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|
/* This Source Code Form is subject to the terms of the Mozilla Public
* License, v. 2.0. If a copy of the MPL was not distributed with this
* file, You can obtain one at https://mozilla.org/MPL/2.0/. */
//! [Calc expressions][calc].
//!
//! [calc]: https://drafts.csswg.org/css-values/#calc-notation
use num_traits::{Float, Zero};
use smallvec::SmallVec;
use std::fmt::{self, Write};
use std::ops::{Add, Div, Mul, Neg, Rem, Sub};
use std::{cmp, mem};
use style_traits::{CssWriter, ToCss};
/// Whether we're a `min` or `max` function.
#[derive(
Clone,
Copy,
Debug,
Deserialize,
MallocSizeOf,
PartialEq,
Serialize,
ToAnimatedZero,
ToResolvedValue,
ToShmem,
)]
#[repr(u8)]
pub enum MinMaxOp {
/// `min()`
Min,
/// `max()`
Max,
}
/// Whether we're a `mod` or `rem` function.
#[derive(
Clone,
Copy,
Debug,
Deserialize,
MallocSizeOf,
PartialEq,
Serialize,
ToAnimatedZero,
ToResolvedValue,
ToShmem,
)]
#[repr(u8)]
pub enum ModRemOp {
/// `mod()`
Mod,
/// `rem()`
Rem,
}
/// The strategy used in `round()`
#[derive(
Clone,
Copy,
Debug,
Deserialize,
MallocSizeOf,
PartialEq,
Serialize,
ToAnimatedZero,
ToResolvedValue,
ToShmem,
)]
#[repr(u8)]
pub enum RoundingStrategy {
/// `round(nearest, a, b)`
/// round a to the nearest multiple of b
Nearest,
/// `round(up, a, b)`
/// round a up to the nearest multiple of b
Up,
/// `round(down, a, b)`
/// round a down to the nearest multiple of b
Down,
/// `round(to-zero, a, b)`
/// round a to the nearest multiple of b that is towards zero
ToZero,
}
/// This determines the order in which we serialize members of a calc() sum.
///
/// See https://drafts.csswg.org/css-values-4/#sort-a-calculations-children
#[derive(Clone, Copy, Debug, Eq, Ord, PartialEq, PartialOrd)]
#[allow(missing_docs)]
pub enum SortKey {
Number,
Percentage,
Cap,
Ch,
Cqb,
Cqh,
Cqi,
Cqmax,
Cqmin,
Cqw,
Deg,
Dppx,
Dvb,
Dvh,
Dvi,
Dvmax,
Dvmin,
Dvw,
Em,
Ex,
Ic,
Lvb,
Lvh,
Lvi,
Lvmax,
Lvmin,
Lvw,
Px,
Rem,
Sec,
Svb,
Svh,
Svi,
Svmax,
Svmin,
Svw,
Vb,
Vh,
Vi,
Vmax,
Vmin,
Vw,
Other,
}
/// A generic node in a calc expression.
///
/// FIXME: This would be much more elegant if we used `Self` in the types below,
/// but we can't because of https://github.com/serde-rs/serde/issues/1565.
///
/// FIXME: The following annotations are to workaround an LLVM inlining bug, see
/// bug 1631929.
///
/// cbindgen:destructor-attributes=MOZ_NEVER_INLINE
/// cbindgen:copy-constructor-attributes=MOZ_NEVER_INLINE
/// cbindgen:eq-attributes=MOZ_NEVER_INLINE
#[repr(u8)]
#[derive(
Clone,
Debug,
Deserialize,
MallocSizeOf,
PartialEq,
Serialize,
ToAnimatedZero,
ToResolvedValue,
ToShmem,
)]
pub enum GenericCalcNode<L> {
/// A leaf node.
Leaf(L),
/// A node that negates its children, e.g. Negate(1) == -1.
Negate(Box<GenericCalcNode<L>>),
/// A sum node, representing `a + b + c` where a, b, and c are the
/// arguments.
Sum(crate::OwnedSlice<GenericCalcNode<L>>),
/// A `min` or `max` function.
MinMax(crate::OwnedSlice<GenericCalcNode<L>>, MinMaxOp),
/// A `clamp()` function.
Clamp {
/// The minimum value.
min: Box<GenericCalcNode<L>>,
/// The central value.
center: Box<GenericCalcNode<L>>,
/// The maximum value.
max: Box<GenericCalcNode<L>>,
},
/// A `round()` function.
