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Research output: Thesis › Doctoral Thesis

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**A study of stochastic processes in Banach spaces.** / Groves, James Stuart.

Research output: Thesis › Doctoral Thesis

Groves, JS 2000, 'A study of stochastic processes in Banach spaces', PhD, Lancaster University. https://doi.org/10.17635/lancaster/thesis/286

Groves, J. S. (2000). *A study of stochastic processes in Banach spaces*. Lancaster University. https://doi.org/10.17635/lancaster/thesis/286

Groves JS. A study of stochastic processes in Banach spaces. Lancaster University, 2000. 103 p. https://doi.org/10.17635/lancaster/thesis/286

@phdthesis{dc4c977830ba4460a41f1cf1cf3c8aff,

title = "A study of stochastic processes in Banach spaces",

abstract = "The theory of 2-convex norms is applied to Banach space valued random vectors. Use is made of a norm on random vectors, introduced by Pisier, equal to the 2-absolutely summing norm on an associated space of operators.For Q the variance of some centred Gaussian random vector in a separable Banach space it is shown that, necessarily, Q factors through l2 as a product of 2-summing operators. This factorisation condition is sufficient when the Banach space is of Gaussian type 2. The stochastic integral of a family of operators with respect to a cylindrical Q-Wiener process is shown to exist under a H{\"o}lder continuity condition involving the 2-summing norm.A Langevin equation dZt + ΛZtdt = dBt with values in a separable Banach space is studied. The operator Λ is closed and densely defined. A weak solution (Zt ; Bt), where Zt is centred, Gaussian and stationary while Bt is a Q-Wiener process, is given when iΛ and iΛ* generate C0 groups and the resolvent of Λ is uniformly bounded on the imaginary axis. Both Zt and Bt are stochastic integrals with respect to a spectral Q-Wiener process.The convolution of two arcsine probability densities is shown to be an elliptic integral. Ensembles (Xn)n≥1 of random Hermitian matrices are considered. Each Xn is n by n with distribution invariant under unitary conjugation and induced by a positive weight function on R. New proofs are given of results, due to Boutet de Monvel, Pastur, Shcherbina and Sodin, on the behaviour of the empirical distribution of the eigenvalues of Xn as n tends to infinity.Results in analytic function theory are proved. An H∞ interpolating sequence in the disc D whose Horowitz product does not lie in the Bergman space L2a(D) is exhibited. A condition satisfied by Banach spaces of non-trivial analytic Lusin cotype is obtained.",

author = "Groves, {James Stuart}",

year = "2000",

doi = "10.17635/lancaster/thesis/286",

language = "English",

publisher = "Lancaster University",

school = "Lancaster University",

}

TY - THES

T1 - A study of stochastic processes in Banach spaces

AU - Groves, James Stuart

PY - 2000

Y1 - 2000

N2 - The theory of 2-convex norms is applied to Banach space valued random vectors. Use is made of a norm on random vectors, introduced by Pisier, equal to the 2-absolutely summing norm on an associated space of operators.For Q the variance of some centred Gaussian random vector in a separable Banach space it is shown that, necessarily, Q factors through l2 as a product of 2-summing operators. This factorisation condition is sufficient when the Banach space is of Gaussian type 2. The stochastic integral of a family of operators with respect to a cylindrical Q-Wiener process is shown to exist under a Hölder continuity condition involving the 2-summing norm.A Langevin equation dZt + ΛZtdt = dBt with values in a separable Banach space is studied. The operator Λ is closed and densely defined. A weak solution (Zt ; Bt), where Zt is centred, Gaussian and stationary while Bt is a Q-Wiener process, is given when iΛ and iΛ* generate C0 groups and the resolvent of Λ is uniformly bounded on the imaginary axis. Both Zt and Bt are stochastic integrals with respect to a spectral Q-Wiener process.The convolution of two arcsine probability densities is shown to be an elliptic integral. Ensembles (Xn)n≥1 of random Hermitian matrices are considered. Each Xn is n by n with distribution invariant under unitary conjugation and induced by a positive weight function on R. New proofs are given of results, due to Boutet de Monvel, Pastur, Shcherbina and Sodin, on the behaviour of the empirical distribution of the eigenvalues of Xn as n tends to infinity.Results in analytic function theory are proved. An H∞ interpolating sequence in the disc D whose Horowitz product does not lie in the Bergman space L2a(D) is exhibited. A condition satisfied by Banach spaces of non-trivial analytic Lusin cotype is obtained.

AB - The theory of 2-convex norms is applied to Banach space valued random vectors. Use is made of a norm on random vectors, introduced by Pisier, equal to the 2-absolutely summing norm on an associated space of operators.For Q the variance of some centred Gaussian random vector in a separable Banach space it is shown that, necessarily, Q factors through l2 as a product of 2-summing operators. This factorisation condition is sufficient when the Banach space is of Gaussian type 2. The stochastic integral of a family of operators with respect to a cylindrical Q-Wiener process is shown to exist under a Hölder continuity condition involving the 2-summing norm.A Langevin equation dZt + ΛZtdt = dBt with values in a separable Banach space is studied. The operator Λ is closed and densely defined. A weak solution (Zt ; Bt), where Zt is centred, Gaussian and stationary while Bt is a Q-Wiener process, is given when iΛ and iΛ* generate C0 groups and the resolvent of Λ is uniformly bounded on the imaginary axis. Both Zt and Bt are stochastic integrals with respect to a spectral Q-Wiener process.The convolution of two arcsine probability densities is shown to be an elliptic integral. Ensembles (Xn)n≥1 of random Hermitian matrices are considered. Each Xn is n by n with distribution invariant under unitary conjugation and induced by a positive weight function on R. New proofs are given of results, due to Boutet de Monvel, Pastur, Shcherbina and Sodin, on the behaviour of the empirical distribution of the eigenvalues of Xn as n tends to infinity.Results in analytic function theory are proved. An H∞ interpolating sequence in the disc D whose Horowitz product does not lie in the Bergman space L2a(D) is exhibited. A condition satisfied by Banach spaces of non-trivial analytic Lusin cotype is obtained.

U2 - 10.17635/lancaster/thesis/286

DO - 10.17635/lancaster/thesis/286

M3 - Doctoral Thesis

PB - Lancaster University

ER -