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GG
2008
Springer
2008
Springer
Resolution-Like Theorem Proving for High-Level Conditions
The tautology problem is the problem to prove the validity of statements. In this paper, we present a calculus for this undecidable problem on graphical conditions, prove its soundness, investigate the necessity of each deduction rule, and discuss practical aspects concerning an implementation. As we use the framework of weak adhesive HLR categories, the calculus is applicable to a number of replacement capable structures, such as Petri-Nets, graphs or hypergraphs. Key words: first-order tautology problem, high-level conditions, theorem proving, resolution, weak adhesive HLR categories
Real-time TrafficAdhesive Hlr Categories | GG 2008 | Tautology Problem | Theoretical Computer Science | Weak Adhesive Hlr |
| Added | 09 Nov 2010 |
| Updated | 09 Nov 2010 |
| Type | Conference |
| Year | 2008 |
| Where | GG |
| Authors | Karl-Heinz Pennemann |
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