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|
/********************* */
/*! \file arith_rewriter.cpp
** \verbatim
** Original author: Tim King
** Major contributors: Morgan Deters
** Minor contributors (to current version): Dejan Jovanovic
** This file is part of the CVC4 project.
** Copyright (c) 2009-2013 New York University and The University of Iowa
** See the file COPYING in the top-level source directory for licensing
** information.\endverbatim
**
** \brief [[ Add one-line brief description here ]]
**
** [[ Add lengthier description here ]]
** \todo document this file
**/
#include "theory/theory.h"
#include "theory/arith/normal_form.h"
#include "theory/arith/arith_rewriter.h"
#include "theory/arith/arith_utilities.h"
#include <vector>
#include <set>
#include <stack>
namespace CVC4 {
namespace theory {
namespace arith {
bool ArithRewriter::isAtom(TNode n) {
Kind k = n.getKind();
return arith::isRelationOperator(k) || k == kind::IS_INTEGER || k == kind::DIVISIBLE;
}
RewriteResponse ArithRewriter::rewriteConstant(TNode t){
Assert(t.isConst());
Assert(t.getKind() == kind::CONST_RATIONAL);
return RewriteResponse(REWRITE_DONE, t);
}
RewriteResponse ArithRewriter::rewriteVariable(TNode t){
Assert(t.isVar());
return RewriteResponse(REWRITE_DONE, t);
}
RewriteResponse ArithRewriter::rewriteMinus(TNode t, bool pre){
Assert(t.getKind()== kind::MINUS);
if(pre){
if(t[0] == t[1]){
Rational zero(0);
Node zeroNode = mkRationalNode(zero);
return RewriteResponse(REWRITE_DONE, zeroNode);
}else{
Node noMinus = makeSubtractionNode(t[0],t[1]);
return RewriteResponse(REWRITE_DONE, noMinus);
}
}else{
Polynomial minuend = Polynomial::parsePolynomial(t[0]);
Polynomial subtrahend = Polynomial::parsePolynomial(t[1]);
Polynomial diff = minuend - subtrahend;
return RewriteResponse(REWRITE_DONE, diff.getNode());
}
}
RewriteResponse ArithRewriter::rewriteUMinus(TNode t, bool pre){
Assert(t.getKind()== kind::UMINUS);
if(t[0].getKind() == kind::CONST_RATIONAL){
Rational neg = -(t[0].getConst<Rational>());
return RewriteResponse(REWRITE_DONE, mkRationalNode(neg));
}
Node noUminus = makeUnaryMinusNode(t[0]);
if(pre)
return RewriteResponse(REWRITE_DONE, noUminus);
else
return RewriteResponse(REWRITE_AGAIN, noUminus);
}
RewriteResponse ArithRewriter::preRewriteTerm(TNode t){
if(t.isConst()){
return rewriteConstant(t);
}else if(t.isVar()){
return rewriteVariable(t);
}else{
switch(Kind k = t.getKind()){
case kind::MINUS:
return rewriteMinus(t, true);
case kind::UMINUS:
return rewriteUMinus(t, true);
case kind::DIVISION:
case kind::DIVISION_TOTAL:
return rewriteDiv(t,true);
case kind::PLUS:
return preRewritePlus(t);
case kind::MULT:
return preRewriteMult(t);
case kind::INTS_DIVISION:
case kind::INTS_MODULUS:
return RewriteResponse(REWRITE_DONE, t);
case kind::INTS_DIVISION_TOTAL:
case kind::INTS_MODULUS_TOTAL:
return rewriteIntsDivModTotal(t,true);
case kind::ABS:
if(t[0].isConst()) {
const Rational& rat = t[0].getConst<Rational>();
if(rat >= 0) {
return RewriteResponse(REWRITE_DONE, t[0]);
} else {
return RewriteResponse(REWRITE_DONE,
NodeManager::currentNM()->mkConst(-rat));
}
}
return RewriteResponse(REWRITE_DONE, t);
case kind::IS_INTEGER:
case kind::TO_INTEGER:
return RewriteResponse(REWRITE_DONE, t);
case kind::TO_REAL:
return RewriteResponse(REWRITE_DONE, t[0]);
default:
Unhandled(k);
}
}
}
RewriteResponse ArithRewriter::postRewriteTerm(TNode t){
if(t.isConst()){
return rewriteConstant(t);
}else if(t.isVar()){
return rewriteVariable(t);
}else{
switch(t.getKind()){
case kind::MINUS:
return rewriteMinus(t, false);
case kind::UMINUS:
return rewriteUMinus(t, false);
case kind::DIVISION:
case kind::DIVISION_TOTAL:
return rewriteDiv(t, false);
case kind::PLUS:
return postRewritePlus(t);
case kind::MULT:
return postRewriteMult(t);
case kind::INTS_DIVISION:
case kind::INTS_MODULUS:
return RewriteResponse(REWRITE_DONE, t);
case kind::INTS_DIVISION_TOTAL:
case kind::INTS_MODULUS_TOTAL:
return rewriteIntsDivModTotal(t, false);
case kind::ABS:
if(t[0].isConst()) {
const Rational& rat = t[0].getConst<Rational>();
if(rat >= 0) {
return RewriteResponse(REWRITE_DONE, t[0]);
} else {
return RewriteResponse(REWRITE_DONE,
NodeManager::currentNM()->mkConst(-rat));
}
}
case kind::TO_REAL:
return RewriteResponse(REWRITE_DONE, t[0]);
case kind::TO_INTEGER:
if(t[0].isConst()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(Rational(t[0].getConst<Rational>().floor())));
}
if(t[0].getType().isInteger()) {
return RewriteResponse(REWRITE_DONE, t[0]);
}
//Unimplemented("TO_INTEGER, nonconstant");
//return rewriteToInteger(t);
return RewriteResponse(REWRITE_DONE, t);
case kind::IS_INTEGER:
if(t[0].isConst()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(t[0].getConst<Rational>().getDenominator() == 1));
}
if(t[0].getType().isInteger()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(true));
}
//Unimplemented("IS_INTEGER, nonconstant");
//return rewriteIsInteger(t);
return RewriteResponse(REWRITE_DONE, t);
default:
Unreachable();
}
}
}
RewriteResponse ArithRewriter::preRewriteMult(TNode t){
Assert(t.getKind()== kind::MULT);
// Rewrite multiplications with a 0 argument and to 0
Rational qZero(0);
for(TNode::iterator i = t.begin(); i != t.end(); ++i) {
if((*i).getKind() == kind::CONST_RATIONAL) {
if((*i).getConst<Rational>() == qZero) {
return RewriteResponse(REWRITE_DONE, mkRationalNode(qZero));
}
}
}
return RewriteResponse(REWRITE_DONE, t);
}
RewriteResponse ArithRewriter::preRewritePlus(TNode t){
Assert(t.getKind()== kind::PLUS);
return RewriteResponse(REWRITE_DONE, t);
}
RewriteResponse ArithRewriter::postRewritePlus(TNode t){
Assert(t.getKind()== kind::PLUS);
Polynomial res = Polynomial::mkZero();
for(TNode::iterator i = t.begin(), end = t.end(); i != end; ++i){
Node curr = *i;
Polynomial currPoly = Polynomial::parsePolynomial(curr);
res = res + currPoly;
}
return RewriteResponse(REWRITE_DONE, res.getNode());
}
RewriteResponse ArithRewriter::postRewriteMult(TNode t){
Assert(t.getKind()== kind::MULT);
Polynomial res = Polynomial::mkOne();
for(TNode::iterator i = t.begin(), end = t.end(); i != end; ++i){
Node curr = *i;
Polynomial currPoly = Polynomial::parsePolynomial(curr);
res = res * currPoly;
}
return RewriteResponse(REWRITE_DONE, res.getNode());
}
RewriteResponse ArithRewriter::postRewriteAtom(TNode atom){
if(atom.getKind() == kind::IS_INTEGER) {
if(atom[0].isConst()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(atom[0].getConst<Rational>().isIntegral()));
