Structure numeral_bitTheory


Source File Identifier index Theory binding index

signature numeral_bitTheory =
sig
  type thm = Thm.thm
  
  (*  Definitions  *)
    val BIT_MODF_def : thm
    val BIT_REV_def : thm
    val FDUB_def : thm
    val SFUNPOW_def : thm
    val iBITWISE_def : thm
    val iDIV2 : thm
    val iLOG2_def : thm
    val iMOD_2EXP : thm
    val iSUC : thm
  
  (*  Theorems  *)
    val BIT_MODIFY_EVAL : thm
    val BIT_REVERSE_EVAL : thm
    val DIV_2EXP : thm
    val FDUB_FDUB : thm
    val FDUB_iDIV2 : thm
    val FDUB_iDUB : thm
    val LOG_compute : thm
    val LOWEST_SET_BIT : thm
    val LOWEST_SET_BIT_compute : thm
    val MOD_2EXP : thm
    val MOD_2EXP_EQ : thm
    val MOD_2EXP_MAX : thm
    val NUMERAL_BITWISE : thm
    val NUMERAL_BIT_MODF : thm
    val NUMERAL_BIT_MODIFY : thm
    val NUMERAL_BIT_REV : thm
    val NUMERAL_BIT_REVERSE : thm
    val NUMERAL_DIV_2EXP : thm
    val NUMERAL_SFUNPOW_FDUB : thm
    val NUMERAL_SFUNPOW_iDIV2 : thm
    val NUMERAL_SFUNPOW_iDUB : thm
    val NUMERAL_TIMES_2EXP : thm
    val NUMERAL_iDIV2 : thm
    val iBITWISE : thm
    val iDUB_NUMERAL : thm
    val numeral_ilog2 : thm
    val numeral_imod_2exp : thm
    val numeral_log2 : thm
    val numeral_mod2 : thm
  
  val numeral_bit_grammars : type_grammar.grammar * term_grammar.grammar
(*
   [bit] Parent theory of "numeral_bit"
   
   [BIT_MODF_def]  Definition
      
      ⊢ (∀f x b e y. BIT_MODF 0 f x b e y = y) ∧
        ∀n f x b e y.
            BIT_MODF (SUC n) f x b e y =
            BIT_MODF n f (x DIV 2) (b + 1) (2 * e)
              (if f b (ODD x) then e + y else y)
   
   [BIT_REV_def]  Definition
      
      ⊢ (∀x y. BIT_REV 0 x y = y) ∧
        ∀n x y.
            BIT_REV (SUC n) x y =
            BIT_REV n (x DIV 2) (2 * y + SBIT (ODD x) 0)
   
   [FDUB_def]  Definition
      
      ⊢ (∀f. FDUB f 0 = 0) ∧ ∀f n. FDUB f (SUC n) = f (f (SUC n))
   
   [SFUNPOW_def]  Definition
      
      ⊢ (∀f x. SFUNPOW f 0 x = x) ∧
        ∀f n x.
            SFUNPOW f (SUC n) x = if x = 0 then 0 else SFUNPOW f n (f x)
   
   [iBITWISE_def]  Definition
      
      ⊢ numeral_bit$iBITWISE = BITWISE
   
   [iDIV2]  Definition
      
      ⊢ numeral_bit$iDIV2 = DIV2
   
   [iLOG2_def]  Definition
      
      ⊢ ∀n. numeral_bit$iLOG2 n = LOG2 (n + 1)
   
   [iMOD_2EXP]  Definition
      
      ⊢ numeral_bit$iMOD_2EXP = MOD_2EXP
   
   [iSUC]  Definition
      
      ⊢ numeral_bit$iSUC = SUC
   
   [BIT_MODIFY_EVAL]  Theorem
      
      ⊢ ∀m f n. BIT_MODIFY m f n = BIT_MODF m f n 0 1 0
   
   [BIT_REVERSE_EVAL]  Theorem
      
      ⊢ ∀m n. BIT_REVERSE m n = BIT_REV m n 0
   
   [DIV_2EXP]  Theorem
      
      ⊢ ∀n x. DIV_2EXP n x = FUNPOW DIV2 n x
   
   [FDUB_FDUB]  Theorem
      
      ⊢ (FDUB (FDUB f) ZERO = ZERO) ∧
        (∀x.
             FDUB (FDUB f) (numeral_bit$iSUC x) =
             FDUB f (FDUB f (numeral_bit$iSUC x))) ∧
        (∀x. FDUB (FDUB f) (BIT1 x) = FDUB f (FDUB f (BIT1 x))) ∧
        ∀x. FDUB (FDUB f) (BIT2 x) = FDUB f (FDUB f (BIT2 x))
   