Round {
/// The rounding strategy.
strategy: RoundingStrategy,
/// The value to round.
value: Box<GenericCalcNode<L>>,
/// The step value.
step: Box<GenericCalcNode<L>>,
},
/// A `mod()` or `rem()` function.
ModRem {
/// The dividend calculation.
dividend: Box<GenericCalcNode<L>>,
/// The divisor calculation.
divisor: Box<GenericCalcNode<L>>,
/// Is the function mod or rem?
op: ModRemOp,
},
/// A `hypot()` function
Hypot(crate::OwnedSlice<GenericCalcNode<L>>),
}
pub use self::GenericCalcNode as CalcNode;
/// A trait that represents all the stuff a valid leaf of a calc expression.
pub trait CalcNodeLeaf: Clone + Sized + PartialOrd + PartialEq + ToCss {
/// Returns the unitless value of this leaf.
fn unitless_value(&self) -> f32;
/// Whether this value is known-negative.
fn is_negative(&self) -> bool {
self.unitless_value().is_sign_negative()
}
/// Whether this value is infinite.
fn is_infinite(&self) -> bool {
self.unitless_value().is_infinite()
}
/// Whether this value is zero.
fn is_zero(&self) -> bool {
self.unitless_value().is_zero()
}
/// Whether this value is NaN.
fn is_nan(&self) -> bool {
self.unitless_value().is_nan()
}
/// Tries to merge one sum to another, that is, perform `x` + `y`.
fn try_sum_in_place(&mut self, other: &Self) -> Result<(), ()>;
/// Tries a generic arithmetic operation.
fn try_op<O>(&self, other: &Self, op: O) -> Result<Self, ()>
where
O: Fn(f32, f32) -> f32;
/// Map the value of this node with the given operation.
fn map(&mut self, op: impl FnMut(f32) -> f32);
/// Negates the leaf.
fn negate(&mut self) {
self.map(std::ops::Neg::neg);
}
/// Canonicalizes the expression if necessary.
fn simplify(&mut self);
/// Returns the sort key for simplification.
fn sort_key(&self) -> SortKey;
}
/// The level of any argument being serialized in `to_css_impl`.
enum ArgumentLevel {
/// The root of a calculation tree.
CalculationRoot,
/// The root of an operand node's argument, e.g. `min(10, 20)`, `10` and `20` will have this
/// level, but min in this case will have `TopMost`.
ArgumentRoot,
/// Any other values serialized in the tree.
Nested,
}
impl<L: CalcNodeLeaf> CalcNode<L> {
/// Negate the node inline. If the node is distributive, it is replaced by the result,
/// otherwise the node is wrapped in a [`Negate`] node.
pub fn negate(&mut self) {
match *self {
CalcNode::Leaf(ref mut leaf) => leaf.map(|l| l.neg()),
CalcNode::Negate(ref mut value) => {
// Don't negate the value here. Replace `self` with it's child.
let result = mem::replace(
value.as_mut(),
Self::MinMax(Default::default(), MinMaxOp::Max),
);
*self = result;
},
CalcNode::Sum(ref mut children) => {
for child in children.iter_mut() {
child.negate();
}
},
CalcNode::MinMax(ref mut children, ref mut op) => {
for child in children.iter_mut() {
child.negate();
}
// Negating min-max means the operation is swapped.
*op = match *op {
MinMaxOp::Min => MinMaxOp::Max,
MinMaxOp::Max => MinMaxOp::Min,
};
},
CalcNode::Clamp {
ref mut min,
ref mut center,
ref mut max,
} => {
min.negate();
center.negate();
max.negate();
mem::swap(min, max);
},
CalcNode::Round {
ref mut value,
ref mut step,
..
} => {
value.negate();
step.negate();
},
CalcNode::ModRem {
ref mut dividend,
ref mut divisor,
..
