TL;DR
This paper demonstrates that Howe's big quotient can be derived through tensoring over a suitable algebra, providing a new perspective on its construction.
Contribution
It introduces a novel approach to obtaining Howe's big quotient using tensoring over an algebra, enhancing understanding of its algebraic structure.
Findings
Big quotient obtained via tensoring over algebra
Provides a new algebraic perspective on Howe's construction
Simplifies understanding of the quotient's properties
Abstract
We show that Howe's big quotient is obtained via the tensoring over appropriate algebra.
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Taxonomy
TopicsRings, Modules, and Algebras · Advanced Topology and Set Theory · Algebraic Geometry and Number Theory