   [FDUB_iDIV2]  Theorem
      
      ⊢ ∀x.
            FDUB numeral_bit$iDIV2 x =
            numeral_bit$iDIV2 (numeral_bit$iDIV2 x)
   
   [FDUB_iDUB]  Theorem
      
      ⊢ ∀x. FDUB numeral$iDUB x = numeral$iDUB (numeral$iDUB x)
   
   [LOG_compute]  Theorem
      
      ⊢ ∀m n.
            LOG m n =
            if m < 2 ∨ (n = 0) then FAIL LOG base < 2 or n = 0 m n
            else if n < m then 0
            else SUC (LOG m (n DIV m))
   
   [LOWEST_SET_BIT]  Theorem
      
      ⊢ ∀n.
            n ≠ 0 ⇒
            (LOWEST_SET_BIT n =
             if ODD n then 0
             else 1 + LOWEST_SET_BIT (DIV2 n))
   
   [LOWEST_SET_BIT_compute]  Theorem
      
      ⊢ (∀n.
             LOWEST_SET_BIT (NUMERAL (BIT2 n)) =
             SUC (LOWEST_SET_BIT (NUMERAL (SUC n)))) ∧
        ∀n. LOWEST_SET_BIT (NUMERAL (BIT1 n)) = 0
   
   [MOD_2EXP]  Theorem
      
      ⊢ (∀x. MOD_2EXP x 0 = 0) ∧
        ∀x n. MOD_2EXP x (NUMERAL n) = NUMERAL (numeral_bit$iMOD_2EXP x n)
   
   [MOD_2EXP_EQ]  Theorem
      
      ⊢ (∀a b. MOD_2EXP_EQ 0 a b ⇔ T) ∧
        (∀n a b.
             MOD_2EXP_EQ (SUC n) a b ⇔
             (ODD a ⇔ ODD b) ∧ MOD_2EXP_EQ n (DIV2 a) (DIV2 b)) ∧
        ∀n a. MOD_2EXP_EQ n a a ⇔ T
   
   [MOD_2EXP_MAX]  Theorem
      
      ⊢ (∀a. MOD_2EXP_MAX 0 a ⇔ T) ∧
        ∀n a. MOD_2EXP_MAX (SUC n) a ⇔ ODD a ∧ MOD_2EXP_MAX n (DIV2 a)
   
   [NUMERAL_BITWISE]  Theorem
      
      ⊢ (∀x f a. BITWISE x f 0 0 = NUMERAL (numeral_bit$iBITWISE x f 0 0)) ∧
        (∀x f a.
             BITWISE x f (NUMERAL a) 0 =
             NUMERAL (numeral_bit$iBITWISE x f (NUMERAL a) 0)) ∧
        (∀x f b.
             BITWISE x f 0 (NUMERAL b) =
             NUMERAL (numeral_bit$iBITWISE x f 0 (NUMERAL b))) ∧
        ∀x f a b.
            BITWISE x f (NUMERAL a) (NUMERAL b) =
            NUMERAL (numeral_bit$iBITWISE x f (NUMERAL a) (NUMERAL b))
   
   [NUMERAL_BIT_MODF]  Theorem
      
      ⊢ (∀f x b e y. BIT_MODF 0 f x b e y = y) ∧
        (∀n f b e y.
             BIT_MODF (NUMERAL (BIT1 n)) f 0 b (NUMERAL e) y =
             BIT_MODF (NUMERAL (BIT1 n) − 1) f 0 (b + 1)
               (NUMERAL (numeral$iDUB e))
               (if f b F then NUMERAL e + y else y)) ∧
        (∀n f b e y.
             BIT_MODF (NUMERAL (BIT2 n)) f 0 b (NUMERAL e) y =
             BIT_MODF (NUMERAL (BIT1 n)) f 0 (b + 1)
               (NUMERAL (numeral$iDUB e))
               (if f b F then NUMERAL e + y else y)) ∧
        (∀n f x b e y.
             BIT_MODF (NUMERAL (BIT1 n)) f (NUMERAL x) b (NUMERAL e) y =
             BIT_MODF (NUMERAL (BIT1 n) − 1) f (DIV2 (NUMERAL x)) (b + 1)
               (NUMERAL (numeral$iDUB e))
               (if f b (ODD x) then NUMERAL e + y else y)) ∧
        ∀n f x b e y.
            BIT_MODF (NUMERAL (BIT2 n)) f (NUMERAL x) b (NUMERAL e) y =
            BIT_MODF (NUMERAL (BIT1 n)) f (DIV2 (NUMERAL x)) (b + 1)
              (NUMERAL (numeral$iDUB e))
              (if f b (ODD x) then NUMERAL e + y else y)
   
