I'm wondering if there is any way or any special set of ideals such that there is an efficient way to compute elements of degree at most $d$ in a Gröbner basis for that ideal.
If you have any paper or hint I appreciate it.
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1$\begingroup$ This may be the opposite of what you are looking for but have you checked out some of the worst case behavior: algo.inria.fr/seminars/summary/Bardet2002.pdf $\endgroup$– Neil HoffmanCommented Feb 12, 2019 at 3:59
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1 Answer
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For fixed $d$, you can do it in polynomial time. More precisely, Proposition 24.1 of Algorithmes efficaces en calcul formel by Bostan, Chyzak, Giusti, Lebreton, Lecerf, Salvy, Schost available here says
Given homogeneous polynomials $f_1,\dots,f_s$ in $k[X_0,\dots,X_n]$ and an integer $d$, there is an algorithm that computes the elements of degree at most $d$ of a Groebner basis of $I = (f_1,\dots,f_s)$ in time $$O\left(sd\binom{n+d}{d}^\omega\right)$$ where $2\le \omega \le 3$ is a matrix multiplication exponent.
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1$\begingroup$ Sorry for the French reference. I'm sure there exists a reference in English, but I don't know one on top of my head. $\endgroup$– AurelCommented Sep 9, 2020 at 8:23