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simple-squiggle/node_modules/mathjs/lib/cjs/function/algebra/simplify.js

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feat: Proof of concept of simple squiggle
2022-04-15 01:48:30 +00:00
"use strict";
var _interopRequireDefault = require("@babel/runtime/helpers/interopRequireDefault");
Object.defineProperty(exports, "__esModule", {
value: true
});
exports.createSimplify = void 0;
var _typeof2 = _interopRequireDefault(require("@babel/runtime/helpers/typeof"));
var _is = require("../../utils/is.js");
var _factory = require("../../utils/factory.js");
var _util = require("./simplify/util.js");
var _simplifyConstant = require("./simplify/simplifyConstant.js");
var _object = require("../../utils/object.js");
var _map = require("../../utils/map.js");
var name = 'simplify';
var dependencies = ['config', 'typed', 'parse', 'add', 'subtract', 'multiply', 'divide', 'pow', 'isZero', 'equal', 'resolve', 'simplifyCore', '?fraction', '?bignumber', 'mathWithTransform', 'matrix', 'AccessorNode', 'ArrayNode', 'ConstantNode', 'FunctionNode', 'IndexNode', 'ObjectNode', 'OperatorNode', 'ParenthesisNode', 'SymbolNode'];
var createSimplify = /* #__PURE__ */(0, _factory.factory)(name, dependencies, function (_ref) {
var config = _ref.config,
typed = _ref.typed,
parse = _ref.parse,
add = _ref.add,
subtract = _ref.subtract,
multiply = _ref.multiply,
divide = _ref.divide,
pow = _ref.pow,
isZero = _ref.isZero,
equal = _ref.equal,
resolve = _ref.resolve,
simplifyCore = _ref.simplifyCore,
fraction = _ref.fraction,
bignumber = _ref.bignumber,
mathWithTransform = _ref.mathWithTransform,
matrix = _ref.matrix,
AccessorNode = _ref.AccessorNode,
ArrayNode = _ref.ArrayNode,
ConstantNode = _ref.ConstantNode,
FunctionNode = _ref.FunctionNode,
IndexNode = _ref.IndexNode,
ObjectNode = _ref.ObjectNode,
OperatorNode = _ref.OperatorNode,
ParenthesisNode = _ref.ParenthesisNode,
SymbolNode = _ref.SymbolNode;
var simplifyConstant = (0, _simplifyConstant.createSimplifyConstant)({
typed: typed,
config: config,
mathWithTransform: mathWithTransform,
matrix: matrix,
fraction: fraction,
bignumber: bignumber,
AccessorNode: AccessorNode,
ArrayNode: ArrayNode,
ConstantNode: ConstantNode,
FunctionNode: FunctionNode,
IndexNode: IndexNode,
ObjectNode: ObjectNode,
OperatorNode: OperatorNode,
SymbolNode: SymbolNode
});
var _createUtil = (0, _util.createUtil)({
FunctionNode: FunctionNode,
OperatorNode: OperatorNode,
SymbolNode: SymbolNode
}),
hasProperty = _createUtil.hasProperty,
isCommutative = _createUtil.isCommutative,
isAssociative = _createUtil.isAssociative,
mergeContext = _createUtil.mergeContext,
flatten = _createUtil.flatten,
unflattenr = _createUtil.unflattenr,
unflattenl = _createUtil.unflattenl,
createMakeNodeFunction = _createUtil.createMakeNodeFunction,
defaultContext = _createUtil.defaultContext,
realContext = _createUtil.realContext,
positiveContext = _createUtil.positiveContext;
/**
* Simplify an expression tree.
*
* A list of rules are applied to an expression, repeating over the list until
* no further changes are made.
* It's possible to pass a custom set of rules to the function as second
* argument. A rule can be specified as an object, string, or function:
*
* const rules = [
* { l: 'n1*n3 + n2*n3', r: '(n1+n2)*n3' },
* 'n1*n3 + n2*n3 -> (n1+n2)*n3',
* function (node) {
* // ... return a new node or return the node unchanged
* return node
* }
* ]
*
* String and object rules consist of a left and right pattern. The left is
* used to match against the expression and the right determines what matches
* are replaced with. The main difference between a pattern and a normal
* expression is that variables starting with the following characters are
* interpreted as wildcards:
*
* - 'n' - matches any Node
* - 'c' - matches any ConstantNode
* - 'v' - matches any Node that is not a ConstantNode
*
* The default list of rules is exposed on the function as `simplify.rules`
* and can be used as a basis to built a set of custom rules.
