HISTORY
OF GRAPH
The paper
written by Leonhard Euler on the Seven Bridges of Königsberg and
published in 1736 is regarded as the first paper in the history of graph theory. This
paper, as well as the one written by Vandermonde on the knight problem, carried
on with the analysis situs initiated by Leibniz. Euler's formula relating the
number of edges, vertices, and faces of a convex polyhedron was studied and
generalized by Cauchy and L'Huilier, and represents the
beginning of the branch of mathematics known as topology.
More
than one century after Euler's paper on the bridges of Königsberg and
while Listing was introducing the concept
of topology, Cayleywas led by an interest in particular
analytical forms arising from differential calculus to study a
particular class of graphs, the trees. This study had many
implications for theoretical chemistry.
The techniques he used mainly concern the enumeration of graphs with particular
properties. Enumerative graph theory then arose from the results of Cayley and
the fundamental results published by Pólya between
1935 and 1937. These were generalized by De Bruijn in 1959. Cayley linked his
results on trees with contemporary studies of chemical composition. The
fusion of ideas from mathematics with those from chemistry began what has
become part of the standard terminology of graph theory.
In
particular, the term "graph" was introduced by Sylvester in a paper published in 1878
in Nature, where he draws an analogy between
"quantic invariants" and "co-variants" of algebra and
molecular diagrams.
The first textbook on graph theory was written by Dénes Kőnig,
and published in 1936. Another book by Frank Harary,
published in 1969, was "considered the world over to be the definitive
textbook on the subject", and enabled mathematicians, chemists,
electrical engineers and social scientists to talk to each other. Harary
donated all of the royalties to fund the Pólya Prize.
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