Abstract
Tensor calculus over semirings is shown relevant to complexity theory in unexpected ways. First, evaluating well formed tensor formulas with explicit tensor entries is shown complete for /spl oplus/P, for NP, and for #P as the semiring varies. Indeed the permanent of a matrix is shown expressible as the value of a tensor formula in much the same way that Berkowitz' theorem expresses its determinant. Second, restricted tensor formulas are shown to capture the classes LOGCFL and NL, their parity counterparts /spl oplus/LOGCFL and /spl oplus/L, and several other counting classes. Finally, the known inclusions NP/poly /spl sube//spl oplus/P/poly, LOGCFL/poly /spl sube//spl oplus/LOGCFL/poly, and NL/poly/spl sube//spl oplus//poly, which have scattered proofs in the literature, are shown to follow from the new characterizations in a single blow.
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