.. include:: ../replaces.rst .. |ra| replace:: :math:`\rightarrow_{\beta\delta\iota}` .. |la| replace:: :math:`\leftarrow_{\beta\delta\iota}` .. |eq| replace:: `=`:sub:`(by the main correctness theorem)` .. |re| replace:: ``(PEeval`` `v` `ap`\ ``)`` .. |le| replace:: ``(Pphi_dev`` `v` ``(norm`` `ap`\ ``))`` .. _theringandfieldtacticfamilies: The ring and field tactic families ==================================== :Author: Bruno Barras, Benjamin Grégoire, Assia Mahboubi, Laurent Théry [#f1]_ This chapter presents the tactics dedicated to deal with ring and field equations. What does this tactic do? ------------------------------ ``ring`` does associative-commutative rewriting in ring and semi-ring structures. Assume you have two binary functions :math:`\oplus` and :math:`\otimes` that are associative and commutative, with :math:`\oplus` distributive on :math:`\otimes`, and two constants 0 and 1 that are unities for :math:`\oplus` and :math:`\otimes`. A polynomial is an expression built on variables :math:`V_0`, :math:`V_1`, :math:`\dots` and constants by application of :math:`\oplus` and :math:`\otimes`. Let an ordered product be a product of variables :math:`V_{i_1} \otimes \dots \otimes V_{i_n}` verifying :math:`i_1 ≤ i_2 ≤ \dots ≤ i_n` . Let a monomial be the product of a constant and an ordered product. We can order the monomials by the lexicographic order on products of variables. Let a canonical sum be an ordered sum of monomials that are all different, i.e. each monomial in the sum is strictly less than the following monomial according to the lexicographic order. It is an easy theorem to show that every polynomial is equivalent (modulo the ring properties) to exactly one canonical sum. This canonical sum is called the normal form of the polynomial. In fact, the actual representation shares monomials with same prefixes. So what does ring? It normalizes polynomials over any ring or semi-ring structure. The basic use of ``ring`` is to simplify ring expressions, so that the user does not have to deal manually with the theorems of associativity and commutativity. .. example:: In the ring of integers, the normal form of :math:`x (3 + yx + 25(1 − z)) + zx` is :math:`28x + (−24)xz + xxy`. ``ring`` is also able to compute a normal form modulo monomial equalities. For example, under the hypothesis that :math:`2x^2 = yz+1`, the normal form of :math:`2(x + 1)x − x − zy` is :math:`x+1`. The variables map ---------------------- It is frequent to have an expression built with :math:`+` and :math:`\times`, but rarely on variables only. Let us associate a number to each subterm of a ring expression in the Gallina language. For example in the ring |nat|, consider the expression: :: (plus (mult (plus (f (5)) x) x) (mult (if b then (4) else (f (3))) (2))) As a ring expression, it has 3 subterms. Give each subterm a number in an arbitrary order: ===== =============== ========================= 0 :math:`\mapsto` if b then (4) else (f (3)) 1 :math:`\mapsto` (f (5)) 2 :math:`\mapsto` x ===== =============== ========================= Then normalize the “abstract” polynomial :math:`((V_1 \otimes V_2 ) \oplus V_2) \oplus (V_0 \otimes 2)` In our example the normal form is: :math:`(2 \otimes V_0 ) \oplus (V_1 \otimes V_2) \oplus (V_2 \otimes V_2 )`. Then substitute the variables by their values in the variables map to get the concrete normal polynomial: :: (plus (mult (2) (if b then (4) else (f (3)))) (plus (mult (f (5)) x) (mult x x))) Is it automatic? --------------------- Yes, building the variables map and doing the substitution after normalizing is automatically done by the tactic. So you can just forget this paragraph and use the tactic according to your intuition. Concrete usage in Coq -------------------------- .. tacn:: ring The ``ring`` tactic solves equations upon polynomial expressions of a ring (or semi-ring) structure. It proceeds by normalizing both hand sides of the equation (w.r.t. associativity, commutativity and distributivity, constant propagation, rewriting of monomials) and comparing syntactically the results. .. tacn:: ring_simplify ``ring_simplify`` applies the normalization procedure described above to the terms given. The tactic then replaces all occurrences of the terms given in the conclusion of the goal by their normal forms. If no term is given, then the conclusion should be an equation and both hand sides are normalized. The tactic can also be applied in a hypothesis. The tactic must be loaded by ``Require Import Ring``. The ring structures must be declared with the ``Add Ring`` command (see below). The ring of booleans is predefined; if one wants to use the tactic on |nat| one must first require the module ``ArithRing`` exported by ``Arith``); for |Z|, do ``Require Import ZArithRing`` or simply ``Require Import ZArith``; for |N|, do ``Require Import NArithRing`` or ``Require Import NArith``. .. example:: .. coqtop:: all Require Import ZArith. Open Scope Z_scope. Goal forall a b c:Z, (a + b + c) ^ 2 = a * a + b ^ 2 + c * c + 2 * a * b + 2 * a * c + 2 * b * c. intros; ring. Abort. Goal forall a b:Z, 2 * a * b = 30 -> (a + b) ^ 2 = a ^ 2 + b ^ 2 + 30. intros a b H; ring [H]. Abort. .. tacv:: ring [{* @term }] decides the equality of two terms modulo ring operations and the equalities defined by the :n:`@term`\ s. Each :n:`@term` has to be a proof of some equality `m = p`, where `m` is a monomial (after “abstraction”), `p` a polynomial and `=` the corresponding equality of the ring structure. .. tacv:: ring_simplify [{* @term }] {* @term } in @ident performs the simplification in the hypothesis named :n:`@ident`. .. note:: .. tacn:: ring_simplify @term1; ring_simplify @term2 is not equivalent to .. tacn:: ring_simplify @term1 @term2 In the latter case the variables map is shared between the two terms, and common subterm `t` of :n:`@term1` and :n:`@term2` will have the same associated variable number. So the first alternative should be avoided for terms belonging to the same ring theory. Error messages: .. exn:: Not a valid ring equation. The conclusion of the goal is not provable in the corresponding ring theory. .. exn:: Arguments of ring_simplify do not have all the same type. ``ring_simplify`` cannot simplify terms of several rings at the same time. Invoke the tactic once per ring structure. .. exn:: Cannot find a declared ring structure over @term. No ring has been declared for the type of the terms to be simplified. Use ``Add Ring`` first. .. exn:: Cannot find a declared ring structure for equality @term. Same as above is the case of the ``ring`` tactic. Adding a ring structure ---------------------------- Declaring a new ring consists in proving that a ring signature (a carrier set, an equality, and ring operations: ``Ring_theory.ring_theory`` and ``Ring_theory.semi_ring_theory``) satisfies the ring axioms. Semi- rings (rings without + inverse) are also supported. The equality can be either Leibniz equality, or any relation declared as a setoid (see :ref:`tactics-enabled-on-user-provided-relations`). The definition of ring and semi-rings (see module ``Ring_theory``) is: .. coqtop:: in Record ring_theory : Prop := mk_rt { Radd_0_l : forall x, 0 + x == x; Radd_sym : forall x y, x + y == y + x; Radd_assoc : forall x y z, x + (y + z) == (x + y) + z; Rmul_1_l : forall x, 1 * x == x; Rmul_sym : forall x y, x * y == y * x; Rmul_assoc : forall x y z, x * (y * z) == (x * y) * z; Rdistr_l : forall x y z, (x + y) * z == (x * z) + (y * z); Rsub_def : forall x y, x - y == x + -y; Ropp_def : forall x, x + (- x) == 0 }. Record semi_ring_theory : Prop := mk_srt { SRadd_0_l : forall n, 0 + n == n; SRadd_sym : forall n m, n + m == m + n ; SRadd_assoc : forall n m p, n + (m + p) == (n + m) + p; SRmul_1_l : forall n, 1*n == n; SRmul_0_l : forall n, 0*n == 0; SRmul_sym : forall n m, n*m == m*n; SRmul_assoc : forall n m p, n*(m*p) == (n*m)*p; SRdistr_l : forall n m p, (n + m)*p == n*p + m*p }. This implementation of ``ring`` also features a notion of constant that can be parameterized. This can be used to improve the handling of closed expressions when operations are effective. It consists in introducing a type of *coefficients* and an implementation of the ring operations, and a morphism from the coefficient type to the ring carrier type. The morphism needs not be injective, nor surjective. As an example, one can consider the real numbers. The set of coefficients could be the rational numbers, upon which the ring operations can be implemented. The fact that there exists a morphism is defined by the following properties: .. coqtop:: in Record ring_morph : Prop := mkmorph { morph0 : [cO] == 0; morph1 : [cI] == 1; morph_add : forall x y, [x +! y] == [x]+[y]; morph_sub : forall x y, [x -! y] == [x]-[y]; morph_mul : forall x y, [x *! y] == [x]*[y]; morph_opp : forall x, [-!x] == -[x]; morph_eq : forall x y, x?=!y = true -> [x] == [y] }. Record semi_morph : Prop := mkRmorph { Smorph0 : [cO] == 0; Smorph1 : [cI] == 1; Smorph_add : forall x y, [x +! y] == [x]+[y]; Smorph_mul : forall x y, [x *! y] == [x]*[y]; Smorph_eq : forall x y, x?=!y = true -> [x] == [y] }. where ``c0`` and ``cI`` denote the 0 and 1 of the coefficient set, ``+!``, ``*!``, ``-!`` are the implementations of the ring operations, ``==`` is the equality of the coefficients, ``?+!`` is an implementation of this equality, and ``[x]`` is a notation for the image of ``x`` by the ring morphism. Since |Z| is an initial ring (and |N| is an initial semi-ring), it can always be considered as a set of coefficients. There are basically three kinds of (semi-)rings: abstract rings to be used when operations are not effective. The set of coefficients is |Z| (or |N| for semi-rings). computational rings to be used when operations are effective. The set of coefficients is the ring itself. The user only has to provide an implementation for the equality. customized ring for other cases. The user has to provide the coefficient set and the morphism. This implementation of ring can also recognize simple power expressions as ring expressions. A power function is specified by the following property: .. coqtop:: in Section POWER. Variable Cpow : Set. Variable Cp_phi : N -> Cpow. Variable rpow : R -> Cpow -> R. Record power_theory : Prop := mkpow_th { rpow_pow_N : forall r n, req (rpow r (Cp_phi n)) (pow_N rI rmul r n) }. End POWER. The syntax for adding a new ring is .. cmd:: Add Ring @ident : @term {? ( @ring_mod {* , @ring_mod } )} The :n:`@ident` is not relevant. It is just used for error messages. The :n:`@term` is a proof that the ring signature satisfies the (semi-)ring axioms. The optional list of modifiers is used to tailor the behavior of the tactic. The following list describes their syntax and effects: .. productionlist:: coq ring_mod : abstract | decidable `term` | morphism `term` : | setoid `term` `term` : | constants [`ltac`] : | preprocess [`ltac`] : | postprocess [`ltac`] : | power_tac `term` [`ltac`] : | sign `term` : | div `term` abstract declares the ring as abstract. This is the default. decidable :n:`@term` declares the ring as computational. The expression :n:`@term` is the correctness proof of an equality test ``?=!`` (which hould be evaluable). Its type should be of the form ``forall x y, x ?=! y = true → x == y``. morphism :n:`@term` declares the ring as a customized one. The expression :n:`@term` is a proof that there exists a morphism between a set of coefficient and the ring carrier (see ``Ring_theory.ring_morph`` and ``Ring_theory.semi_morph``). setoid :n:`@term` :n:`@term` forces the use of given setoid. The first :n:`@term` is a proof that the equality is indeed a setoid (see ``Setoid.Setoid_Theory``), and the second :n:`@term` a proof that the ring operations are morphisms (see ``Ring_theory.ring_eq_ext`` and ``Ring_theory.sring_eq_ext``). This modifier needs not be used if the setoid and