HepLean Documentation

Init.Data.Nat.Bitwise.Lemmas

Preliminaries #

noncomputable def Nat.div2Induction {motive : NatSort u} (n : Nat) (ind : (n : Nat) → (n > 0motive (n / 2))motive n) :
motive n

An induction principal that works on division by two.

Equations
Instances For
    @[simp]
    theorem Nat.zero_and (x : Nat) :
    0 &&& x = 0
    @[simp]
    theorem Nat.and_zero (x : Nat) :
    x &&& 0 = 0
    @[simp]
    theorem Nat.one_and_eq_mod_two (n : Nat) :
    1 &&& n = n % 2
    @[simp]
    theorem Nat.and_one_is_mod (x : Nat) :
    x &&& 1 = x % 2

    testBit #

    @[simp]
    @[simp]
    theorem Nat.testBit_zero (x : Nat) :
    x.testBit 0 = decide (x % 2 = 1)
    theorem Nat.mod_two_eq_one_iff_testBit_zero {x : Nat} :
    x % 2 = 1 x.testBit 0 = true
    theorem Nat.mod_two_eq_zero_iff_testBit_zero {x : Nat} :
    x % 2 = 0 x.testBit 0 = false
    theorem Nat.testBit_succ (x : Nat) (i : Nat) :
    x.testBit i.succ = (x / 2).testBit i
    theorem Nat.testBit_add_one (x : Nat) (i : Nat) :
    x.testBit (i + 1) = (x / 2).testBit i

    Depending on use cases either testBit_add_one or testBit_div_two may be more useful as a simp lemma, so neither is a global simp lemma.

    theorem Nat.testBit_div_two (x : Nat) (i : Nat) :
    (x / 2).testBit i = x.testBit (i + 1)
    theorem Nat.testBit_to_div_mod {i : Nat} {x : Nat} :
    x.testBit i = decide (x / 2 ^ i % 2 = 1)
    theorem Nat.toNat_testBit (x : Nat) (i : Nat) :
    (x.testBit i).toNat = x / 2 ^ i % 2
    theorem Nat.ne_zero_implies_bit_true {x : Nat} (xnz : x 0) :
    ∃ (i : Nat), x.testBit i = true
    theorem Nat.ne_implies_bit_diff {x : Nat} {y : Nat} (p : x y) :
    ∃ (i : Nat), x.testBit i y.testBit i
    theorem Nat.eq_of_testBit_eq {x : Nat} {y : Nat} (pred : ∀ (i : Nat), x.testBit i = y.testBit i) :
    x = y

    eq_of_testBit_eq allows proving two natural numbers are equal if their bits are all equal.

    theorem Nat.ge_two_pow_implies_high_bit_true {n : Nat} {x : Nat} (p : x 2 ^ n) :
    ∃ (i : Nat), i n x.testBit i = true
    theorem Nat.testBit_implies_ge {i : Nat} {x : Nat} (p : x.testBit i = true) :
    x 2 ^ i
    theorem Nat.testBit_lt_two_pow {x : Nat} {i : Nat} (lt : x < 2 ^ i) :
    x.testBit i = false
    theorem Nat.lt_pow_two_of_testBit {n : Nat} (x : Nat) (p : ∀ (i : Nat), i nx.testBit i = false) :
    x < 2 ^ n
    theorem Nat.testBit_two_pow_add_eq (x : Nat) (i : Nat) :
    (2 ^ i + x).testBit i = !x.testBit i
    theorem Nat.testBit_mul_two_pow_add_eq (a : Nat) (b : Nat) (i : Nat) :
    (2 ^ i * a + b).testBit i = (decide (a % 2 = 1) ^^ b.testBit i)
    theorem Nat.testBit_two_pow_add_gt {i : Nat} {j : Nat} (j_lt_i : j < i) (x : Nat) :
    (2 ^ i + x).testBit j = x.testBit j
    @[simp]
    theorem Nat.testBit_mod_two_pow (x : Nat) (j : Nat) (i : Nat) :
    (x % 2 ^ j).testBit i = (decide (i < j) && x.testBit i)
    theorem Nat.not_decide_mod_two_eq_one (x : Nat) :
    (!decide (x % 2 = 1)) = decide (x % 2 = 0)
    theorem Nat.testBit_two_pow_sub_succ {x : Nat} {n : Nat} (h₂ : x < 2 ^ n) (i : Nat) :
    (2 ^ n - (x + 1)).testBit i = (decide (i < n) && !x.testBit i)
    @[simp]
    theorem Nat.testBit_two_pow_sub_one (n : Nat) (i : Nat) :
    (2 ^ n - 1).testBit i = decide (i < n)
    theorem Nat.testBit_bool_to_nat (b : Bool) (i : Nat) :
    b.toNat.testBit i = (decide (i = 0) && b)

    testBit 1 i is true iff the index i equals 0.

