/*
Copyright (c) 2013 Microsoft Corporation. All rights reserved.
Released under Apache 2.0 license as described in the file LICENSE.

Author: Leonardo de Moura
*/
#include <algorithm>
#include "normalize.h"
#include "expr.h"
#include "context.h"
#include "environment.h"
#include "builtin.h"
#include "free_vars.h"
#include "list.h"
#include "buffer.h"
#include "trace.h"
#include "exception.h"

namespace lean {

class svalue;
typedef list<svalue> value_stack; //!< Normalization stack
enum class svalue_kind { Expr, Closure, BoundedVar };
/** \brief Stack value: simple expressions, closures and bounded variables. */
class svalue {
    svalue_kind m_kind;
    unsigned    m_bvar;
    expr        m_expr;
    value_stack m_ctx;
public:
    explicit svalue(expr const & e):              m_kind(svalue_kind::Expr), m_expr(e) {}
    explicit svalue(unsigned k):                  m_kind(svalue_kind::BoundedVar), m_bvar(k) {}
    svalue(expr const & e, value_stack const & c):m_kind(svalue_kind::Closure), m_expr(e), m_ctx(c) { lean_assert(is_lambda(e)); }

    svalue_kind kind() const { return m_kind; }

    bool is_expr() const        { return kind() == svalue_kind::Expr; }
    bool is_closure() const     { return kind() == svalue_kind::Closure; }
    bool is_bounded_var() const { return kind() == svalue_kind::BoundedVar; }

    expr  const & get_expr() const { lean_assert(is_expr() || is_closure()); return m_expr; }
    value_stack const & get_ctx()  const { lean_assert(is_closure());              return m_ctx; }
    unsigned get_var_idx()   const { lean_assert(is_bounded_var());          return m_bvar; }
};

svalue_kind         kind(svalue const & v)     { return v.kind(); }
expr const &        to_expr(svalue const & v)  { return v.get_expr(); }
value_stack const & stack_of(svalue const & v) { return v.get_ctx(); }
unsigned            to_bvar(svalue const & v)  { return v.get_var_idx(); }

value_stack extend(value_stack const & s, svalue const & v) { return cons(v, s); }

/** \brief Expression normalizer. */
class normalize_fn {
    environment const & m_env;
    context     const & m_ctx;

    svalue lookup(value_stack const & s, unsigned i, unsigned k) {
        unsigned j = i;
        value_stack const * it1 = &s;
        while (*it1) {
            if (j == 0)
                return head(*it1);
            --j;
            it1 = &tail(*it1);
        }
        context const & c = ::lean::lookup(m_ctx, j);
        if (c) {
            context_entry const & entry = head(c);
            if (entry.get_body())
                return svalue(::lean::normalize(entry.get_body(), m_env, tail(c)));
            else
                return svalue(length(c) - 1);
        }
        throw exception("unknown free variable");
    }

    /** \brief Convert the closure \c a into an expression using the given stack in a context that contains \c k binders. */
    expr reify_closure(expr const & a, value_stack const & s, unsigned k) {
        lean_assert(is_lambda(a));
        expr new_t = reify(normalize(abst_domain(a), s, k), k);
        expr new_b = reify(normalize(abst_body(a), extend(s, svalue(k)), k+1), k+1);
        return lambda(abst_name(a), new_t, new_b);
#if 0
        // Eta-reduction + Cumulativity + Set theoretic interpretation is unsound.
        // Example:
        //   f : (Type 2) -> (Type 2)
        //   (lambda (x : (Type 1)) (f x)) : (Type 1) -> (Type 2)
        // The domains of these two terms are different. So, they must have different denotations.
        // However, by eta-reduction, we have:
        //     (lambda (x : (Type 1)) (f x)) == f
        // For now, we will disable it.
        // REMARK: we can workaround this problem by applying only when the domain of f is equal
        // to the domain of the lambda abstraction.
        //
        if (is_app(new_b)) {
            // (lambda (x:T) (app f ... (var 0)))
            // check eta-rule applicability
            unsigned n = num_args(new_b);
            if (is_var(arg(new_b, n - 1), 0) &&
                std::all_of(begin_args(new_b),
                            end_args(new_b) - 1,
                            [](expr const & arg) { return !has_free_var(arg, 0); })) {
                if (n == 2)
                    return lower_free_vars(arg(new_b, 0), 1);
                else
                    return lower_free_vars(app(n - 1, begin_args(new_b)), 1);
            }
            return lambda(abst_name(a), new_t, new_b);
        } else {
            return lambda(abst_name(a), new_t, new_b);
        }
#endif
    }

