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[2] viXra:2207.0115 [pdf] replaced on 2022-10-22 19:25:22
Authors: Thomas Halley
Comments: 13 Pages.
Let k( i^ ) not equal to m. We define an arrow. We show that D = 0. Thompson’s computation of ideals was a milestone in parabolic knot theory. In contrast to [2], a useful suggestion of the subject can be found following Conjecture 6.2 concluding this paper. Does the Goldbach Conjecture form a knot with no openings on the given sensitive even numbers? They do partially and differentially on the extrema and local bound of -2. The circle must be cut at radius 2 when a+b=2r. The resultant has been formally found in [1] and is further described in this paper.
Category: Topology
[1] viXra:2207.0068 [pdf] submitted on 2022-07-09 02:47:49
Authors: Sing Kuang Tan
Comments: 9 Pages.
In this paper, we developed a set of linear constraints to test whether 4 points form a square. Traditionally people use Euclidean distance to test whether the 4 points form a square. It forms a square if the four sides are of equal length and the diagonals are of equal length. My test function using a set of linear constraints is much simpler without the use of quadratic operations in Euclidean distance test function. This is needed in the future to prove Square Peg Problem for any arbitary closed curve.
Category: Topology
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