(* Title: HOL/SPARK/Examples/RIPEMD-160/F.thy
Author: Fabian Immler, TU Muenchen
Verification of the RIPEMD-160 hash function
*)
theory F
imports RMD_Specification
begin
spark_open "rmd/f.siv"
spark_vc function_f_2
using assms by simp_all
spark_vc function_f_3
using assms by simp_all
spark_vc function_f_4
using assms by simp_all
spark_vc function_f_5
using assms by simp_all
spark_vc function_f_6
proof -
from H8 have "nat j <= 15" by simp
with assms show ?thesis
by (simp add: f_def bwsimps int_word_uint int_mod_eq')
qed
spark_vc function_f_7
proof -
from H7 have "16 <= nat j" by simp
moreover from H8 have "nat j <= 31" by simp
ultimately show ?thesis using assms
by (simp add: f_def bwsimps int_word_uint int_mod_eq')
qed
spark_vc function_f_8
proof -
from H7 have "32 <= nat j" by simp
moreover from H8 have "nat j <= 47" by simp
ultimately show ?thesis using assms
by (simp add: f_def bwsimps int_word_uint int_mod_eq')
qed
spark_vc function_f_9
proof -
from H7 have "48 <= nat j" by simp
moreover from H8 have "nat j <= 63" by simp
ultimately show ?thesis using assms
by (simp add: f_def bwsimps int_word_uint int_mod_eq')
qed
spark_vc function_f_10
proof -
from H2 have "nat j <= 79" by simp
moreover from H12 have "64 <= nat j" by simp
ultimately show ?thesis using assms
by (simp add: f_def bwsimps int_word_uint int_mod_eq')
qed
spark_end
end