morphisms have been declared. constants [:n:`@ltac`] specifies a tactic expression :n:`@ltac` that, given a term, returns either an object of the coefficient set that is mapped to the expression via the morphism, or returns ``InitialRing.NotConstant``. The default behavior is to map only 0 and 1 to their counterpart in the coefficient set. This is generally not desirable for non trivial computational rings. preprocess [:n:`@ltac`] specifies a tactic :n:`@ltac` that is applied as a preliminary step for ``ring`` and ``ring_simplify``. It can be used to transform a goal so that it is better recognized. For instance, ``S n`` can be changed to ``plus 1 n``. postprocess [:n:`@ltac`] specifies a tactic :n:`@ltac` that is applied as a final step for ``ring_simplify``. For instance, it can be used to undo modifications of the preprocessor. power_tac :n:`@term` [:n:`@ltac`] allows ``ring`` and ``ring_simplify`` to recognize power expressions with a constant positive integer exponent (example: ::math:`x^2` ). The term :n:`@term` is a proof that a given power function satisfies the specification of a power function (term has to be a proof of ``Ring_theory.power_theory``) and :n:`@ltac` specifies a tactic expression that, given a term, “abstracts” it into an object of type |N| whose interpretation via ``Cp_phi`` (the evaluation function of power coefficient) is the original term, or returns ``InitialRing.NotConstant`` if not a constant coefficient (i.e. |L_tac| is the inverse function of ``Cp_phi``). See files ``plugins/setoid_ring/ZArithRing.v`` and ``plugins/setoid_ring/RealField.v`` for examples. By default the tactic does not recognize power expressions as ring expressions. sign :n:`@term` allows ``ring_simplify`` to use a minus operation when outputting its normal form, i.e writing ``x − y`` instead of ``x + (− y)``. The term `:n:`@term` is a proof that a given sign function indicates expressions that are signed (`term` has to be a proof of ``Ring_theory.get_sign``). See ``plugins/setoid_ring/InitialRing.v`` for examples of sign function. div :n:`@term` allows ``ring`` and ``ring_simplify`` to use monomials with coefficient other than 1 in the rewriting. The term :n:`@term` is a proof that a given division function satisfies the specification of an euclidean division function (:n:`@term` has to be a proof of ``Ring_theory.div_theory``). For example, this function is called when trying to rewrite :math:`7x` by :math:`2x = z` to tell that :math:`7 = 3 \times 2 + 1`. See ``plugins/setoid_ring/InitialRing.v`` for examples of div function. Error messages: .. exn:: Bad ring structure. The proof of the ring structure provided is not of the expected type. .. exn:: Bad lemma for decidability of equality. The equality function provided in the case of a computational ring has not the expected type. .. exn:: Ring operation should be declared as a morphism. A setoid associated to the carrier of the ring structure has been found, but the ring operation should be declared as morphism. See :ref:`tactics-enabled-on-user-provided-relations`. How does it work? ---------------------- The code of ring is a good example of tactic written using *reflection*. What is reflection? Basically, it is writing |Coq| tactics in |Coq|, rather than in |OCaml|. From the philosophical point of view, it is using the ability of the Calculus of Constructions to speak and reason about itself. For the ring tactic we used Coq as a programming language and also as a proof environment to build a tactic and to prove it correctness. The interested reader is strongly advised to have a look at the file ``Ring_polynom.v``. Here a type for polynomials is defined: .. coqtop:: in Inductive PExpr : Type := | PEc : C -> PExpr | PEX : positive -> PExpr | PEadd : PExpr -> PExpr -> PExpr | PEsub : PExpr -> PExpr -> PExpr | PEmul : PExpr -> PExpr -> PExpr | PEopp : PExpr -> PExpr | PEpow : PExpr -> N -> PExpr. Polynomials in normal form are defined