In this paper, we show that if C is a module with finite Goldie dimension, and A + C≌B + C, then there are essential submodules A'△ A, B'△ B such that A'≌ B'.
In the present paper, the author shows that if a homogeneous submodule M of the Bergman module L_a^2(B_d) satisfies P_M-sum from i to ( M_(zi)P_MM*_(zi))≤c/(N + 1)P_M for some number c > 0, then there is a sequenc...In the present paper, the author shows that if a homogeneous submodule M of the Bergman module L_a^2(B_d) satisfies P_M-sum from i to ( M_(zi)P_MM*_(zi))≤c/(N + 1)P_M for some number c > 0, then there is a sequence {f_j } of multipliers and a positive number c such that c'P_M ≤sum from j to ( M_(fj)M*_(fj))≤ P_M, i.e., M is approximately representable. The author also proves that approximately representable homogeneous submodules are p-essentially normal for p > d.展开更多
文摘In this paper, we show that if C is a module with finite Goldie dimension, and A + C≌B + C, then there are essential submodules A'△ A, B'△ B such that A'≌ B'.
基金supported by the National Natural Science Foundation of China(Nos.11271075,11371096)Shandong Province Natural Science Foundation(No.ZR2014AQ009)the Fundamental Research Funds of Shandong University(No.2015GN017)
文摘In the present paper, the author shows that if a homogeneous submodule M of the Bergman module L_a^2(B_d) satisfies P_M-sum from i to ( M_(zi)P_MM*_(zi))≤c/(N + 1)P_M for some number c > 0, then there is a sequence {f_j } of multipliers and a positive number c such that c'P_M ≤sum from j to ( M_(fj)M*_(fj))≤ P_M, i.e., M is approximately representable. The author also proves that approximately representable homogeneous submodules are p-essentially normal for p > d.