*
* To specify a rule as a string, separate the left and right pattern by '->'
* When specifying a rule as an object, the following keys are meaningful:
* - l - the left pattern
* - r - the right pattern
* - s - in lieu of l and r, the string form that is broken at -> to give them
* - repeat - whether to repeat this rule until the expression stabilizes
* - assuming - gives a context object, as in the 'context' option to
* simplify. Every property in the context object must match the current
* context in order, or else the rule will not be applied.
* - imposeContext - gives a context object, as in the 'context' option to
* simplify. Any settings specified will override the incoming context
* for all matches of this rule.
*
* For more details on the theory, see:
*
* - [Strategies for simplifying math expressions (Stackoverflow)](https://stackoverflow.com/questions/7540227/strategies-for-simplifying-math-expressions)
* - [Symbolic computation - Simplification (Wikipedia)](https://en.wikipedia.org/wiki/Symbolic_computation#Simplification)
*
* An optional `options` argument can be passed as last argument of `simplify`.
* Currently available options (defaults in parentheses):
* - `consoleDebug` (false): whether to write the expression being simplified
* and any changes to it, along with the rule responsible, to console
* - `context` (simplify.defaultContext): an object giving properties of
* each operator, which determine what simplifications are allowed. The
* currently meaningful properties are commutative, associative,
* total (whether the operation is defined for all arguments), and
* trivial (whether the operation applied to a single argument leaves
* that argument unchanged). The default context is very permissive and
* allows almost all simplifications. Only properties differing from
* the default need to be specified; the default context is used as a
* fallback. Additional contexts `simplify.realContext` and
* `simplify.positiveContext` are supplied to cause simplify to perform
* just simplifications guaranteed to preserve all values of the expression
* assuming all variables and subexpressions are real numbers or
* positive real numbers, respectively. (Note that these are in some cases
* more restrictive than the default context; for example, the default
* context will allow `x/x` to simplify to 1, whereas
* `simplify.realContext` will not, as `0/0` is not equal to 1.)
* - `exactFractions` (true): whether to try to convert all constants to
* exact rational numbers.
* - `fractionsLimit` (10000): when `exactFractions` is true, constants will
* be expressed as fractions only when both numerator and denominator
* are smaller than `fractionsLimit`.
*
* Syntax:
*
* simplify(expr)
* simplify(expr, rules)
* simplify(expr, rules)
* simplify(expr, rules, scope)
* simplify(expr, rules, scope, options)
* simplify(expr, scope)
* simplify(expr, scope, options)
*
* Examples:
*
* math.simplify('2 * 1 * x ^ (2 - 1)') // Node "2 * x"
* math.simplify('2 * 3 * x', {x: 4}) // Node "24"
* const f = math.parse('2 * 1 * x ^ (2 - 1)')
* math.simplify(f) // Node "2 * x"
* math.simplify('0.4 * x', {}, {exactFractions: true}) // Node "x * 2 / 5"
* math.simplify('0.4 * x', {}, {exactFractions: false}) // Node "0.4 * x"
*
* See also:
*
* simplifyCore, derivative, evaluate, parse, rationalize, resolve
*
* @param {Node | string} expr
* The expression to be simplified
* @param {Array<{l:string, r: string} | string | function>} [rules]
* Optional list with custom rules
* @return {Node} Returns the simplified form of `expr`
*/
var simplify = typed('simplify', {
string: function string(expr) {
return this(parse(expr), this.rules, (0, _map.createEmptyMap)(), {});
},
'string, Map | Object': function stringMapObject(expr, scope) {
return this(parse(expr), this.rules, scope, {});
},
'string, Map | Object, Object': function stringMapObjectObject(expr, scope, options) {
return this(parse(expr), this.rules, scope, options);
},
