This PR upstreams many of the results from `Mathlib/Data/Int/Init.lean`.
Notably, we upstream the `simp` tag on `Int.natCast_pow`. While this is
desirable as a `simp` lemma, it is non-confluent with other good `simp`
lemmas like `Int.emod_bmod_congr`, and this will need to be addressed in
the future.
This PR moves `ReflBEq` to `Init.Core` and changes `LawfulBEq` to extend
`ReflBEq`.
**BREAKING CHANGES:**
- The `refl` field of `ReflBEq` has been renamed to `rfl` to match
`LawfulBEq`
- `LawfulBEq` extends `ReflBEq`, so in particular `LawfulBEq.rfl` is no
longer valid
This PR adds an `inheritEnv` field to `IO.Process.SpawnArgs`. If
`false`, the spawned process does not inherit its parent's environment.
For example, Lake will make use of this to ensure that build processes
do not use environment variables that Lake is not properly tracking with
its traces.
This PR modifies the syntax of `induction`, `cases`, and other tactics
that use `Lean.Parser.Tactic.inductionAlts`. If a case omits `=> ...`
then it is assumed to be `=> ?_`. Example:
```lean
example (p : Nat × Nat) : p.1 = p.1 := by
cases p with | _ p1 p2
/-
case mk
p1 p2 : Nat
⊢ (p1, p2).fst = (p1, p2).fst
-/
```
This works with multiple cases as well. Example:
```lean
example (n : Nat) : n + 1 = 1 + n := by
induction n with | zero | succ n ih
/-
case zero
⊢ 0 + 1 = 1 + 0
case succ
n : Nat
ih : n + 1 = 1 + n
⊢ n + 1 + 1 = 1 + (n + 1)
-/
```
The `induction n with | zero | succ n ih` is short for `induction n with
| zero | succ n ih => ?_`, which is short for `induction n with | zero
=> ?_ | succ n ih => ?_`. Note that a consequence of parsing is that
only the last alternative can omit `=>`. Any `=>`-free alternatives
before an alternative with `=>` will be a part of that alternative.
Rationale:
- In the future we may require `tacticSeq` to be indented. For
one-constructor types, this lets the rest of the tactic sequence not
need indentation.
- This is a semi-structured alternative to the `cases'`/`induction'`
tactics in mathlib.
This PR adds lemmas about `Int.bmod` to achieve parity between
`Int.bmod` and `Int.emod`/`Int.fmod`/`Int.tmod`. Furthermore, it adds
missing lemmas for `emod`/`fmod`/`tmod` and performs cleanup on names
and statements for all four operations, also with a view towards
increasing consistency with the corresponding `Nat.mod` lemmas.
This PR adds some docstrings to clarify the functions of
`Lean.mkFreshId`, `Lean.Core.mkFreshUserName`,
`Lean.Elab.Term.mkFreshBinderName`, and
`Lean.Meta.mkFreshBinderNameForTactic`.
This PR generalizes some typeclass hypotheses in the `List.Perm` API
(away from `DecidableEq`), and reproduces `List.Perm.mem_iff` for
`Array`, and fixes a mistake in the statement of `Array.Perm.extract`.
This PR adds the attribute `[grind ext]`. It is used to select which
`[ext]` theorems should be used by `grind`. The option `grind +extAll`
instructs `grind` to use all `[ext]` theorems available in the
environment.
After update stage0, we need to add the builtin `[grind ext]`
annotations to key theorems such as `funext`.
This PR adds lemmas about `List/Array/Vector.countP/count` interacting
with `replace`. (Specializing to `_self` and `_ne` lemmas doesn't seem
useful, as there will still be an `if` on the RHS.)
This PR extends `Std.Channel` to provide a full sync and async API, as
well as unbounded, zero sized and bounded channels.
A few notes on the implementation:
- the bounded channel is inspired by [Go channels on
steroids](https://docs.google.com/document/d/1yIAYmbvL3JxOKOjuCyon7JhW4cSv1wy5hC0ApeGMV9s/pub)
though currently doesn't do any of the lock-free optimizations
- @mhuisi convinced me that having a non-closable channel may be a good
idea as this alleviates the need for error handling which is very
annoying when working with `Task`. This does complicate the API a little
bit and I'm not quite sure whether this is a choice we want users to
give. An alternative to this would be to just write `send!` that panics
on sending to a closed channel (receiving from a closed channel is not
an error), this is for example the behavior that golang goes with.
This PR adds some missing `List/Array/Vector lemmas` about
`isSome_idxOf?`, `isSome_finIdxOf?`, `isSome_findFinIdx?,
`isSome_findIdx?` and the corresponding `isNone` versions.
