{- |

Module : $Header$

Description : derived functions for signatures with symbol sets

Copyright : (c) Till Mossakowski, and Uni Bremen 2002-2006

License : similar to LGPL, see HetCATS/LICENSE.txt or LIZENZ.txt

Maintainer : till@informatik.uni-bremen.de

Stability : provisional

Portability : non-portable (imports Logic.Logic)

Functions from the class Logic that operate over signatures are

extended to work over signatures with symbol sets.

-}

module Logic.ExtSign where

import qualified Data.Set as Set

import Common.Result

import Common.ExtSign

import Logic.Logic

ext_sym_of :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> Set.Set symbol

ext_sym_of l = sym_of l . plainSign

ext_ide :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> morphism

ext_ide l = ide l . plainSign

ext_empty_signature :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol)

ext_empty_signature l = mkExtSign (empty_signature l)

ext_signature_union :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> (ExtSign sign symbol)

-> Result (ExtSign sign symbol)

ext_signature_union l (ExtSign s1 sy1) (ExtSign s2 sy2) = do

s <- signature_union l s1 s2

return $ ExtSign s $ Set.union sy1 sy2

ext_signature_difference :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> (ExtSign sign symbol)

-> Result (ExtSign sign symbol)

ext_signature_difference l (ExtSign s1 sy1) (ExtSign s2 sy2) = do

s <- signature_difference l s1 s2

return $ ExtSign s $ Set.difference sy1 sy2

ext_is_subsig :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> (ExtSign sign symbol) -> Bool

ext_is_subsig l (ExtSign sig1 _) (ExtSign sig2 _) =

is_subsig l sig1 sig2

ext_final_union :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> (ExtSign sign symbol)

-> Result (ExtSign sign symbol)

ext_final_union l (ExtSign s1 sy1) (ExtSign s2 sy2) = do

s <- final_union l s1 s2

return $ ExtSign s $ Set.union sy1 sy2

ext_inclusion :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> (ExtSign sign symbol) -> (ExtSign sign symbol)

-> Result morphism

ext_inclusion l (ExtSign s1 _) (ExtSign s2 _) =

inclusion l s1 s2

ext_generated_sign :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> Set.Set symbol -> (ExtSign sign symbol) -> Result morphism

ext_generated_sign l s (ExtSign sig _) =

generated_sign l s sig

ext_cogenerated_sign :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> Set.Set symbol -> (ExtSign sign symbol) -> Result morphism

ext_cogenerated_sign l s (ExtSign sig _) =

cogenerated_sign l s sig

ext_induced_from_morphism :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> EndoMap raw_symbol -> (ExtSign sign symbol)

-> Result morphism

ext_induced_from_morphism l r (ExtSign s _) =

induced_from_morphism l r s

ext_induced_from_to_morphism :: Logic lid sublogics

basic_spec sentence symb_items symb_map_items

sign morphism symbol raw_symbol proof_tree

=> lid -> EndoMap raw_symbol -> (ExtSign sign symbol)

-> (ExtSign sign symbol) -> Result morphism

ext_induced_from_to_morphism l r (ExtSign s1 _) (ExtSign s2 _) =

induced_from_to_morphism l r s1 s2