    theorem Nat.testBit_two_pow {n : Nat} {m : Nat} :
    (2 ^ n).testBit m = decide (n = m)
    @[simp]
    theorem Nat.testBit_two_pow_self {n : Nat} :
    (2 ^ n).testBit n = true
    @[simp]
    theorem Nat.testBit_two_pow_of_ne {n : Nat} {m : Nat} (hm : n m) :
    (2 ^ n).testBit m = false
    @[simp]
    theorem Nat.two_pow_sub_one_mod_two {n : Nat} :
    (2 ^ n - 1) % 2 = 1 % 2 ^ n
    @[simp]
    theorem Nat.mod_two_pos_mod_two_eq_one {x : Nat} {j : Nat} :
    x % 2 ^ j % 2 = 1 0 < j x % 2 = 1

    bitwise #

    theorem Nat.testBit_bitwise {f : BoolBoolBool} (false_false_axiom : f false false = false) (x : Nat) (y : Nat) (i : Nat) :
    (Nat.bitwise f x y).testBit i = f (x.testBit i) (y.testBit i)

    bitwise #

    theorem Nat.bitwise_lt_two_pow {x : Nat} {n : Nat} {y : Nat} {f : BoolBoolBool} (left : x < 2 ^ n) (right : y < 2 ^ n) :
    Nat.bitwise f x y < 2 ^ n

    This provides a bound on bitwise operations.

    and #

    @[simp]
    theorem Nat.testBit_and (x : Nat) (y : Nat) (i : Nat) :
    (x &&& y).testBit i = (x.testBit i && y.testBit i)
    @[simp]
    theorem Nat.and_self (x : Nat) :
    x &&& x = x
    theorem Nat.and_comm (x : Nat) (y : Nat) :
    x &&& y = y &&& x
    theorem Nat.and_assoc (x : Nat) (y : Nat) (z : Nat) :
    x &&& y &&& z = x &&& (y &&& z)
    instance Nat.instAssociativeHAnd :
    Std.Associative fun (x1 x2 : Nat) => x1 &&& x2
    Equations
    instance Nat.instCommutativeHAnd :
    Std.Commutative fun (x1 x2 : Nat) => x1 &&& x2
    Equations
    theorem Nat.and_lt_two_pow (x : Nat) {y : Nat} {n : Nat} (right : y < 2 ^ n) :
    x &&& y < 2 ^ n
    @[simp]
    theorem Nat.and_pow_two_sub_one_eq_mod (x : Nat) (n : Nat) :
    x &&& 2 ^ n - 1 = x % 2 ^ n
    @[reducible, inline, deprecated Nat.and_pow_two_sub_one_eq_mod]
    abbrev Nat.and_pow_two_is_mod (x : Nat) (n : Nat) :
    x &&& 2 ^ n - 1 = x % 2 ^ n
    Equations
    Instances For
      theorem Nat.and_pow_two_sub_one_of_lt_two_pow {n : Nat} {x : Nat} (lt : x < 2 ^ n) :
      x &&& 2 ^ n - 1 = x
      @[reducible, inline, deprecated Nat.and_pow_two_sub_one_of_lt_two_pow]
      abbrev Nat.and_two_pow_identity {n : Nat} {x : Nat} (lt : x < 2 ^ n) :
      x &&& 2 ^ n - 1 = x
      Equations
      Instances For
        @[simp]
        theorem Nat.and_mod_two_eq_one {a : Nat} {b : Nat} :
        (a &&& b) % 2 = 1 a % 2 = 1 b % 2 = 1
        theorem Nat.and_div_two {a : Nat} {b : Nat} :
        (a &&& b) / 2 = a / 2 &&& b / 2

        lor #

        @[simp]
        theorem Nat.zero_or (x : Nat) :
        0 ||| x = x
        @[simp]
        theorem Nat.or_zero (x : Nat) :
        x ||| 0 = x
        @[simp]
        theorem Nat.testBit_or (x : Nat) (y : Nat) (i : Nat) :
        (x ||| y).testBit i = (x.testBit i || y.testBit i)
        @[simp]
        theorem Nat.or_self (x : Nat) :
        x ||| x = x
        theorem Nat.or_comm (x : Nat) (y : Nat) :
        x ||| y = y ||| x
        theorem Nat.or_assoc (x : Nat) (y : Nat) (z : Nat) :
        x ||| y ||| z = x ||| (y ||| z)
        theorem Nat.and_or_distrib_left (x : Nat) (y : Nat) (z : Nat) :
        x &&& (y ||| z) = x &&& y ||| x &&& z
        theorem Nat.and_distrib_right (x : Nat) (y : Nat) (z : Nat) :
        (x ||| y) &&& z = x &&& z ||| y &&& z
        theorem Nat.or_and_distrib_left (x : Nat) (y : Nat) (z : Nat) :
        x ||| y &&& z = (x ||| y) &&& (x ||| z)
        theorem Nat.or_and_distrib_right (x : Nat) (y : Nat) (z : Nat) :
        x &&& y ||| z = (x ||| z) &&& (y ||| z)
        instance Nat.instAssociativeHOr :
        Std.Associative fun (x1 x2 : Nat) => x1 ||| x2
        Equations
        instance Nat.instCommutativeHOr :
        Std.Commutative fun (x1 x2 : Nat) => x1 ||| x2
        Equations
        instance Nat.instIdempotentOpHOr :
        Std.IdempotentOp fun (x1 x2 : Nat) => x1 ||| x2
        Equations
        theorem Nat.or_lt_two_pow {x : Nat} {y : Nat} {n : Nat} (left : x < 2 ^ n) (right : y < 2 ^ n) :
        x ||| y < 2 ^ n
        @[simp]
        theorem Nat.or_mod_two_eq_one {a : Nat} {b : Nat} :
        (a ||| b) % 2 = 1 a % 2 = 1 b % 2 = 1
        theorem Nat.or_div_two {a : Nat} {b : Nat} :
        (a ||| b) / 2 = a / 2 ||| b / 2