as: .. coqtop:: in Inductive Pol : Type := | Pc : C -> Pol | Pinj : positive -> Pol -> Pol | PX : Pol -> positive -> Pol -> Pol. where ``Pinj n P`` denotes ``P`` in which :math:`V_i` is replaced by :math:`V_{i+n}` , and ``PX P n Q`` denotes :math:`P \otimes V_1^n \oplus Q'`, `Q'` being `Q` where :math:`V_i` is replaced by :math:`V_{i+1}`. Variables maps are represented by list of ring elements, and two interpretation functions, one that maps a variables map and a polynomial to an element of the concrete ring, and the second one that does the same for normal forms: .. coqtop:: in Definition PEeval : list R -> PExpr -> R := [...]. Definition Pphi_dev : list R -> Pol -> R := [...]. A function to normalize polynomials is defined, and the big theorem is its correctness w.r.t interpretation, that is: .. coqtop:: in Definition norm : PExpr -> Pol := [...]. Lemma Pphi_dev_ok : forall l pe npe, norm pe = npe -> PEeval l pe == Pphi_dev l npe. So now, what is the scheme for a normalization proof? Let p be the polynomial expression that the user wants to normalize. First a little piece of |ML| code guesses the type of `p`, the ring theory `T` to use, an abstract polynomial `ap` and a variables map `v` such that `p` is |bdi|- equivalent to ``(PEeval`` `v` `ap`\ ``)``. Then we replace it by ``(Pphi_dev`` `v` ``(norm`` `ap`\ ``))``, using the main correctness theorem and we reduce it to a concrete expression `p’`, which is the concrete normal form of `p`. This is summarized in this diagram: ========= ====== ==== `p` |ra| |re| \ |eq| \ `p’` |la| |le| ========= ====== ==== The user do not see the right part of the diagram. From outside, the tactic behaves like a |bdi| simplification extended with AC rewriting rules. Basically, the proof is only the application of the main correctness theorem to well-chosen arguments. Dealing with fields ------------------------ .. tacn:: field The ``field`` tactic is an extension of the ``ring`` to deal with rational expression. Given a rational expression :math:`F = 0`. It first reduces the expression `F` to a common denominator :math:`N/D = 0` where `N` and `D` are two ring expressions. For example, if we take :math:`F = (1 − 1/x) x − x + 1`, this gives :math:`N = (x − 1) x − x^2 + x` and :math:`D = x`. It then calls ring to solve :math:`N = 0`. Note that ``field`` also generates non-zero conditions for all the denominators it encounters in the reduction. In our example, it generates the condition :math:`x \neq 0`. These conditions appear as one subgoal which is a conjunction if there are several denominators. Non-zero conditions are always polynomial expressions. For example when reducing the expression :math:`1/(1 + 1/x)`, two side conditions are generated: :math:`x \neq 0` and :math:`x + 1 \neq 0`. Factorized expressions are broken since a field is an integral domain, and when the equality test on coefficients is complete w.r.t. the equality of the target field, constants can be proven different from zero automatically. The tactic must be loaded by ``Require Import Field``. New field structures can be declared to the system with the ``Add Field`` command (see below). The field of real numbers is defined in module ``RealField`` (in ``plugins/setoid_ring``). It is exported by module ``Rbase``, so that requiring ``Rbase`` or ``Reals`` is enough to use the field tactics on real numbers. Rational numbers in canonical form are also declared as a field in module ``Qcanon``. .. example:: .. coqtop:: all Require Import Reals. Open Scope R_scope. Goal forall x, x <> 0 -> (1 - 1 / x) * x - x + 1 = 0. intros; field; auto. Abort. Goal forall x y, y <> 0 -> y = x -> x / y = 1. intros x y H H1; field [H1]; auto. Abort. .. tacv:: field [{* @term}] decides the equality of two terms modulo field operations and the equalities defined by the :n:`@term`\ s. Each :n:`@term` has to be a proof of some equality `m` ``=`` `p`, where `m` is a monomial (after “abstraction”), `p` a polynomial