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Abstract
Suppose that m ≥ 2 is a positive integer. The upper and lower bounds on the best possible constant λ
m, n
are provided for which the inequality holds for any polynomials f
1, …, f
m
∈ℂ[z] of degree at most n each. In particular, for n>2m
2 and m→∞, it is proved that 2−π2/(12 m
2)+o(m
−2)≤λ
m, n
≤2−π/(2e m
2)+o(m
−2). For m=5 and n ≥ 43, our result yields the bounds 1.967<λ5, n
<1.977.
Acknowledgements
This research was supported in part by the Lithuanian State Studies and Science Foundation and by INTAS grant no. 03-51-5070.