This PR splits `Int.DivModLemmas` into a `Bootstrap` and `Lemmas` file,
where it is possible to use `omega` in `Lemmas`.
I'm going to add more theory, particularly about `fdiv` and `tdiv` to
the `Lemmas` file, and would prefer to have access to `omega`.
This PR adds `IntX.abs` functions. These are specified by `BitVec.abs`,
so they map `IntX.minValue` to `IntX.minValue`, similar to Rust's
`i8::abs`. In the future we might also have versions which take values
in `UIntX` and/or `Nat`.
This PR gives the `induction` tactic the ability to name hypotheses to
use when generalizing targets, just like in `cases`. For example,
`induction h : xs.length` leads to goals with hypotheses `h : xs.length
= 0` and `h : xs.length = n + 1`. Target handling is also slightly
modified for multi-target induction principles: it used to be that if
any target was not a free variable, all of the targets would be
generalized (thus causing free variables to lose their connection to the
local hypotheses they appear in); now only the non-free-variable targets
are generalized.
This gives `induction` the last basic feature of the mathlib
`induction'` tactic, which has been long-requested. Recent Zulip
discussion:
https://leanprover.zulipchat.com/#narrow/channel/270676-lean4/topic/To.20replace.20.60induction'.20h.20.3A.20f.20x.60/near/499482173
This PR moves away from using `List.get` / `List.get?` / `List.get!` and
`Array.get!`, in favour of using the `GetElem` mediated getters. In
particular it deprecates `List.get?`, `List.get!` and `Array.get?`. Also
adds `Array.back`, taking a proof, matching `List.getLast`.
This PR implements several modifications for the cutsat procedure in
`grind`.
- The maximal variable is now at the beginning of linear polynomials.
- The old `LinearArith.Solver` was deleted, and the normalizer was moved
to `Simp`.
- cutsat first files were created, and basic infrastructure for
representing divisibility constraints was added.
This PR makes `BitVec.getElem` the simp normal form in case a proof is
available and changes `ext` to return `x[i]` + a hypothesis that proves
that we are in-bounds. This aligns `BitVec` further with the API
conventions of the Lean standard datatypes.
We move our proofs to this new normal form, which results in slightly
smaller proofs. With the exception of `getElem_ofFin`, no new API
surface is added as the `getElem` API has already been completed over
the previous months. We also move `getElem_shiftConcat_*` a bit higher
as they are needed in earlier proofs. To keep the changeset small, we do
not update the API of `BVDecide` but insert `←
BitVec.getLsbD_eq_getElem` at the few locations where it is needed.
Finally, we add a simproc for getElem, mirroring the existing ones for
getLsbD/getMsdD.
---------
Co-authored-by: Alex Keizer <alex@keizer.dev>
This PR adds the functions `Poly.denote'`, `RelCnstr.denote'`, and
`DvdCnstr.denote'`. These functions are useful for representing the
denotation of normalized results in `simp +arith` and the `grind`
preprocessor. This PR also adjusts all auxiliary normalization theorems
to use them to represent the normalized constraints. Previously, we were
converting `RelCnstr` and `DvdCnstr` back into raw constraints. While
this overhead was reasonable for `simp +arith`, it is not for the cutsat
procedure, which has no need for raw constraints. All constraints have
already been normalized by the time they reach cutsat.
This PR cleans up the `Int.Linear` module by normalizing function and
type names and adding documentation strings. We will use it to implement
cutsat in the `grind` tactic.
This PR adds helper theorems for normalizing divisibility constraints.
They are going to be used to implement the cutsat procedure in the
`grind` tactic.
This PR introduces `Fin.toNat` as an alias for `Fin.val`. We add this
function for discoverability and consistency reasons. The normal form
for proofs remains `Fin.val`, and there is a `simp` lemma rewriting
`Fin.toNat` to `Fin.val`.
This PR adds functions `IntX.ofIntLE`, `IntX.ofIntTruncate`, which are
analogous to the unsigned counterparts `UIntX.ofNatLT` and
`UInt.ofNatTruncate`.
