Abstract
Given a polynomial fpx1; : : : ; xNq, we can wonder how we can evaluate it with a minimal number of arithmetic operations. Indeed, the task of the algorithm designer is to nd evolved processes which decrease this number. In the other direction, it could be interesting to be able to prove that there is no algorithm which does the computation in less than some number of operations. But how one could prove something like that? We will present here some methods which allow us to tackle the problem in the case of constant-depth algebraic circuits.
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