Abstract
GEOMETERS are wont to speak (it seems to me) somewhat laxly of “the line at infinity” as if there were only one such line in a plane; in a certain but not in the most obvious sense this is true—viz. there is but one right line of which all the points are at an infinite distance from all lines external to them in the finite region of the plane, and except these points there are none others having this property; but in the sense that there is but one line infinitely distant from all points external to it in the finite region, the statement is obviously erroneous, for it need only to be mentioned to be at once perceived to be true by any tyro in geometry that all rays passing through either of the two “circular points at infinity”(Cayley's absolute) are infinitely distant from any external point in the finite region; these two imaginary points may indeed without any reference to the circle be defined as the points which radiate out in all directions rays infinitely distant from the finite region; the “absolute” being, so to say, the common depository, i.e. the crossing points of all infinitely distant rays as the “line at infinity”is the locus of all infinitely distant points. Similarly in space: there is not one infinitely distant plane, “the plane at infinity,” but an infinitely infinite number of such planes—viz. any plane touching “the circle at infinity”(an imaginary circle in the plane at infinity) will at once be recognised to be infinitely distant from any external point in the finite region, or, as we may say more briefly and picturesquely, infinitely distant from the finite region itself. It will give greater vivacity to this conception to imagine an axis through which pass planes in all directions, and to travel in idea this axis round “the circle at infinity” keeping it always tangential thereto; the complex or corolla of planes, so to say, thus formed (infinitely infinite in number) contains only planes of infinite distance from the finite region; and “the plane at infinity” is but one of them—viz. the one which passes through all the axes named, just as the line at infinity in a plane is the line which passes through both the centres of infinite distance. The infinitely infinite series of infinitely distant planes is of course the correlative of the infinitely infinite series of infinitely distant points whose locus is the so-called “plane at infinity.”
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SYLVESTER, J. A New Example of the Use of the Infinite and Imaginary in the Service of the Finite and Real . Nature 32, 103–105 (1885). https://doi.org/10.1038/032103c0
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DOI: https://doi.org/10.1038/032103c0