'string, Array': function stringArray(expr, rules) {
return this(parse(expr), rules, (0, _map.createEmptyMap)(), {});
},
'string, Array, Map | Object': function stringArrayMapObject(expr, rules, scope) {
return this(parse(expr), rules, scope, {});
},
'string, Array, Map | Object, Object': function stringArrayMapObjectObject(expr, rules, scope, options) {
return this(parse(expr), rules, scope, options);
},
'Node, Map | Object': function NodeMapObject(expr, scope) {
return this(expr, this.rules, scope, {});
},
'Node, Map | Object, Object': function NodeMapObjectObject(expr, scope, options) {
return this(expr, this.rules, scope, options);
},
Node: function Node(expr) {
return this(expr, this.rules, (0, _map.createEmptyMap)(), {});
},
'Node, Array': function NodeArray(expr, rules) {
return this(expr, rules, (0, _map.createEmptyMap)(), {});
},
'Node, Array, Map | Object': function NodeArrayMapObject(expr, rules, scope) {
return this(expr, rules, scope, {});
},
'Node, Array, Object, Object': function NodeArrayObjectObject(expr, rules, scope, options) {
return this(expr, rules, (0, _map.createMap)(scope), options);
},
'Node, Array, Map, Object': function NodeArrayMapObject(expr, rules, scope, options) {
var debug = options.consoleDebug;
rules = _buildRules(rules, options.context);
var res = resolve(expr, scope);
res = removeParens(res);
var visited = {};
var str = res.toString({
parenthesis: 'all'
});
while (!visited[str]) {
visited[str] = true;
_lastsym = 0; // counter for placeholder symbols
var laststr = str;
if (debug) console.log('Working on: ', str);
for (var i = 0; i < rules.length; i++) {
var rulestr = '';
if (typeof rules[i] === 'function') {
res = rules[i](res, options);
if (debug) rulestr = rules[i].name;
} else {
flatten(res, options.context);
res = applyRule(res, rules[i], options.context);
if (debug) {
rulestr = "".concat(rules[i].l.toString(), " -> ").concat(rules[i].r.toString());
}
}
if (debug) {
var newstr = res.toString({
parenthesis: 'all'
});
if (newstr !== laststr) {
console.log('Applying', rulestr, 'produced', newstr);
laststr = newstr;
}
}
/* Use left-heavy binary tree internally,
* since custom rule functions may expect it
*/
unflattenl(res, options.context);
}
str = res.toString({
parenthesis: 'all'
});
}
return res;
}
});
simplify.defaultContext = defaultContext;
simplify.realContext = realContext;
simplify.positiveContext = positiveContext;
function removeParens(node) {
return node.transform(function (node, path, parent) {
return (0, _is.isParenthesisNode)(node) ? removeParens(node.content) : node;
});
} // All constants that are allowed in rules
var SUPPORTED_CONSTANTS = {
true: true,
false: true,
e: true,
i: true,
Infinity: true,
LN2: true,
LN10: true,
LOG2E: true,
LOG10E: true,
NaN: true,
phi: true,
pi: true,
SQRT1_2: true,
SQRT2: true,
tau: true // null: false,
// undefined: false,
// version: false,
}; // Array of strings, used to build the ruleSet.
// Each l (left side) and r (right side) are parsed by
// the expression parser into a node tree.
// Left hand sides are matched to subtrees within the
// expression to be parsed and replaced with the right
// hand side.
// TODO: Add support for constraints on constants (either in the form of a '=' expression or a callback [callback allows things like comparing symbols alphabetically])
// To evaluate lhs constants for rhs constants, use: { l: 'c1+c2', r: 'c3', evaluate: 'c3 = c1 + c2' }. Multiple assignments are separated by ';' in block format.
// It is possible to get into an infinite loop with conflicting rules
simplify.rules = [simplifyCore, // { l: 'n+0', r: 'n' }, // simplifyCore
// { l: 'n^0', r: '1' }, // simplifyCore
// { l: '0*n', r: '0' }, // simplifyCore
// { l: 'n/n', r: '1'}, // simplifyCore
// { l: 'n^1', r: 'n' }, // simplifyCore
// { l: '+n1', r:'n1' }, // simplifyCore
// { l: 'n--n1', r:'n+n1' }, // simplifyCore
{
l: 'log(e)',
r: '1'
}, // temporary rules
// Note initially we tend constants to the right because like-term