} => {
dividend.negate();
divisor.negate();
},
CalcNode::Hypot(ref mut children) => {
for child in children.iter_mut() {
child.negate();
}
},
}
}
fn sort_key(&self) -> SortKey {
match *self {
Self::Leaf(ref l) => l.sort_key(),
_ => SortKey::Other,
}
}
/// Returns the leaf if we can (if simplification has allowed it).
pub fn as_leaf(&self) -> Option<&L> {
match *self {
Self::Leaf(ref l) => Some(l),
_ => None,
}
}
/// Tries to merge one sum to another, that is, perform `x` + `y`.
fn try_sum_in_place(&mut self, other: &Self) -> Result<(), ()> {
match (self, other) {
(&mut CalcNode::Leaf(ref mut one), &CalcNode::Leaf(ref other)) => {
one.try_sum_in_place(other)
},
_ => Err(()),
}
}
/// Tries to apply a generic arithmentic operator
fn try_op<O>(&self, other: &Self, op: O) -> Result<Self, ()>
where
O: Fn(f32, f32) -> f32,
{
match (self, other) {
(&CalcNode::Leaf(ref one), &CalcNode::Leaf(ref other)) => {
Ok(CalcNode::Leaf(one.try_op(other, op)?))
},
_ => Err(()),
}
}
/// Map the value of this node with the given operation.
pub fn map(&mut self, mut op: impl FnMut(f32) -> f32) {
fn map_internal<L: CalcNodeLeaf>(node: &mut CalcNode<L>, op: &mut impl FnMut(f32) -> f32) {
match node {
CalcNode::Leaf(l) => l.map(op),
CalcNode::Negate(v) => map_internal(v, op),
CalcNode::Sum(children) => {
for node in &mut **children {
map_internal(node, op);
}
},
CalcNode::MinMax(children, _) => {
for node in &mut **children {
map_internal(node, op);
}
},
CalcNode::Clamp { min, center, max } => {
map_internal(min, op);
map_internal(center, op);
map_internal(max, op);
},
CalcNode::Round { value, step, .. } => {
map_internal(value, op);
map_internal(step, op);
},
CalcNode::ModRem {
dividend, divisor, ..
} => {
map_internal(dividend, op);
map_internal(divisor, op);
},
CalcNode::Hypot(children) => {
for node in &mut **children {
map_internal(node, op);
}
},
}
}
map_internal(self, &mut op);
}
/// Convert this `CalcNode` into a `CalcNode` with a different leaf kind.
pub fn map_leaves<O, F>(&self, mut map: F) -> CalcNode<O>
where
O: CalcNodeLeaf,
F: FnMut(&L) -> O,
{
self.map_leaves_internal(&mut map)
}
fn map_leaves_internal<O, F>(&self, map: &mut F) -> CalcNode<O>
where
O: CalcNodeLeaf,
F: FnMut(&L) -> O,
{
fn map_children<L, O, F>(
children: &[CalcNode<L>],
map: &mut F,
) -> crate::OwnedSlice<CalcNode<O>>
where
L: CalcNodeLeaf,
O: CalcNodeLeaf,
F: FnMut(&L) -> O,
{
children
.iter()
.map(|c| c.map_leaves_internal(map))
.collect()
}
match *self {
Self::Leaf(ref l) => CalcNode::Leaf(map(l)),
Self::Negate(ref c) => CalcNode::Negate(Box::new(c.map_leaves_internal(map))),
Self::Sum(ref c) => CalcNode::Sum(map_children(c, map)),
Self::MinMax(ref c, op) => CalcNode::MinMax(map_children(c, map), op),
Self::Clamp {
ref min,
ref center,
ref max,
} => {
let min = Box::new(min.map_leaves_internal(map));
let center = Box::new(center.map_leaves_internal(map));
let max = Box::new(max.map_leaves_internal(map));
CalcNode::Clamp { min, center, max }
},
Self::Round {
strategy,
ref value,
ref step,
} => {
let value = Box::new(value.map_leaves_internal(map));
let step = Box::new(step.map_leaves_internal(map));
CalcNode::Round {
strategy,
value,
step,
}
},
Self::ModRem {
ref dividend,
ref divisor,
op,
} => {
let dividend = Box::new(dividend.map_leaves_internal(map));
let divisor = Box::new(divisor.map_leaves_internal(map));
CalcNode::ModRem {
dividend,
divisor,
op,
}
},
Self::Hypot(ref c) => CalcNode::Hypot(map_children(c, map)),
}
}
/// Resolves the expression returning a value of `O`, given a function to
/// turn a leaf into the relevant value.
