I have some known circles with r=1 (figure below, 4 circles are called C1 to C4). I want to find the nearest point to (0,0) not within the circles. is there any polynomial algorithm for this?
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This is not a perfectly readytouse answer, but only a draft for you to follow (Please let us know what you have tried next time).



The desired point is on the boundary of the union of all circles centered at the origin and maximally inscribed wihin some input circle Cn. Algorithm: For each input circle C_i with radius r_i centered at O_i (where O_i is d_i away from the origin, Oi_1^2 + Oi_2^2 = d_i^2), compute the inscribed radii u_i = r_i  d_i, and find their max. Some point u_max away from the origin is the solution To find the actual point, suppose u_i = u_max for some i. Then the point you want is  O_i * u_i / d_i. If d_i = 0, then any point r_i away from the origin works. 


The closest point to origin will be one of the following:
Check all those points, and find the closest amongst them with condition that this point does not lie inside some circle. It will give you complexity O(n^3). 


you may find for each point within the circles the lenght from point (0,0) and then find a minimum which neighbourhood is not within the circles. 