// collection prefers the left, and we would rather collect nonconstants
{
s: 'n-n1 -> n+-n1',
// temporarily replace 'subtract' so we can further flatten the 'add' operator
assuming: {
subtract: {
total: true
}
}
}, {
s: 'n-n -> 0',
// partial alternative when we can't always subtract
assuming: {
subtract: {
total: false
}
}
}, {
s: '-(c*v) -> v * (-c)',
// make non-constant terms positive
assuming: {
multiply: {
commutative: true
},
subtract: {
total: true
}
}
}, {
s: '-(c*v) -> (-c) * v',
// non-commutative version, part 1
assuming: {
multiply: {
commutative: false
},
subtract: {
total: true
}
}
}, {
s: '-(v*c) -> v * (-c)',
// non-commutative version, part 2
assuming: {
multiply: {
commutative: false
},
subtract: {
total: true
}
}
}, {
l: '-(n1/n2)',
r: '-n1/n2'
}, {
l: '-v',
r: 'v * (-1)'
}, // finish making non-constant terms positive
{
l: '(n1 + n2)*(-1)',
r: 'n1*(-1) + n2*(-1)',
repeat: true
}, // expand negations to achieve as much sign cancellation as possible
{
l: 'n/n1^n2',
r: 'n*n1^-n2'
}, // temporarily replace 'divide' so we can further flatten the 'multiply' operator
{
l: 'n/n1',
r: 'n*n1^-1'
}, {
s: '(n1*n2)^n3 -> n1^n3 * n2^n3',
assuming: {
multiply: {
commutative: true
}
}
}, {
s: '(n1*n2)^(-1) -> n2^(-1) * n1^(-1)',
assuming: {
multiply: {
commutative: false
}
}
}, // expand nested exponentiation
{
s: '(n ^ n1) ^ n2 -> n ^ (n1 * n2)',
assuming: {
divide: {
total: true
}
} // 1/(1/n) = n needs 1/n to exist
}, // collect like factors; into a sum, only do this for nonconstants
{
l: ' v * ( v * n1 + n2)',
r: 'v^2 * n1 + v * n2'
}, {
s: ' v * (v^n4 * n1 + n2) -> v^(1+n4) * n1 + v * n2',
assuming: {
divide: {
total: true
}
} // v*1/v = v^(1+-1) needs 1/v
}, {
s: 'v^n3 * ( v * n1 + n2) -> v^(n3+1) * n1 + v^n3 * n2',
assuming: {
divide: {
total: true
}
}
}, {
s: 'v^n3 * (v^n4 * n1 + n2) -> v^(n3+n4) * n1 + v^n3 * n2',
assuming: {
divide: {
total: true
}
}
}, {
l: 'n*n',
r: 'n^2'
}, {
s: 'n * n^n1 -> n^(n1+1)',
assuming: {
divide: {
total: true
}
} // n*1/n = n^(-1+1) needs 1/n
}, {
s: 'n^n1 * n^n2 -> n^(n1+n2)',
assuming: {
divide: {
total: true
}
} // ditto for n^2*1/n^2
}, // Unfortunately, to deal with more complicated cancellations, it
// becomes necessary to simplify constants twice per pass. It's not
// terribly expensive compared to matching rules, so this should not
// pose a performance problem.
simplifyConstant, // First: before collecting like terms
// collect like terms
{
s: 'n+n -> 2*n',
assuming: {
add: {
total: true
}
} // 2 = 1 + 1 needs to exist
}, {
l: 'n+-n',
r: '0'
}, {
l: 'v*n + v',
r: 'v*(n+1)'
}, // NOTE: leftmost position is special:
{
l: 'n3*n1 + n3*n2',
r: 'n3*(n1+n2)'
}, // All sub-monomials tried there.
{
l: 'n3^(-n4)*n1 + n3 * n2',
r: 'n3^(-n4)*(n1 + n3^(n4+1) *n2)'
}, {
l: 'n3^(-n4)*n1 + n3^n5 * n2',
r: 'n3^(-n4)*(n1 + n3^(n4+n5)*n2)'
}, {
s: 'n*v + v -> (n+1)*v',
// noncommutative additional cases
assuming: {
multiply: {
commutative: false
}
}
}, {
s: 'n1*n3 + n2*n3 -> (n1+n2)*n3',
assuming: {
multiply: {
commutative: false
}
}
}, {
s: 'n1*n3^(-n4) + n2 * n3 -> (n1 + n2*n3^(n4 + 1))*n3^(-n4)',
assuming: {
multiply: {
commutative: false
}
}
}, {
s: 'n1*n3^(-n4) + n2 * n3^n5 -> (n1 + n2*n3^(n4 + n5))*n3^(-n4)',
assuming: {
multiply: {
commutative: false
}
}
}, {
l: 'n*c + c',
r: '(n+1)*c'
}, {
s: 'c*n + c -> c*(n+1)',
assuming: {
multiply: {
commutative: false
}
}
}, simplifyConstant, // Second: before returning expressions to "standard form"
// make factors positive (and undo 'make non-constant terms positive')
{
s: '(-n)*n1 -> -(n*n1)',
assuming: {
subtract: {
total: true
}
}
}, {
s: 'n1*(-n) -> -(n1*n)',
// in case * non-commutative
assuming: {
subtract: {
total: true
},
multiply: {
commutative: false
}
}
}, // final ordering of constants
{
s: 'c+v -> v+c',
assuming: {
add: {
commutative: true
}
},
imposeContext: {
add: {
commutative: false
}
}
}, {
s: 'v*c -> c*v',
assuming: {
multiply: {
commutative: true
}
},
imposeContext: {
multiply: {
