TitleProbability in Banach Spaces III [electronic resource] : Proceedings of the Third International Conference on Probability in Banach Spaces Held at Tufts University, Medford, USA, August 4-16, 1980 / edited by Anatole Beck
ImprintBerlin, Heidelberg : Springer Berlin Heidelberg, 1981
Connect tohttp://dx.doi.org/10.1007/BFb0090603
Descript VIII, 332 p. online resource

CONTENT

Statistics on Banach space valued gaussian random variables -- Martingales, amarts and related stopping time techniques -- Weak compactness of solution measures associated with random equations -- Martingale transforms and the geometry of Banach spaces -- Kernel associated with a cylindrical measure -- Continuous parameter uniform amarts -- Some strong and weak laws of large numbers for weighted sums in D[0,1] -- Some recent results on empirical processes -- Mesures Majorantes, Majoration Et Continuite De Fonctions Aleatoires, Exemples De Construction -- Central limit theorems in Banach spaces: A survey -- Growth rates for sums of i.i.d. Hilbert space valued random variables -- The pointwise translation problem for the radon transform in Banach spaces -- A survey of generalized domains of attraction and operator norming methods -- Marcinkiewicz-zygmund weak laws of large numbers for unconditional random elements in Banach spaces -- Stability of linear forms in independent random variables in Banach spaces -- Gaussian measures in certain function spaces -- Convergence of types, selfdecomposability and stability of measures on linear spaces -- The law of the iterated logarithm for Banach space valued random variables -- Multidimensional infinitely divisidle variables and processes Part II -- Domain of attraction problem on Banach spaces: A survey -- Exponents of operator-stable laws -- Souslin support and Fourier expansion of a Gaussian radon measure -- Stability of quadratic forms in independent random variables in Banach spaces -- Inequalities in Banach spaces with applications to limit theorems in probability โ A survey


SUBJECT

  1. Mathematics
  2. Algebra
  3. Functional analysis
  4. Probabilities
  5. Mathematics
  6. Probability Theory and Stochastic Processes
  7. Algebra
  8. Functional Analysis