Decision procedures for subsets of First-Order Logic form the core of many verification tools. Applications include hardware and software verification. The logic of Equality with Uninterpreted Functions (EUF) is a decidable subset of First-Order Logic. The EUF logic and its extensions have been applied for proving equivalence between systems. We present a branch and bound decision procedure for EUF logic based on the generalisation of the Davis-Putnam-Loveland-Logemann procedure (EUF-DPLL). EufDpll is a tool to check satisfiability of EUF formulas based on this procedure
Equality Logic with uninterpreted functions is used for proving the equivalense or refinement betwee...
Modern processors have relatively simple specificationsbased on their instruction set architectures....
Abstract. Equality logic with or without uninterpreted functions is used for proving the equivalence...
Decision procedures for subsets of First-Order Logic form the core of many verification tools. Appli...
AbstractDecision procedures for subsets of First-Order Logic form the core of many verification tool...
Abstract. The equality logic with uninterpreted functions (EUF) has been proposed for processor veri...
The equality logic with uninterpreted functions (EUF) has been proposed for processor verification. ...
The equality logic with uninterpreted functions (EUF) has been proposed for processor verification. ...
The logic of equality with uninterpreted functions (EUF) has been proposed for processor verificatio...
The logic of equality with uninterpreted functions (EUF) provides a means of abstracting the ma-nipu...
The logic of equality with uninterpreted functions (EUF) provides a means of abstracting the manipul...
The logic of equality and uninterpreted functions (EUF) has been proposed for processor verification...
textabstractThe logic of equality and uninterpreted functions (EUF) has been proposed for processor ...
The logic of Equality with Uninterpreted Functions (EUF) provides a means of abstracting the manipul...
AbstractThe logic of Equalities with Uninterpreted Functions is used in the formal verification comm...
Equality Logic with uninterpreted functions is used for proving the equivalense or refinement betwee...
Modern processors have relatively simple specificationsbased on their instruction set architectures....
Abstract. Equality logic with or without uninterpreted functions is used for proving the equivalence...
Decision procedures for subsets of First-Order Logic form the core of many verification tools. Appli...
AbstractDecision procedures for subsets of First-Order Logic form the core of many verification tool...
Abstract. The equality logic with uninterpreted functions (EUF) has been proposed for processor veri...
The equality logic with uninterpreted functions (EUF) has been proposed for processor verification. ...
The equality logic with uninterpreted functions (EUF) has been proposed for processor verification. ...
The logic of equality with uninterpreted functions (EUF) has been proposed for processor verificatio...
The logic of equality with uninterpreted functions (EUF) provides a means of abstracting the ma-nipu...
The logic of equality with uninterpreted functions (EUF) provides a means of abstracting the manipul...
The logic of equality and uninterpreted functions (EUF) has been proposed for processor verification...
textabstractThe logic of equality and uninterpreted functions (EUF) has been proposed for processor ...
The logic of Equality with Uninterpreted Functions (EUF) provides a means of abstracting the manipul...
AbstractThe logic of Equalities with Uninterpreted Functions is used in the formal verification comm...
Equality Logic with uninterpreted functions is used for proving the equivalense or refinement betwee...
Modern processors have relatively simple specificationsbased on their instruction set architectures....
Abstract. Equality logic with or without uninterpreted functions is used for proving the equivalence...