commutative: false
}
}
}, // undo temporary rules
// { l: '(-1) * n', r: '-n' }, // #811 added test which proved this is redundant
{
l: 'n+-n1',
r: 'n-n1'
}, // undo replace 'subtract'
{
s: 'n*(n1^-1) -> n/n1',
// undo replace 'divide'; for * commutative
assuming: {
multiply: {
commutative: true
}
} // o.w. / not conventional
}, {
s: 'n*n1^-n2 -> n/n1^n2',
assuming: {
multiply: {
commutative: true
}
} // o.w. / not conventional
}, {
s: 'n^-1 -> 1/n',
assuming: {
multiply: {
commutative: true
}
} // o.w. / not conventional
}, {
l: 'n^1',
r: 'n'
}, // can be produced by power cancellation
{
s: 'n*(n1/n2) -> (n*n1)/n2',
// '*' before '/'
assuming: {
multiply: {
associative: true
}
}
}, {
s: 'n-(n1+n2) -> n-n1-n2',
// '-' before '+'
assuming: {
addition: {
associative: true,
commutative: true
}
}
}, // { l: '(n1/n2)/n3', r: 'n1/(n2*n3)' },
// { l: '(n*n1)/(n*n2)', r: 'n1/n2' },
// simplifyConstant can leave an extra factor of 1, which can always
// be eliminated, since the identity always commutes
{
l: '1*n',
r: 'n',
imposeContext: {
multiply: {
commutative: true
}
}
}, {
s: 'n1/(n2/n3) -> (n1*n3)/n2',
assuming: {
multiply: {
associative: true
}
}
}, {
l: 'n1/(-n2)',
r: '-n1/n2'
}];
/**
* Takes any rule object as allowed by the specification in simplify
* and puts it in a standard form used by applyRule
*/
function _canonicalizeRule(ruleObject, context) {
var newRule = {};
if (ruleObject.s) {
var lr = ruleObject.s.split('->');
if (lr.length === 2) {
newRule.l = lr[0];
newRule.r = lr[1];
} else {
throw SyntaxError('Could not parse rule: ' + ruleObject.s);
}
} else {
newRule.l = ruleObject.l;
newRule.r = ruleObject.r;
}
newRule.l = removeParens(parse(newRule.l));
newRule.r = removeParens(parse(newRule.r));
for (var _i = 0, _arr = ['imposeContext', 'repeat', 'assuming']; _i < _arr.length; _i++) {
var prop = _arr[_i];
if (prop in ruleObject) {
newRule[prop] = ruleObject[prop];
}
}
if (ruleObject.evaluate) {
newRule.evaluate = parse(ruleObject.evaluate);
}
if (isAssociative(newRule.l, context)) {
var makeNode = createMakeNodeFunction(newRule.l);
var expandsym = _getExpandPlaceholderSymbol();
newRule.expanded = {};
newRule.expanded.l = makeNode([newRule.l.clone(), expandsym]); // Push the expandsym into the deepest possible branch.
// This helps to match the newRule against nodes returned from getSplits() later on.
flatten(newRule.expanded.l, context);
unflattenr(newRule.expanded.l, context);
newRule.expanded.r = makeNode([newRule.r, expandsym]);
}
return newRule;
}
/**
* Parse the string array of rules into nodes
*
* Example syntax for rules:
*
* Position constants to the left in a product:
* { l: 'n1 * c1', r: 'c1 * n1' }
* n1 is any Node, and c1 is a ConstantNode.
*
* Apply difference of squares formula:
* { l: '(n1 - n2) * (n1 + n2)', r: 'n1^2 - n2^2' }
* n1, n2 mean any Node.
*
* Short hand notation:
* 'n1 * c1 -> c1 * n1'
*/
function _buildRules(rules, context) {
// Array of rules to be used to simplify expressions
var ruleSet = [];
for (var i = 0; i < rules.length; i++) {
var rule = rules[i];
var newRule = void 0;
var ruleType = (0, _typeof2.default)(rule);
switch (ruleType) {
case 'string':
rule = {
s: rule
};
/* falls through */
case 'object':
newRule = _canonicalizeRule(rule, context);
break;
case 'function':
newRule = rule;
break;
default:
throw TypeError('Unsupported type of rule: ' + ruleType);
} // console.log('Adding rule: ' + rules[i])
// console.log(newRule)
ruleSet.push(newRule);
}
return ruleSet;
}
var _lastsym = 0;
function _getExpandPlaceholderSymbol() {
return new SymbolNode('_p' + _lastsym++);
}
function mapRule(nodes, rule, context) {
var resNodes = nodes;
if (nodes) {
for (var i = 0; i < nodes.length; ++i) {
var newNode = applyRule(nodes[i], rule, context);
if (newNode !== nodes[i]) {
if (resNodes === nodes) {
resNodes = nodes.slice();
}
resNodes[i] = newNode;
}
}
}
return resNodes;
}
/**
* Returns a simplfied form of node, or the original node if no simplification was possible.