    /** \brief Convert the value \c v back into an expression in a context that contains \c k binders. */
    expr reify(svalue const & v, unsigned k) {
        lean_trace("normalize", tout << "Reify kind: " << static_cast<unsigned>(v.kind()) << "\n";
                   if (v.is_bounded_var()) tout << "#" << to_bvar(v); else tout << to_expr(v); tout << "\n";);
        switch (v.kind()) {
        case svalue_kind::Expr:       return to_expr(v);
        case svalue_kind::BoundedVar: return var(k - to_bvar(v) - 1);
        case svalue_kind::Closure:    return reify_closure(to_expr(v), stack_of(v), k);
        }
        lean_unreachable();
        return expr();
    }

    /** \brief Normalize the expression \c a in a context composed of stack \c s and \c k binders. */
    svalue normalize(expr const & a, value_stack const & s, unsigned k) {
        lean_trace("normalize", tout << "Normalize, k: " << k << "\n" << a << "\n";);
        switch (a.kind()) {
        case expr_kind::Var:
            return lookup(s, var_idx(a), k);
        case expr_kind::Constant: {
            environment::object const & obj = m_env.get_object(const_name(a));
            if (is_definition(obj) && !to_definition(obj).is_opaque()) {
                return normalize(to_definition(obj).get_value(), value_stack(), 0);
            }
            else {
                return svalue(a);
            }
        }
        case expr_kind::Type: case expr_kind::Value:
            return svalue(a);
        case expr_kind::App: {
            svalue f    = normalize(arg(a, 0), s, k);
            unsigned i = 1;
            unsigned n = num_args(a);
            while (true) {
                if (f.is_closure()) {
                    // beta reduction
                    expr const & fv = to_expr(f);
                    lean_trace("normalize", tout << "beta reduction...\n" << fv << "\n";);
                    value_stack new_s = extend(stack_of(f), normalize(arg(a, i), s, k));
                    f = normalize(abst_body(fv), new_s, k);
                    if (i == n - 1)
                        return f;
                    i++;
                }
                else {
                    buffer<expr> new_args;
                    expr new_f = reify(f, k);
                    new_args.push_back(new_f);
                    for (; i < n; i++)
                        new_args.push_back(reify(normalize(arg(a, i), s, k), k));
                    if (is_value(new_f)) {
                        expr r;
                        if (to_value(new_f).normalize(new_args.size(), new_args.data(), r))
                            return svalue(r);
                    }
                    return svalue(app(new_args.size(), new_args.data()));
                }
            }
        }
        case expr_kind::Eq: {
            expr new_l = reify(normalize(eq_lhs(a), s, k), k);
            expr new_r = reify(normalize(eq_rhs(a), s, k), k);
            if (new_l == new_r) {
                return svalue(bool_value(true));
            } else if (is_value(new_l) && is_value(new_r)) {
                return svalue(bool_value(false));
            } else {
                return svalue(eq(new_l, new_r));
            }
        }
        case expr_kind::Lambda:
            return svalue(a, s);
        case expr_kind::Pi: {
            expr new_t = reify(normalize(abst_domain(a), s, k), k);
            expr new_b = reify(normalize(abst_body(a), extend(s, svalue(k)), k+1), k+1);
            return svalue(pi(abst_name(a), new_t, new_b));
        }
        case expr_kind::Let:
            return normalize(let_body(a), extend(s, normalize(let_value(a), s, k)), k+1);
        }
        lean_unreachable();
        return svalue(a);
    }

public:
    normalize_fn(environment const & env, context const & ctx):
        m_env(env),
        m_ctx(ctx) {
    }

    expr operator()(expr const & e) {
        unsigned k = length(m_ctx);
        return reify(normalize(e, value_stack(), k), k);
    }
};

expr normalize(expr const & e, environment const & env, context const & ctx) {
    return normalize_fn(env, ctx)(e);
}
}