and ``=`` the corresponding equality of the field structure. .. note:: rewriting works with the equality `m` ``=`` `p` only if `p` is a polynomial since rewriting is handled by the underlying ring tactic. .. tacv:: field_simplify performs the simplification in the conclusion of the goal, :math:`F_1 = F_2` becomes :math:`N_1 / D_1 = N_2 / D_2`. A normalization step (the same as the one for rings) is then applied to :math:`N_1`, :math:`D_1`, :math:`N_2` and :math:`D_2`. This way, polynomials remain in factorized form during the fraction simplifications. This yields smaller expressions when reducing to the same denominator since common factors can be canceled. .. tacv:: field_simplify [{* @term }] performs the simplification in the conclusion of the goal using the equalities defined by the :n:`@term`\ s. .. tacv:: field_simplify [{* @term }] {* @term } performs the simplification in the terms :n:`@terms` of the conclusion of the goal using the equalities defined by :n:`@term`\ s inside the brackets. .. tacv :: field_simplify in @ident performs the simplification in the assumption :n:`@ident`. .. tacv :: field_simplify [{* @term }] in @ident performs the simplification in the assumption :n:`@ident` using the equalities defined by the :n:`@term`\ s. .. tacv:: field_simplify [{* @term }] {* @term } in @ident performs the simplification in the :n:`@term`\ s of the assumption :n:`@ident` using the equalities defined by the :n:`@term`\ s inside the brackets. .. tacv:: field_simplify_eq performs the simplification in the conclusion of the goal removing the denominator. :math:`F_1 = F_2` becomes :math:`N_1 D_2 = N_2 D_1`. .. tacv:: field_simplify_eq [ {* @term }] performs the simplification in the conclusion of the goal using the equalities defined by :n:`@term`\ s. .. tacv:: field_simplify_eq in @ident performs the simplification in the assumption :n:`@ident`. .. tacv:: field_simplify_eq [{* @term}] in @ident performs the simplification in the assumption :n:`@ident` using the equalities defined by :n:`@terms`\ s and removing the denominator. Adding a new field structure --------------------------------- Declaring a new field consists in proving that a field signature (a carrier set, an equality, and field operations: ``Field_theory.field_theory`` and ``Field_theory.semi_field_theory``) satisfies the field axioms. Semi-fields (fields without + inverse) are also supported. The equality can be either Leibniz equality, or any relation declared as a setoid (see :ref:`tactics-enabled-on-user-provided-relations`). The definition of fields and semi-fields is: .. coqtop:: in Record field_theory : Prop := mk_field { F_R : ring_theory rO rI radd rmul rsub ropp req; F_1_neq_0 : ~ 1 == 0; Fdiv_def : forall p q, p / q == p * / q; Finv_l : forall p, ~ p == 0 -> / p * p == 1 }. Record semi_field_theory : Prop := mk_sfield { SF_SR : semi_ring_theory rO rI radd rmul req; SF_1_neq_0 : ~ 1 == 0; SFdiv_def : forall p q, p / q == p * / q; SFinv_l : forall p, ~ p == 0 -> / p * p == 1 }. The result of the normalization process is a fraction represented by the following type: .. coqtop:: in Record linear : Type := mk_linear { num : PExpr C; denum : PExpr C; condition : list (PExpr C) }. where ``num`` and ``denum`` are the numerator and denominator; ``condition`` is a list of expressions that have appeared as a denominator during the normalization process. These expressions must be proven different from zero for the correctness of the algorithm. The syntax for adding a new field is .. cmd:: Add Field @ident : @term {? ( @field_mod {* , @field_mod } )} The :n:`@ident` is not relevant. It is just used for error messages. :n:`@term` is a proof that the field signature satisfies the (semi-)field axioms. The optional list of modifiers is used to tailor the behavior of the tactic. .. productionlist:: coq field_mod : `ring_mod` | completeness `term` Since field tactics are built upon ``ring`` tactics, all modifiers of the ``Add Ring`` apply. There is only one specific modifier: completeness :n:`@term` allows the field tactic to prove automatically that the image of non-zero coefficients are mapped to non-zero elements of the field. :n:`@term` is a proof of ``forall x y, [x] == [y] -> x ?