Ramsey-like properties for bi-Lipschitz mappings of finite metric spaces
暂无分享,去创建一个
[1] Joram Lindenstrauss,et al. On nonlinear projections in Banach spaces. , 1964 .
[2] Per Enflo,et al. On a problem of Smirnov , 1970 .
[3] P. Enflo. Uniform structures and square roots in topological groups , 1970 .
[4] N. Aronszajn,et al. Differentiability of Lipschitzian mappings between Banach spaces , 1976 .
[5] Jaroslav Nesetril,et al. Surveys in Combinatorics: Partition theory and its applications , 1979 .
[6] G. Schechtman. Random embeddings of Euclidean spaces in sequence spaces , 1981 .
[7] N. Alon,et al. Embedding ofl∞k in finite dimensional Banach spaces , 1983 .
[8] Jean Bourgain,et al. On hilbertian subsets of finite metric spaces , 1986 .
[9] Jean Bourgain,et al. On type of metric spaces , 1986 .
[10] V. Milman,et al. Asymptotic Theory Of Finite Dimensional Normed Spaces , 1986 .
[11] David Preiss,et al. Differentiability of Lipschitz functions on Banach spaces , 1990 .
[12] J. Spencer. Ramsey Theory , 1990 .
[13] The Uniform Classification of Banach Spaces , 1994, math/9406215.
[14] Ramsey Theory,et al. Ramsey Theory , 2020, Set Theory and Foundations of Mathematics: An Introduction to Mathematical Logic.