Arjun Suresh (talk | contribs) (→For arbitrary DCFGs G, G1 and G2 and an arbitrary regular set R) |
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+ | Checking if L(CFG) is finite is decidable because we just need to see if L(CFG) contains any string with length between n and 2n-1 where n is the pumping lemma constant. If so, L(CFG) is infinite otherwise its finite. | ||
==Other Undecidable Problems == | ==Other Undecidable Problems == |
Grammar | <math>w \in L(G)</math> | <math>L(G) = \phi</math> | <math>L(G) = \Sigma^*</math> | <math>L(G_1) \subseteq L(G_2)</math> | <math>L(G_1) = L(G_2)</math> | <math>L(G_1) \cap L(G_2) = \phi</math> | <math>L(G)</math> is finite |
---|---|---|---|---|---|---|---|
Regular Grammar | D | D | D | D | D | D | D |
Det. Context Free | D | D | D | UD | ? | UD | D |
Context Free | D | D | UD | UD | UD | UD | D |
Context Sensitive | D | UD | UD | UD | UD | UD | UD |
Recursive | D | UD | UD | UD | UD | UD | UD |
Recursively Enumerable | D | UD | UD | UD | UD | UD | UD |
Checking if L(CFG) is finite is decidable because we just need to see if L(CFG) contains any string with length between n and 2n-1 where n is the pumping lemma constant. If so, L(CFG) is infinite otherwise its finite.
The following problems are undecidable:
But whether <math>R \subseteq L(G)</math> is decidable
The following problems are decidable:
Grammar | <math>w \in L(G)</math> | <math>L(G) = \phi</math> | <math>L(G) = \Sigma^*</math> | <math>L(G_1) \subseteq L(G_2)</math> | <math>L(G_1) = L(G_2)</math> | <math>L(G_1) \cap L(G_2) = \phi</math> | <math>L(G)</math> is finite |
---|---|---|---|---|---|---|---|
Regular Grammar | D | D | D | D | D | D | D |
Det. Context Free | D | D | D | UD | ? | UD | D |
Context Free | D | D | UD | UD | UD | UD | D |
Context Sensitive | D | UD | UD | UD | UD | UD | UD |
Recursive | D | UD | UD | UD | UD | UD | UD |
Recursively Enumerable | D | UD | UD | UD | UD | UD | UD |
The following problems are undecidable:
But whether <math>R \subseteq L(G)</math> is decidable
The following problems are decidable: