摘要
Let B^H'K={B^H'K(t), t∈R+^N} be an (N,d)-bifractional Brownian sheet with Hurst indices H = (H1,…,HN) C∈0,1)^N and K = (K1,…,KN) ∈ (0,1]^N. The properties of the polar sets of B^H'K are discussed. The sufficient conditions and necessary conditions for a compact set to be polar for B^H'K are proved. The infimum of Hausdorff dimensions of its non-polar sets are obtained by means of constructing a Cantor-type set to connect its Hausdorff dimension and capacity.
Let B^H'K={B^H'K(t), t∈R+^N} be an (N,d)-bifractional Brownian sheet with Hurst indices H = (H1,…,HN) C∈0,1)^N and K = (K1,…,KN) ∈ (0,1]^N. The properties of the polar sets of B^H'K are discussed. The sufficient conditions and necessary conditions for a compact set to be polar for B^H'K are proved. The infimum of Hausdorff dimensions of its non-polar sets are obtained by means of constructing a Cantor-type set to connect its Hausdorff dimension and capacity.
基金
supported by the national natural foundationof China (70871104)
the key research base for humanities and social sciences of Zhejiang Provincial high education talents (Statistics of Zhejiang Gongshang University)