This PR fixes two bugs in `grind`.
1. Model-based theory combination was creating type incorrect terms.
2. `Nat.cast` vs `NatCast.natCast` issue during normalization.
This PR cleans up the `Option` development, upstreaming some results
from mathlib in the process.
Notable changes:
- the name `<op>_eq_some_iff` is preferred over `<op>_eq_some`
- the `simp` normal form for `<$>` is `Option.map`, for `>>=` is
`Option.bind` and for `<|>` is `Option.orElse` (for the former two, this
was already true before this PR). All further lemmas about these
operations are now stated only in terms of
`Option.map`/`Option.bind`/`Option.orElse`. Previously, in some cases
both versions were available, with a prime used to disambiguate (the
primed version was usually the "non-ascii-art" version). Now, there are
no lemmas about the ascii-art versions besides the ones turning them
into the non-ascii-art operations, and there is only one version of
every lemma, about the non-ascii-art operation, and named without a
prime.
This PR adds `instance [Pure f] : Inhabited (OptionT f α)`, so that
`Inhabited (OptionT Id Empty)` synthesizes.
Co-authored-by: Sebastian Graf <sg@lean-fro.org>
This PR shuffles some results about integers around to make sure that
all material that currently exists about `Int.bmod` is located in
`DivMod/Lemmas.lean` and not downstream of that.
This PR adds a mixin typeclass for `Lean.Grind.CommRing` recording the
characteristic of the ring, and constructs instances for `Int`, `IntX`,
`UIntX`, and `BitVec`.
This PR adds `BitVec.pow` and `Pow (BitVec w) Nat`. The implementation
is the naive one, and should later be replaced by an `@[extern]`. This
is tracked at https://github.com/leanprover/lean4/issues/7887.
This PR adds `Int.toNat_sub''` a variant of `Int.toNat_sub` taking
inequality hypotheses, rather than expecting the arguments to be casts
of natural numbers. This is parallel to the existing `toNat_add` and
`toNat_mul`.
This PR adds `UIntX.pow` and `Pow UIntX Nat` instances, and similarly
for signed fixed-width integers. These are currently only the naive
implementation, and will need to be subsequently replaced via
`@[extern]` with fast implementations (tracked at #7887).
This PR generalizes the typeclass assumptions on monadic `Option`
functions.
`Option.mapA` is now an alias for `Option.mapM`, which now works for
applicative functors. The changed definition is exactly equivalent for
monads which use the default implementation of `map`, and those who
change it will hopefully choose a definition for `map` that is more
efficient and not less efficient. `Option.mapA` is not deprecated in
order to keep the API aligned with `List` (`List.mapA` and `List.mapM`
cannot be unified because the monadic version is much more efficient
than the applicative version).
This PR fixes a regression introduced in #7445 where the new
`Array.emptyWithCapacity` was accidentally not tagged with the correct
function to actually allocate the capacity.
This PR partially reverts #7818, because the function called
`Option.zipWith` in that PR does not actually correspond to
`List.zipWith`. We choose `Option.merge` as the name instead.
This PR changes definitions and theorems not to use the membership
instance on `Option` unless the theorem is specifically about the
membership instance.
The reasoning for this change is that the lemma `a ∈ o ↔ o = some a` is
a `simp` lemma, and we generally want theorem statements to use `simp`
normal forms.
One notable exception is the `ForIn'` instance, which must use
`Membership` because unlike `GetElem`, `ForIn'` requires the validity
predicate to be expressed via `Membership`.
This PR improves the normalization of `Bool` terms in `grind`. Recall
that `grind` currently does not case split on Boolean terms to reduce
the size of the search space.
This PR adds `BitVec.[toInt_append|toFin_append]`.
`toInt_append` states:
```lean
(x ++ y).toInt = if n == 0 then y.toInt else (2 ^ m) * x.toInt + y.toNat
```
We also add the following `Nat` theorem (derived from a corresponding
theorem `two_pow_add_eq_or_of_lt`) as it faciliates the `append` proofs:
```lean
theorem shiftLeft_add_eq_or_of_lt {b : Nat} (b_lt : b < 2^i) (a : Nat) :
a <<< i + b = a <<< i ||| b
```
This PR proves `List.head_of_mem_head?` and the analogous
`List.getLast_of_mem_getLast?`.
These are similar to the existing `List.head_eq_iff_head?_eq_some` and
`List.getLast_eq_iff_getLast?_eq_some`, with the added convenience that
the proof term needs not be given.
---------
Co-authored-by: Kim Morrison <kim@tqft.net>