MetiTarski
をテンプレートにして作成
[
トップ
] [
新規
|
一覧
|
検索
|
最終更新
|
ヘルプ
]
開始行:
*MetiTarski 2.3 [#t2e2cb58]
MetiTarski is an automatic theorem prover based on a combination of resolution and a decision procedure for the theory of real closed fields. It is designed to prove theorems involving real-valued special functions such as log, exp, sin, cos and sqrt. In particular, it is designed to prove universally quantified inequalities involving such functions. This problem is undecidable, so MetiTarski is necessarily incomplete. Nevertheless, MetiTarski is remarkably powerful.
不等式評価を公理に加えることにより初等超越関数まで扱うプルーバーです.
*インストール例 [#vca880ef]
- http://d.hatena.ne.jp/ehito/20130807/1375832972
*使用例 [#ec0d08f4]
echo "fof(test,conjecture,! [X]:(0<=X => 1+sin(X)<=exp(X)))." | metit --autoInclude -
*リンク [#j5d9cbf2]
- http://www.cl.cam.ac.uk/~lp15/papers/Arith/
- http://www.cl.cam.ac.uk/~lp15/papers/Arith/ITP%202012%20presentation.pdf
- http://www.cl.cam.ac.uk/~lp15/papers/Arith/MetiTarski-jar.pdf
終了行:
*MetiTarski 2.3 [#t2e2cb58]
MetiTarski is an automatic theorem prover based on a combination of resolution and a decision procedure for the theory of real closed fields. It is designed to prove theorems involving real-valued special functions such as log, exp, sin, cos and sqrt. In particular, it is designed to prove universally quantified inequalities involving such functions. This problem is undecidable, so MetiTarski is necessarily incomplete. Nevertheless, MetiTarski is remarkably powerful.
不等式評価を公理に加えることにより初等超越関数まで扱うプルーバーです.
*インストール例 [#vca880ef]
- http://d.hatena.ne.jp/ehito/20130807/1375832972
*使用例 [#ec0d08f4]
echo "fof(test,conjecture,! [X]:(0<=X => 1+sin(X)<=exp(X)))." | metit --autoInclude -
*リンク [#j5d9cbf2]
- http://www.cl.cam.ac.uk/~lp15/papers/Arith/
- http://www.cl.cam.ac.uk/~lp15/papers/Arith/ITP%202012%20presentation.pdf
- http://www.cl.cam.ac.uk/~lp15/papers/Arith/MetiTarski-jar.pdf
ページ名: