## Miniconference on Linear Analysis and Function Spaces (Canberra, October 18-20,1984)Alan McIntosh, Alan J. Pryde Centre for Mathematical Analysis, Australian National University, 1985 - Function spaces - 282 pages |

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### Contents

EXPOSITORY LECTURES | 1 |

BOUNDARY VALUE PROBLEMS OF LINEAR ELASTOSTATICS | 27 |

THE MALLIAVIN CALCULUS AND LONG TIME ASYMPTOTICS | 46 |

Copyright | |

13 other sections not shown

### Common terms and phrases

2-summing absolutely p-summing operators abstract Wiener space algebra of projections anisotropic assumptions 1.1 Banach space Besov spaces Boolean algebra bounded linear operator closed compact operators completes the proof consider converges convex Corollary countable defined denotes differential dimensional estimates f e C(X finite functional calculus G Rd g-function given Hence Hilbert space Hilbert-Schmidt operator homomorphism inequality interference pattern isomorphic kernel lattice layer potential lim inf linear subspace Lipschitz domains Malliavin calculus Math Mathematics matrix measure Moran multiplier norm notation numbers obtain Opial condition particles positive constant proof of Theorem properties prove proximinal Raikov representation respect result Riesz product Riesz space satisfies scalar self-adjoint sequence slit Sobolev spaces solution stochastic subset support mapping Suppose Theorem 2.1 theory totally skew vector weak derivative weak weak Wiener space