*
* @param {ConstantNode | SymbolNode | ParenthesisNode | FunctionNode | OperatorNode} node
* @param {Object | Function} rule
* @param {Object} context -- information about assumed properties of operators
* @return {ConstantNode | SymbolNode | ParenthesisNode | FunctionNode | OperatorNode} The simplified form of `expr`, or the original node if no simplification was possible.
*/
function applyRule(node, rule, context) {
// console.log('Entering applyRule("', rule.l.toString({parenthesis:'all'}), '->', rule.r.toString({parenthesis:'all'}), '",', node.toString({parenthesis:'all'}),')')
// check that the assumptions for this rule are satisfied by the current
// context:
if (rule.assuming) {
for (var symbol in rule.assuming) {
for (var property in rule.assuming[symbol]) {
if (hasProperty(symbol, property, context) !== rule.assuming[symbol][property]) {
return node;
}
}
}
}
var mergedContext = mergeContext(rule.imposeContext, context); // Do not clone node unless we find a match
var res = node; // First replace our child nodes with their simplified versions
// If a child could not be simplified, applying the rule to it
// will have no effect since the node is returned unchanged
if (res instanceof OperatorNode || res instanceof FunctionNode) {
var newArgs = mapRule(res.args, rule, context);
if (newArgs !== res.args) {
res = res.clone();
res.args = newArgs;
}
} else if (res instanceof ParenthesisNode) {
if (res.content) {
var newContent = applyRule(res.content, rule, context);
if (newContent !== res.content) {
res = new ParenthesisNode(newContent);
}
}
} else if (res instanceof ArrayNode) {
var newItems = mapRule(res.items, rule, context);
if (newItems !== res.items) {
res = new ArrayNode(newItems);
}
} else if (res instanceof AccessorNode) {
var newObj = res.object;
if (res.object) {
newObj = applyRule(res.object, rule, context);
}
var newIndex = res.index;
if (res.index) {
newIndex = applyRule(res.index, rule, context);
}
if (newObj !== res.object || newIndex !== res.index) {
res = new AccessorNode(newObj, newIndex);
}
} else if (res instanceof IndexNode) {
var newDims = mapRule(res.dimensions, rule, context);
if (newDims !== res.dimensions) {
res = new IndexNode(newDims);
}
} else if (res instanceof ObjectNode) {
var changed = false;
var newProps = {};
for (var prop in res.properties) {
newProps[prop] = applyRule(res.properties[prop], rule, context);
if (newProps[prop] !== res.properties[prop]) {
changed = true;
}
}
if (changed) {
res = new ObjectNode(newProps);
}
} // Try to match a rule against this node
var repl = rule.r;
var matches = _ruleMatch(rule.l, res, mergedContext)[0]; // If the rule is associative operator, we can try matching it while allowing additional terms.
// This allows us to match rules like 'n+n' to the expression '(1+x)+x' or even 'x+1+x' if the operator is commutative.
if (!matches && rule.expanded) {
repl = rule.expanded.r;
matches = _ruleMatch(rule.expanded.l, res, mergedContext)[0];
}
if (matches) {
// const before = res.toString({parenthesis: 'all'})
// Create a new node by cloning the rhs of the matched rule
// we keep any implicit multiplication state if relevant
var implicit = res.implicit;
res = repl.clone();
if (implicit && 'implicit' in repl) {
res.implicit = true;
} // Replace placeholders with their respective nodes without traversing deeper into the replaced nodes
res = res.transform(function (node) {
if (node.isSymbolNode && (0, _object.hasOwnProperty)(matches.placeholders, node.name)) {
return matches.placeholders[node.name].clone();
} else {
return node;
}
}); // const after = res.toString({parenthesis: 'all'})
// console.log('Simplified ' + before + ' to ' + after)
}
if (rule.repeat && res !== node) {
res = applyRule(res, rule, context);
}
return res;
}
/**
* Get (binary) combinations of a flattened binary node
* e.g. +(node1, node2, node3) -> [
* +(node1, +(node2, node3)),
* +(node2, +(node1, node3)),
* +(node3, +(node1, node2))]
*
*/
function getSplits(node, context) {
var res = [];
var right, rightArgs;
var makeNode = createMakeNodeFunction(node);
if (isCommutative(node, context)) {
for (var i = 0; i < node.args.length; i++) {
rightArgs = node.args.slice(0);
rightArgs.splice(i, 1);
right = rightArgs.length === 1 ? rightArgs[0] : makeNode(rightArgs);
res.push(makeNode([node.args[i], right]));
}
} else {
// Keep order, but try all parenthesizations
for (var _i2 = 1; _i2 < node.args.length; _i2++) {
var left = node.args[0];
if (_i2 > 1) {
left = makeNode(node.args.slice(0, _i2));
}
rightArgs = node.args.slice(_i2);
right = rightArgs.length === 1 ? rightArgs[0] : makeNode(rightArgs);
res.push(makeNode([left, right]));
}
}
return res;
}
/**
* Returns the set union of two match-placeholders or null if there is a conflict.
