Analyticity of Parametric Elliptic Eigenvalue Problems and Applications to Quasi-Monte Carlo Methods

Abstract: In the present paper, we study the analyticity of the leftmost eigenvalue of the linear elliptic partial differential operator with random coefficient and analyze the convergence rate of the quasi-Monte Carlo method for approximation of the expectation of this quantity. The random coefficient is assumed to be represented by an affine expansion a 0 (x) + j∈N y j a j (x), where elements of the parameter vector y = (y j ) j∈N ∈ U ∞ are independent and identically uniformly distributed on< ∞ with some positive seq… Show more