xu, Daoyi — 2006

Electronic Journal of Differential Equations (EJDE) [electronic only]

Hausdorff dimension of affine random covering sets in torus

Esa Järvenpää; Maarit Järvenpää; Henna Koivusalo; Bing Li; Ville Suomala — 2014

Annales de l'I.H.P. Probabilités et statistiques

We calculate the almost sure Hausdorff dimension of the random covering set ${lim sup}_{n \to \infty} (g_{n} + ξ_{n})$ in $d$ -dimensional torus $𝕋^{d}$ , where the sets $g_{n} \subset 𝕋^{d}$ are parallelepipeds, or more generally, linear images of a set with nonempty interior, and $ξ_{n} \in 𝕋^{d}$ are independent and uniformly distributed random points. The dimension formula, derived from the singular values of the linear mappings, holds provided that the sequences of the singular values are decreasing.

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Currently displaying 1 – 3 of 3

On the existence and stability of unfoldings of equivariant two-parameter bifurcation problems.

Dissipativity of neural networks with continuously distributed delays.

Hausdorff dimension of affine random covering sets in torus