*/
function mergeMatch(match1, match2) {
var res = {
placeholders: {}
}; // Some matches may not have placeholders; this is OK
if (!match1.placeholders && !match2.placeholders) {
return res;
} else if (!match1.placeholders) {
return match2;
} else if (!match2.placeholders) {
return match1;
} // Placeholders with the same key must match exactly
for (var key in match1.placeholders) {
if ((0, _object.hasOwnProperty)(match1.placeholders, key)) {
res.placeholders[key] = match1.placeholders[key];
if ((0, _object.hasOwnProperty)(match2.placeholders, key)) {
if (!_exactMatch(match1.placeholders[key], match2.placeholders[key])) {
return null;
}
}
}
}
for (var _key in match2.placeholders) {
if ((0, _object.hasOwnProperty)(match2.placeholders, _key)) {
res.placeholders[_key] = match2.placeholders[_key];
}
}
return res;
}
/**
* Combine two lists of matches by applying mergeMatch to the cartesian product of two lists of matches.
* Each list represents matches found in one child of a node.
*/
function combineChildMatches(list1, list2) {
var res = [];
if (list1.length === 0 || list2.length === 0) {
return res;
}
var merged;
for (var i1 = 0; i1 < list1.length; i1++) {
for (var i2 = 0; i2 < list2.length; i2++) {
merged = mergeMatch(list1[i1], list2[i2]);
if (merged) {
res.push(merged);
}
}
}
return res;
}
/**
* Combine multiple lists of matches by applying mergeMatch to the cartesian product of two lists of matches.
* Each list represents matches found in one child of a node.
* Returns a list of unique matches.
*/
function mergeChildMatches(childMatches) {
if (childMatches.length === 0) {
return childMatches;
}
var sets = childMatches.reduce(combineChildMatches);
var uniqueSets = [];
var unique = {};
for (var i = 0; i < sets.length; i++) {
var s = JSON.stringify(sets[i]);
if (!unique[s]) {
unique[s] = true;
uniqueSets.push(sets[i]);
}
}
return uniqueSets;
}
/**
* Determines whether node matches rule.
*
* @param {ConstantNode | SymbolNode | ParenthesisNode | FunctionNode | OperatorNode} rule
* @param {ConstantNode | SymbolNode | ParenthesisNode | FunctionNode | OperatorNode} node
* @param {Object} context -- provides assumed properties of operators
* @param {Boolean} isSplit -- whether we are in process of splitting an
* n-ary operator node into possible binary combinations.
* Defaults to false.
* @return {Object} Information about the match, if it exists.
*/
function _ruleMatch(rule, node, context, isSplit) {
// console.log('Entering _ruleMatch(' + JSON.stringify(rule) + ', ' + JSON.stringify(node) + ')')
// console.log('rule = ' + rule)
// console.log('node = ' + node)
// console.log('Entering _ruleMatch(', rule.toString({parenthesis:'all'}), ', ', node.toString({parenthesis:'all'}), ', ', context, ')')
var res = [{
placeholders: {}
}];
if (rule instanceof OperatorNode && node instanceof OperatorNode || rule instanceof FunctionNode && node instanceof FunctionNode) {
// If the rule is an OperatorNode or a FunctionNode, then node must match exactly
if (rule instanceof OperatorNode) {
if (rule.op !== node.op || rule.fn !== node.fn) {
return [];
}
} else if (rule instanceof FunctionNode) {
if (rule.name !== node.name) {
return [];
}
} // rule and node match. Search the children of rule and node.
if (node.args.length === 1 && rule.args.length === 1 || !isAssociative(node, context) && node.args.length === rule.args.length || isSplit) {
// Expect non-associative operators to match exactly,
// except in any order if operator is commutative
var childMatches = [];
for (var i = 0; i < rule.args.length; i++) {
var childMatch = _ruleMatch(rule.args[i], node.args[i], context);
if (childMatch.length === 0) {
// Child did not match, so stop searching immediately
break;
} // The child matched, so add the information returned from the child to our result
childMatches.push(childMatch);
}
if (childMatches.length !== rule.args.length) {
if (!isCommutative(node, context) || // exact match in order needed
rule.args.length === 1) {
// nothing to commute
return [];
}
if (rule.args.length > 2) {
/* Need to generate all permutations and try them.
