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The signed random-to-top operator on tensor space (draft)
Given a free module L over a commutative ring k, we study two k-linear
operators on the tensor algebra of T(L): One of them sends a pure tensor u_1
(X) u_2 (X) ... (X) u_k to the sum of all tensors u_i (X) u_1 (X) u_2 (X) ...
(X) (skip u_i) (X) ... (X) u_k. The other is similar, but the sum is replaced
by an alternating sum. These operators can be regarded as algebraic analogues
of the "random-to-top shuffle" from combinatorics. We describe the kernel of
the second operator (which we call boldface-t); it is a certain easily
described Lie subsuperalgebra of T(L). We also describe the kernel of the first
operator (which is denoted boldface-t') when the additive group k is
torsionfree (the description is analogous to that of the kernel of t) and also
when k is an algebra over a finite field (in this case, the description is
slightly complicated by the presence of p-th powers).Comment: 45 pages. Context added, errors corrected. Still a draft. Comments
are greatly welcome