   [NUMERAL_BIT_MODIFY]  Theorem
      
      ⊢ (∀m f. BIT_MODIFY (NUMERAL m) f 0 = BIT_MODF (NUMERAL m) f 0 0 1 0) ∧
        ∀m f n.
            BIT_MODIFY (NUMERAL m) f (NUMERAL n) =
            BIT_MODF (NUMERAL m) f (NUMERAL n) 0 1 0
   
   [NUMERAL_BIT_REV]  Theorem
      
      ⊢ (∀x y. BIT_REV 0 x y = y) ∧
        (∀n y.
             BIT_REV (NUMERAL (BIT1 n)) 0 y =
             BIT_REV (NUMERAL (BIT1 n) − 1) 0 (numeral$iDUB y)) ∧
        (∀n y.
             BIT_REV (NUMERAL (BIT2 n)) 0 y =
             BIT_REV (NUMERAL (BIT1 n)) 0 (numeral$iDUB y)) ∧
        (∀n x y.
             BIT_REV (NUMERAL (BIT1 n)) (NUMERAL x) y =
             BIT_REV (NUMERAL (BIT1 n) − 1) (DIV2 (NUMERAL x))
               (if ODD x then BIT1 y else numeral$iDUB y)) ∧
        ∀n x y.
            BIT_REV (NUMERAL (BIT2 n)) (NUMERAL x) y =
            BIT_REV (NUMERAL (BIT1 n)) (DIV2 (NUMERAL x))
              (if ODD x then BIT1 y else numeral$iDUB y)
   
   [NUMERAL_BIT_REVERSE]  Theorem
      
      ⊢ (∀m.
             BIT_REVERSE (NUMERAL m) 0 =
             NUMERAL (BIT_REV (NUMERAL m) 0 ZERO)) ∧
        ∀n m.
            BIT_REVERSE (NUMERAL m) (NUMERAL n) =
            NUMERAL (BIT_REV (NUMERAL m) (NUMERAL n) ZERO)
   
   [NUMERAL_DIV_2EXP]  Theorem
      
      ⊢ (∀n. DIV_2EXP n 0 = 0) ∧
        ∀n x.
            DIV_2EXP n (NUMERAL x) =
            NUMERAL (SFUNPOW numeral_bit$iDIV2 n x)
   
   [NUMERAL_SFUNPOW_FDUB]  Theorem
      
      ⊢ ∀f.
            (∀x. SFUNPOW (FDUB f) 0 x = x) ∧
            (∀y. SFUNPOW (FDUB f) y 0 = 0) ∧
            (∀n x.
                 SFUNPOW (FDUB f) (NUMERAL (BIT1 n)) x =
                 SFUNPOW (FDUB (FDUB f)) (NUMERAL n) (FDUB f x)) ∧
            ∀n x.
                SFUNPOW (FDUB f) (NUMERAL (BIT2 n)) x =
                SFUNPOW (FDUB (FDUB f)) (NUMERAL n) (FDUB f (FDUB f x))
   
   [NUMERAL_SFUNPOW_iDIV2]  Theorem
      
      ⊢ (∀x. SFUNPOW numeral_bit$iDIV2 0 x = x) ∧
        (∀y. SFUNPOW numeral_bit$iDIV2 y 0 = 0) ∧
        (∀n x.
             SFUNPOW numeral_bit$iDIV2 (NUMERAL (BIT1 n)) x =
             SFUNPOW (FDUB numeral_bit$iDIV2) (NUMERAL n)
               (numeral_bit$iDIV2 x)) ∧
        ∀n x.
            SFUNPOW numeral_bit$iDIV2 (NUMERAL (BIT2 n)) x =
            SFUNPOW (FDUB numeral_bit$iDIV2) (NUMERAL n)
              (numeral_bit$iDIV2 (numeral_bit$iDIV2 x))
   
   [NUMERAL_SFUNPOW_iDUB]  Theorem
      
      ⊢ (∀x. SFUNPOW numeral$iDUB 0 x = x) ∧
        (∀y. SFUNPOW numeral$iDUB y 0 = 0) ∧
        (∀n x.
             SFUNPOW numeral$iDUB (NUMERAL (BIT1 n)) x =
             SFUNPOW (FDUB numeral$iDUB) (NUMERAL n) (numeral$iDUB x)) ∧
        ∀n x.
            SFUNPOW numeral$iDUB (NUMERAL (BIT2 n)) x =
            SFUNPOW (FDUB numeral$iDUB) (NUMERAL n)
              (numeral$iDUB (numeral$iDUB x))
   