* It's a bit complicated, and unlikely to come up since there
* are very few ternary or higher operators. So punt for now.
*/
throw new Error('permuting >2 commutative non-associative rule arguments not yet implemented');
}
/* Exactly two arguments, try them reversed */
var leftMatch = _ruleMatch(rule.args[0], node.args[1], context);
if (leftMatch.length === 0) {
return [];
}
var rightMatch = _ruleMatch(rule.args[1], node.args[0], context);
if (rightMatch.length === 0) {
return [];
}
childMatches = [leftMatch, rightMatch];
}
res = mergeChildMatches(childMatches);
} else if (node.args.length >= 2 && rule.args.length === 2) {
// node is flattened, rule is not
// Associative operators/functions can be split in different ways so we check if the rule matches each
// them and return their union.
var splits = getSplits(node, context);
var splitMatches = [];
for (var _i3 = 0; _i3 < splits.length; _i3++) {
var matchSet = _ruleMatch(rule, splits[_i3], context, true); // recursing at the same tree depth here
splitMatches = splitMatches.concat(matchSet);
}
return splitMatches;
} else if (rule.args.length > 2) {
throw Error('Unexpected non-binary associative function: ' + rule.toString());
} else {
// Incorrect number of arguments in rule and node, so no match
return [];
}
} else if (rule instanceof SymbolNode) {
// If the rule is a SymbolNode, then it carries a special meaning
// according to the first character of the symbol node name.
// c.* matches a ConstantNode
// n.* matches any node
if (rule.name.length === 0) {
throw new Error('Symbol in rule has 0 length...!?');
}
if (SUPPORTED_CONSTANTS[rule.name]) {
// built-in constant must match exactly
if (rule.name !== node.name) {
return [];
}
} else if (rule.name[0] === 'n' || rule.name.substring(0, 2) === '_p') {
// rule matches _anything_, so assign this node to the rule.name placeholder
// Assign node to the rule.name placeholder.
// Our parent will check for matches among placeholders.
res[0].placeholders[rule.name] = node;
} else if (rule.name[0] === 'v') {
// rule matches any variable thing (not a ConstantNode)
if (!(0, _is.isConstantNode)(node)) {
res[0].placeholders[rule.name] = node;
} else {
// Mis-match: rule was expecting something other than a ConstantNode
return [];
}
} else if (rule.name[0] === 'c') {
// rule matches any ConstantNode
if (node instanceof ConstantNode) {
res[0].placeholders[rule.name] = node;
} else {
// Mis-match: rule was expecting a ConstantNode
return [];
}
} else {
throw new Error('Invalid symbol in rule: ' + rule.name);
}
} else if (rule instanceof ConstantNode) {
// Literal constant must match exactly
if (!equal(rule.value, node.value)) {
return [];
}
} else {
// Some other node was encountered which we aren't prepared for, so no match
return [];
} // It's a match!
// console.log('_ruleMatch(' + rule.toString() + ', ' + node.toString() + ') found a match')
return res;
}
/**
* Determines whether p and q (and all their children nodes) are identical.
*
* @param {ConstantNode | SymbolNode | ParenthesisNode | FunctionNode | OperatorNode} p
* @param {ConstantNode | SymbolNode | ParenthesisNode | FunctionNode | OperatorNode} q
* @return {Object} Information about the match, if it exists.
*/
function _exactMatch(p, q) {
if (p instanceof ConstantNode && q instanceof ConstantNode) {
if (!equal(p.value, q.value)) {
return false;
}
} else if (p instanceof SymbolNode && q instanceof SymbolNode) {
if (p.name !== q.name) {
return false;
}
} else if (p instanceof OperatorNode && q instanceof OperatorNode || p instanceof FunctionNode && q instanceof FunctionNode) {
if (p instanceof OperatorNode) {
if (p.op !== q.op || p.fn !== q.fn) {
return false;
}
} else if (p instanceof FunctionNode) {
if (p.name !== q.name) {
return false;
}
}
if (p.args.length !== q.args.length) {
return false;
}
for (var i = 0; i < p.args.length; i++) {
if (!_exactMatch(p.args[i], q.args[i])) {
return false;
}
}
} else {
return false;
}
return true;
}
return simplify;
});
exports.createSimplify = createSimplify;
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