Title of article
On the finiteness of the recursive chromatic number Original Research Article
Author/Authors
William I. Gasarch، نويسنده , , Andrew C.Y. Lee، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1998
Pages
9
From page
73
To page
81
Abstract
A recursive graph is a graph whose vertex and edge sets are recursive. A highly recursive graph is a recursive graph that also has the following property: one can recursively determine the neighbors of a vertex. Both of these have been studied in the literature. We consider an intermediary notion: Let A be a set. An A-recursive graph is a recursive graph that also has the following property: one can recursively-in-A determine the neighbors of a vertex. We show that, if A is r.e. and not recursive, then there exists A-recursive graphs that are 2-colorable but not recursively k-colorable for any k. This is false for highly-recursive graphs but true for recursive graphs. Hence A-recursive graphs are closer in spirit to recursive graphs than to highly recursive graphs.
Keywords
Recursive graph , Recursive coloring , Highly recursive graph
Journal title
Annals of Pure and Applied Logic
Serial Year
1998
Journal title
Annals of Pure and Applied Logic
Record number
896133
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