        xor #

        @[simp]
        theorem Nat.testBit_xor (x : Nat) (y : Nat) (i : Nat) :
        (x ^^^ y).testBit i = (x.testBit i ^^ y.testBit i)
        @[simp]
        theorem Nat.zero_xor (x : Nat) :
        0 ^^^ x = x
        @[simp]
        theorem Nat.xor_zero (x : Nat) :
        x ^^^ 0 = x
        @[simp]
        theorem Nat.xor_self (x : Nat) :
        x ^^^ x = 0
        theorem Nat.xor_comm (x : Nat) (y : Nat) :
        x ^^^ y = y ^^^ x
        theorem Nat.xor_assoc (x : Nat) (y : Nat) (z : Nat) :
        x ^^^ y ^^^ z = x ^^^ (y ^^^ z)
        instance Nat.instAssociativeHXor :
        Std.Associative fun (x1 x2 : Nat) => x1 ^^^ x2
        Equations
        instance Nat.instCommutativeHXor :
        Std.Commutative fun (x1 x2 : Nat) => x1 ^^^ x2
        Equations
        theorem Nat.xor_lt_two_pow {x : Nat} {y : Nat} {n : Nat} (left : x < 2 ^ n) (right : y < 2 ^ n) :
        x ^^^ y < 2 ^ n
        theorem Nat.and_xor_distrib_right {a : Nat} {b : Nat} {c : Nat} :
        (a ^^^ b) &&& c = a &&& c ^^^ b &&& c
        theorem Nat.and_xor_distrib_left {a : Nat} {b : Nat} {c : Nat} :
        a &&& (b ^^^ c) = a &&& b ^^^ a &&& c
        @[simp]
        theorem Nat.xor_mod_two_eq_one {a : Nat} {b : Nat} :
        (a ^^^ b) % 2 = 1 ¬(a % 2 = 1 b % 2 = 1)
        theorem Nat.xor_div_two {a : Nat} {b : Nat} :
        (a ^^^ b) / 2 = a / 2 ^^^ b / 2

        Arithmetic #

        theorem Nat.testBit_mul_pow_two_add (a : Nat) {b : Nat} {i : Nat} (b_lt : b < 2 ^ i) (j : Nat) :
        (2 ^ i * a + b).testBit j = if j < i then b.testBit j else a.testBit (j - i)
        theorem Nat.testBit_mul_pow_two {i : Nat} {a : Nat} {j : Nat} :
        (2 ^ i * a).testBit j = (decide (j i) && a.testBit (j - i))
        theorem Nat.mul_add_lt_is_or {i : Nat} {b : Nat} (b_lt : b < 2 ^ i) (a : Nat) :
        2 ^ i * a + b = 2 ^ i * a ||| b

        shiftLeft and shiftRight #

        @[simp]
        theorem Nat.testBit_shiftLeft {i : Nat} {j : Nat} (x : Nat) :
        (x <<< i).testBit j = (decide (j i) && x.testBit (j - i))
        @[simp]
        theorem Nat.testBit_shiftRight {i : Nat} {j : Nat} (x : Nat) :
        (x >>> i).testBit j = x.testBit (i + j)
        @[simp]
        theorem Nat.shiftLeft_mod_two_eq_one {x : Nat} {i : Nat} :
        x <<< i % 2 = 1 i = 0 x % 2 = 1
        @[simp]
        theorem Nat.decide_shiftRight_mod_two_eq_one {x : Nat} {i : Nat} :
        decide (x >>> i % 2 = 1) = x.testBit i

        le #

        theorem Nat.le_of_testBit {n : Nat} {m : Nat} (h : ∀ (i : Nat), n.testBit i = truem.testBit i = true) :
        n m
        theorem Nat.and_le_left {n : Nat} {m : Nat} :
        n &&& m n
        theorem Nat.and_le_right {n : Nat} {m : Nat} :
        n &&& m m