Title :
On Typability for Rank-2 Intersection Types with Polymorphic Recursion
Author :
Terauchi, Tachio ; Aiken, Alex
Author_Institution :
EECS Dept., California Univ., Berkeley, CA
Abstract :
We show that typability for a natural form of polymorphic recursive typing for rank-2 intersection types is undecidable. Our proof involves characterizing typability as a context free language (CFL) graph problem, which may be of independent interest, and reduction from the boundedness problem for Turing machines. We also show a property of the type system which, in conjunction with the undecidability result, disproves a misconception about the Milner-Mycroft type system. We also show undecidability of a related program analysis problem
Keywords :
Turing machines; context-free languages; decidability; graph theory; program diagnostics; type theory; CFL graph problem; Turing machines; context free language; polymorphic recursive typing; program analysis problem; rank-2 intersection types; type system; undecidability; Computer languages; Computer science; Government; Logic; Turing machines; Writing;
Conference_Titel :
Logic in Computer Science, 2006 21st Annual IEEE Symposium on
Conference_Location :
Seattle, WA
Print_ISBN :
0-7695-2631-4
DOI :
10.1109/LICS.2006.41