}
if(atom[0].getType().isInteger()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(true));
}
// not supported, but this isn't the right place to complain
return RewriteResponse(REWRITE_DONE, atom);
} else if(atom.getKind() == kind::DIVISIBLE) {
if(atom[0].isConst()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(bool((atom[0].getConst<Rational>() / atom.getOperator().getConst<Divisible>().k).isIntegral())));
}
if(atom.getOperator().getConst<Divisible>().k.isOne()) {
return RewriteResponse(REWRITE_DONE, NodeManager::currentNM()->mkConst(true));
}
return RewriteResponse(REWRITE_AGAIN, NodeManager::currentNM()->mkNode(kind::EQUAL, NodeManager::currentNM()->mkNode(kind::INTS_MODULUS_TOTAL, atom[0], NodeManager::currentNM()->mkConst(Rational(atom.getOperator().getConst<Divisible>().k))), NodeManager::currentNM()->mkConst(Rational(0))));
}
// left |><| right
TNode left = atom[0];
TNode right = atom[1];
Polynomial pleft = Polynomial::parsePolynomial(left);
Polynomial pright = Polynomial::parsePolynomial(right);
Comparison cmp = Comparison::mkComparison(atom.getKind(), pleft, pright);
Assert(cmp.isNormalForm());
return RewriteResponse(REWRITE_DONE, cmp.getNode());
}
RewriteResponse ArithRewriter::preRewriteAtom(TNode atom){
Assert(isAtom(atom));
NodeManager* currNM = NodeManager::currentNM();
if(atom.getKind() == kind::EQUAL) {
if(atom[0] == atom[1]) {
return RewriteResponse(REWRITE_DONE, currNM->mkConst(true));
}
}else if(atom.getKind() == kind::GT){
Node leq = currNM->mkNode(kind::LEQ, atom[0], atom[1]);
return RewriteResponse(REWRITE_DONE, currNM->mkNode(kind::NOT, leq));
}else if(atom.getKind() == kind::LT){
Node geq = currNM->mkNode(kind::GEQ, atom[0], atom[1]);
return RewriteResponse(REWRITE_DONE, currNM->mkNode(kind::NOT, geq));
}else if(atom.getKind() == kind::IS_INTEGER){
if(atom[0].getType().isInteger()){
return RewriteResponse(REWRITE_DONE, currNM->mkConst(true));
}
}else if(atom.getKind() == kind::DIVISIBLE){
if(atom.getOperator().getConst<Divisible>().k.isOne()){
return RewriteResponse(REWRITE_DONE, currNM->mkConst(true));
}
}
return RewriteResponse(REWRITE_DONE, atom);
}
RewriteResponse ArithRewriter::postRewrite(TNode t){
if(isTerm(t)){
RewriteResponse response = postRewriteTerm(t);
if(Debug.isOn("arith::rewriter") && response.status == REWRITE_DONE) {
Polynomial::parsePolynomial(response.node);
}
return response;
}else if(isAtom(t)){
RewriteResponse response = postRewriteAtom(t);
if(Debug.isOn("arith::rewriter") && response.status == REWRITE_DONE) {
Comparison::parseNormalForm(response.node);
}
return response;
}else{
Unreachable();
return RewriteResponse(REWRITE_DONE, Node::null());
}
}
RewriteResponse ArithRewriter::preRewrite(TNode t){
if(isTerm(t)){
return preRewriteTerm(t);
}else if(isAtom(t)){
return preRewriteAtom(t);
}else{
Unreachable();
return RewriteResponse(REWRITE_DONE, Node::null());
}
}
Node ArithRewriter::makeUnaryMinusNode(TNode n){
Rational qNegOne(-1);
return NodeManager::currentNM()->mkNode(kind::MULT, mkRationalNode(qNegOne),n);
}
Node ArithRewriter::makeSubtractionNode(TNode l, TNode r){
Node negR = makeUnaryMinusNode(r);
Node diff = NodeManager::currentNM()->mkNode(kind::PLUS, l, negR);