   [NUMERAL_TIMES_2EXP]  Theorem
      
      ⊢ (∀n. TIMES_2EXP n 0 = 0) ∧
        ∀n x. TIMES_2EXP n (NUMERAL x) = NUMERAL (SFUNPOW numeral$iDUB n x)
   
   [NUMERAL_iDIV2]  Theorem
      
      ⊢ (numeral_bit$iDIV2 ZERO = ZERO) ∧
        (numeral_bit$iDIV2 (numeral_bit$iSUC ZERO) = ZERO) ∧
        (numeral_bit$iDIV2 (BIT1 n) = n) ∧
        (numeral_bit$iDIV2 (numeral_bit$iSUC (BIT1 n)) = numeral_bit$iSUC n) ∧
        (numeral_bit$iDIV2 (BIT2 n) = numeral_bit$iSUC n) ∧
        (numeral_bit$iDIV2 (numeral_bit$iSUC (BIT2 n)) = numeral_bit$iSUC n) ∧
        (NUMERAL (numeral_bit$iSUC n) = NUMERAL (SUC n))
   
   [iBITWISE]  Theorem
      
      ⊢ (∀opr a b. numeral_bit$iBITWISE 0 opr a b = ZERO) ∧
        (∀x opr a b.
             numeral_bit$iBITWISE (NUMERAL (BIT1 x)) opr a b =
             (let
                w =
                  numeral_bit$iBITWISE (NUMERAL (BIT1 x) − 1) opr (DIV2 a)
                    (DIV2 b)
              in
                if opr (ODD a) (ODD b) then BIT1 w else numeral$iDUB w)) ∧
        ∀x opr a b.
            numeral_bit$iBITWISE (NUMERAL (BIT2 x)) opr a b =
            (let
               w =
                 numeral_bit$iBITWISE (NUMERAL (BIT1 x)) opr (DIV2 a)
                   (DIV2 b)
             in
               if opr (ODD a) (ODD b) then BIT1 w else numeral$iDUB w)
   
   [iDUB_NUMERAL]  Theorem
      
      ⊢ numeral$iDUB (NUMERAL i) = NUMERAL (numeral$iDUB i)
   
   [numeral_ilog2]  Theorem
      
      ⊢ (numeral_bit$iLOG2 ZERO = 0) ∧
        (∀n. numeral_bit$iLOG2 (BIT1 n) = 1 + numeral_bit$iLOG2 n) ∧
        ∀n. numeral_bit$iLOG2 (BIT2 n) = 1 + numeral_bit$iLOG2 n
   
   [numeral_imod_2exp]  Theorem
      
      ⊢ (∀n. numeral_bit$iMOD_2EXP 0 n = ZERO) ∧
        (∀x n. numeral_bit$iMOD_2EXP x ZERO = ZERO) ∧
        (∀x n.
             numeral_bit$iMOD_2EXP (NUMERAL (BIT1 x)) (BIT1 n) =
             BIT1 (numeral_bit$iMOD_2EXP (NUMERAL (BIT1 x) − 1) n)) ∧
        (∀x n.
             numeral_bit$iMOD_2EXP (NUMERAL (BIT2 x)) (BIT1 n) =
             BIT1 (numeral_bit$iMOD_2EXP (NUMERAL (BIT1 x)) n)) ∧
        (∀x n.
             numeral_bit$iMOD_2EXP (NUMERAL (BIT1 x)) (BIT2 n) =
             numeral$iDUB
               (numeral_bit$iMOD_2EXP (NUMERAL (BIT1 x) − 1) (SUC n))) ∧
        ∀x n.
            numeral_bit$iMOD_2EXP (NUMERAL (BIT2 x)) (BIT2 n) =
            numeral$iDUB (numeral_bit$iMOD_2EXP (NUMERAL (BIT1 x)) (SUC n))
   
   [numeral_log2]  Theorem
      
      ⊢ (∀n. LOG2 (NUMERAL (BIT1 n)) = numeral_bit$iLOG2 (numeral$iDUB n)) ∧
        ∀n. LOG2 (NUMERAL (BIT2 n)) = numeral_bit$iLOG2 (BIT1 n)
   
   [numeral_mod2]  Theorem
      
      ⊢ (0 MOD 2 = 0) ∧ (∀n. NUMERAL (BIT1 n) MOD 2 = 1) ∧
        ∀n. NUMERAL (BIT2 n) MOD 2 = 0
   
   
*)
end


Source File Identifier index Theory binding index

HOL 4, Kananaskis-11