Rudin's Submodules of H2(D2)
Abstract
Let \αn\n≥ 0 be a sequence of scalars in the open unit disc of C, and let \ln\n≥ 0 be a sequence of natural numbers satisfying Σn=0∞ (1 - ln|αn|) <∞. Then the joint (Mz1, Mz2) invariant subspace \[S = n=0∞ ( z1n Πk=n∞ (-αk|αk| z2 - αk1 - αk z2)lk H2(D2)),\] is called a Rudin submodule. In this paper we analyze the class of Rudin submodules and prove that \[ dim (S (z1 S+ z2S))= 1+\#\n 0: αn=0\<∞. \]In particular, this answer a question earlier raised by Douglas and Yang (2000).
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