=! y = true``, which is the completeness of equality on coefficients w.r.t. the field equality. History of ring -------------------- First Samuel Boutin designed the tactic ``ACDSimpl``. This tactic did lot of rewriting. But the proofs terms generated by rewriting were too big for |Coq|’s type-checker. Let us see why: .. coqtop:: all Require Import ZArith. Open Scope Z_scope. Goal forall x y z : Z, x + 3 + y + y * z = x + 3 + y + z * y. intros; rewrite (Zmult_comm y z); reflexivity. Save foo. Print foo. At each step of rewriting, the whole context is duplicated in the proof term. Then, a tactic that does hundreds of rewriting generates huge proof terms. Since ``ACDSimpl`` was too slow, Samuel Boutin rewrote it using reflection (see :cite:`Bou97`). Later, it was rewritten by Patrick Loiseleur: the new tactic does not any more require ``ACDSimpl`` to compile and it makes use of |bdi|-reduction not only to replace the rewriting steps, but also to achieve the interleaving of computation and reasoning (see :ref:`discussion_reflection`). He also wrote a few |ML| code for the ``Add Ring`` command, that allow to register new rings dynamically. Proofs terms generated by ring are quite small, they are linear in the number of :math:`\oplus` and :math:`\otimes` operations in the normalized terms. Type-checking those terms requires some time because it makes a large use of the conversion rule, but memory requirements are much smaller. .. _discussion_reflection: Discussion ---------------- Efficiency is not the only motivation to use reflection here. ``ring`` also deals with constants, it rewrites for example the expression ``34 + 2 * x − x + 12`` to the expected result ``x + 46``. For the tactic ``ACDSimpl``, the only constants were 0 and 1. So the expression ``34 + 2 * (x − 1) + 12`` is interpreted as :math:`V_0 \oplus V_1 \otimes (V_2 \ominus 1) \oplus V_3`\ , with the variables mapping :math:`\{V_0 \mapsto 34; V_1 \mapsto 2; V_2 \mapsto x; V_3 \mapsto 12\}`\ . Then it is rewritten to ``34 − x + 2 * x + 12``, very far from the expected result. Here rewriting is not sufficient: you have to do some kind of reduction (some kind of computation) to achieve the normalization. The tactic ``ring`` is not only faster than a classical one: using reflection, we get for free integration of computation and reasoning that would be very complex to implement in the classic fashion. Is it the ultimate way to write tactics? The answer is: yes and no. The ``ring`` tactic uses intensively the conversion rule of |Cic|, that is replaces proof by computation the most as it is possible. It can be useful in all situations where a classical tactic generates huge proof terms. Symbolic Processing and Tautologies are in that case. But there are also tactics like ``auto`` or ``linear`` that do many complex computations, using side-effects and backtracking, and generate a small proof term. Clearly, it would be significantly less efficient to replace them by tactics using reflection. Another idea suggested by Benjamin Werner: reflection could be used to couple an external tool (a rewriting program or a model checker) with |Coq|. We define (in |Coq|) a type of terms, a type of *traces*, and prove a correction theorem that states that *replaying traces* is safe w.r.t some interpretation. Then we let the external tool do every computation (using side-effects, backtracking, exception, or others features that are not available in pure lambda calculus) to produce the trace: now we can check in |Coq| that the trace has the expected semantic by applying the correction lemma. .. rubric:: Footnotes .. [#f1] based on previous work from Patrick Loiseleur and Samuel Boutin