return diff;
}
RewriteResponse ArithRewriter::rewriteDiv(TNode t, bool pre){
Assert(t.getKind() == kind::DIVISION_TOTAL || t.getKind()== kind::DIVISION);
Node left = t[0];
Node right = t[1];
if(right.getKind() == kind::CONST_RATIONAL){
const Rational& den = right.getConst<Rational>();
if(den.isZero()){
if(t.getKind() == kind::DIVISION_TOTAL){
return RewriteResponse(REWRITE_DONE, mkRationalNode(0));
}else{
// This is unsupported, but this is not a good place to complain
return RewriteResponse(REWRITE_DONE, t);
}
}
Assert(den != Rational(0));
if(left.getKind() == kind::CONST_RATIONAL){
const Rational& num = left.getConst<Rational>();
Rational div = num / den;
Node result = mkRationalNode(div);
return RewriteResponse(REWRITE_DONE, result);
}
Rational div = den.inverse();
Node result = mkRationalNode(div);
Node mult = NodeManager::currentNM()->mkNode(kind::MULT,left,result);
if(pre){
return RewriteResponse(REWRITE_DONE, mult);
}else{
return RewriteResponse(REWRITE_AGAIN, mult);
}
}else{
return RewriteResponse(REWRITE_DONE, t);
}
}
RewriteResponse ArithRewriter::rewriteIntsDivModTotal(TNode t, bool pre){
Kind k = t.getKind();
// Assert(k == kind::INTS_MODULUS || k == kind::INTS_MODULUS_TOTAL ||
// k == kind::INTS_DIVISION || k == kind::INTS_DIVISION_TOTAL);
//Leaving the function as before (INTS_MODULUS can be handled),
// but restricting its use here
Assert(k == kind::INTS_MODULUS_TOTAL || k == kind::INTS_DIVISION_TOTAL);
TNode n = t[0], d = t[1];
bool dIsConstant = d.getKind() == kind::CONST_RATIONAL;
if(dIsConstant && d.getConst<Rational>().isZero()){
if(k == kind::INTS_MODULUS_TOTAL || k == kind::INTS_DIVISION_TOTAL){
return RewriteResponse(REWRITE_DONE, mkRationalNode(0));
}else{
// Do nothing for k == INTS_MODULUS
return RewriteResponse(REWRITE_DONE, t);
}
}else if(dIsConstant && d.getConst<Rational>().isOne()){
if(k == kind::INTS_MODULUS || k == kind::INTS_MODULUS_TOTAL){
return RewriteResponse(REWRITE_DONE, mkRationalNode(0));
}else{
Assert(k == kind::INTS_DIVISION || k == kind::INTS_DIVISION_TOTAL);
return RewriteResponse(REWRITE_AGAIN, n);
}
}else if(dIsConstant && d.getConst<Rational>().isNegativeOne()){
if(k == kind::INTS_MODULUS || k == kind::INTS_MODULUS_TOTAL){
return RewriteResponse(REWRITE_DONE, mkRationalNode(0));
}else{
Assert(k == kind::INTS_DIVISION || k == kind::INTS_DIVISION_TOTAL);
return RewriteResponse(REWRITE_AGAIN, NodeManager::currentNM()->mkNode(kind::UMINUS, n));
}
}else if(dIsConstant && n.getKind() == kind::CONST_RATIONAL){
Assert(d.getConst<Rational>().isIntegral());
Assert(n.getConst<Rational>().isIntegral());
Assert(!d.getConst<Rational>().isZero());
Integer di = d.getConst<Rational>().getNumerator();
Integer ni = n.getConst<Rational>().getNumerator();
bool isDiv = (k == kind::INTS_DIVISION || k == kind::INTS_DIVISION_TOTAL);
Integer result = isDiv ? ni.euclidianDivideQuotient(di) : ni.euclidianDivideRemainder(di);
Node resultNode = mkRationalNode(Rational(result));
return RewriteResponse(REWRITE_DONE, resultNode);
}else{
return RewriteResponse(REWRITE_DONE, t);
}
}
}/* CVC4::theory::arith namespace */
}/* CVC4::theory namespace */
}/* CVC4 namespace */
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