“Rapidly going over what I could recall of Jim Bursley's information about pathological curves confirmed the conjecture. The snowball curve, derived from an equilateral triangle, is a perimeter of infinite length enclosing a finite area. The angles or points of the perimeter are uncountable. An equilateral triangle projected integrally in the third dimension is a triangular pyramid of equal surfaces. The three-dimensional snowflake derived from this pyramid--hence its diamantine appearance--is a finite volume enclosed in a surface of infinite area. The convolutions of such a surface, to be gathered around its defined content extrude a number of discrete angles or points beyond all possibility of computation. The pressure on each point is infinitesimal, unmeasurably small; the total external pressure exerted on any part of the surface is an aggregate of infinitesimal values, itself infinitesimal.”
Source: The Curve of the Snowflake (1956), p. 126.
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William Grey Walter12
American-born British neuroscientist and roboticist 1910–1977Related quotes
Howard P. Robertson (1903–1961) American mathematician and physicist
Geometry as a Branch of Physics (1949)
Thales (-624–-547 BC) ancient Greek philosopher and mathematician
W. W. Rouse Ball, A Short Account of the History of Mathematics (1893, 1925)
Thomas Little Heath (1861–1940) British civil servant and academic
this implies the use of similar triangles in the way that the Egyptians had used them in the construction of pyramids
Achimedes (1920)
Steven M. Greer (1955) American ufologist
Greer describing a close encounter he had with a UFO.
Undated
Source: [Hawley, David, Reach Out And Touch ... An Extraterrestrial, St. Paul Pioneer Press, May 8, 1993, http://nl.newsbank.com/nl-search/we/Archives?p_product=PD&s_site=twincities&p_multi=SP&p_theme=realcities&p_action=search&p_maxdocs=200&p_topdoc=1&p_text_direct-0=0EB5DCD1EE3CE7FE&p_field_direct-0=document_id&p_perpage=10&p_sort=YMD_date:D&s_trackval=GooglePM, 2007-05-13, http://nbgoku23.googlepages.com/REACHOUTANDTOUCH...ANEXTRATERRESTRIA.htm, 2007-05-13]
Immanuel Kant (1724–1804) German philosopher
Kant's Inaugural Dissertation (1770), Section III On The Principles Of The Form Of The Sensible World
Hans Reichenbach (1891–1953) American philosopher
The sphere as a whole has a character different from that of a plane. A spherical surface made from rubber, such as a balloon, can be twisted so that its geometry changes. ...but it cannot be distorted in such a way as that it will cover a plane. All surfaces obtained by distortion of the rubber sphere possess the same holistic properties; they are closed and finite. The plane as a whole has the property of being open; its straight lines are not closed. This feature is mathematically expressed as follows. Every surface can be mapped upon another one by the coordination of each point of one surface to a point of the other surface, as illustrated by the projection of a shadow picture by light rays. For surfaces with the same holistic properties it is possible to carry through this transformation uniquely and continuously in all points. Uniquely means: one and only one point of one surface corresponds to a given point of the other surface, and vice versa. Continuously means: neighborhood relations in infinitesimal domains are preserved; no tearing of the surface or shifting of relative positions of points occur at any place. For surfaces with different holistic properties, such a transformation can be carried through locally, but there is no single transformation for the whole surface.
The Philosophy of Space and Time (1928, tr. 1957)
“As the area of light expands, so does the perimeter of darkness.”
Albert Einstein (1879–1955) German-born physicist and founder of the theory of relativity
Variant: As our circle of knowledge expands, so does the circumference of darkness surrounding it.