pub fn resolve<O>(
&self,
mut leaf_to_output_fn: impl FnMut(&L) -> Result<O, ()>,
) -> Result<O, ()>
where
O: PartialOrd
+ PartialEq
+ Add<Output = O>
+ Mul<Output = O>
+ Div<Output = O>
+ Sub<Output = O>
+ Zero
+ Float
+ Copy,
{
self.resolve_internal(&mut leaf_to_output_fn)
}
fn resolve_internal<O, F>(&self, leaf_to_output_fn: &mut F) -> Result<O, ()>
where
O: PartialOrd
+ PartialEq
+ Add<Output = O>
+ Mul<Output = O>
+ Div<Output = O>
+ Sub<Output = O>
+ Zero
+ Float
+ Copy,
F: FnMut(&L) -> Result<O, ()>,
{
Ok(match *self {
Self::Leaf(ref l) => return leaf_to_output_fn(l),
Self::Negate(ref c) => c.resolve_internal(leaf_to_output_fn)?.neg(),
Self::Sum(ref c) => {
let mut result = Zero::zero();
for child in &**c {
result = result + child.resolve_internal(leaf_to_output_fn)?;
}
result
},
Self::MinMax(ref nodes, op) => {
let mut result = nodes[0].resolve_internal(leaf_to_output_fn)?;
if result.is_nan() {
return Ok(result);
}
for node in nodes.iter().skip(1) {
let candidate = node.resolve_internal(leaf_to_output_fn)?;
if candidate.is_nan() {
result = candidate;
break;
}
let candidate_wins = match op {
MinMaxOp::Min => candidate < result,
MinMaxOp::Max => candidate > result,
};
if candidate_wins {
result = candidate;
}
}
result
},
Self::Clamp {
ref min,
ref center,
ref max,
} => {
let min = min.resolve_internal(leaf_to_output_fn)?;
let center = center.resolve_internal(leaf_to_output_fn)?;
let max = max.resolve_internal(leaf_to_output_fn)?;
let mut result = center;
if result > max {
result = max;
}
if result < min {
result = min
}
if min.is_nan() || center.is_nan() || max.is_nan() {
result = <O as Float>::nan();
}
result
},
Self::Round {
strategy,
ref value,
ref step,
} => {
let value = value.resolve_internal(leaf_to_output_fn)?;
let step = step.resolve_internal(leaf_to_output_fn)?;
// TODO(emilio): Seems like at least a few of these
// special-cases could be removed if we do the math in a
// particular order.
if step.is_zero() {
return Ok(<O as Float>::nan());
}
if value.is_infinite() && step.is_infinite() {
return Ok(<O as Float>::nan());
}
if value.is_infinite() {
return Ok(value);
}
if step.is_infinite() {
match strategy {
RoundingStrategy::Nearest | RoundingStrategy::ToZero => {
return if value.is_sign_negative() {
Ok(<O as Float>::neg_zero())
} else {
Ok(<O as Zero>::zero())
}
},
RoundingStrategy::Up => {
return if !value.is_sign_negative() && !value.is_zero() {
Ok(<O as Float>::infinity())
} else if !value.is_sign_negative() && value.is_zero() {
Ok(value)
} else {
Ok(<O as Float>::neg_zero())
}
},
RoundingStrategy::Down => {
return if value.is_sign_negative() && !value.is_zero() {
Ok(<O as Float>::neg_infinity())
} else if value.is_sign_negative() && value.is_zero() {
Ok(value)
} else {
Ok(<O as Zero>::zero())
}
},
}
}
let div = value / step;
let lower_bound = div.floor() * step;
let upper_bound = div.ceil() * step;
match strategy {
RoundingStrategy::Nearest => {
// In case of a tie, use the upper bound
if value - lower_bound < upper_bound - value {
lower_bound
} else {
upper_bound
}
},
RoundingStrategy::Up => upper_bound,
RoundingStrategy::Down => lower_bound,
RoundingStrategy::ToZero => {
// In case of a tie, use the upper bound
if lower_bound.abs() < upper_bound.abs() {
lower_bound
} else {
upper_bound
}
},
}
},
Self::ModRem {
ref dividend,
ref divisor,
op,
} => {
let dividend = dividend.resolve_internal(leaf_to_output_fn)?;
let divisor = divisor.resolve_internal(leaf_to_output_fn)?;
// In mod(A, B) only, if B is infinite and A has opposite sign to B
// (including an oppositely-signed zero), the result is NaN.
// https://drafts.csswg.org/css-values/#round-infinities
if matches!(op, ModRemOp::Mod) &&
divisor.is_infinite() &&
dividend.is_sign_negative() != divisor.is_sign_negative()
{
return Ok(<O as Float>::nan());
}
match op {
ModRemOp::Mod => dividend - divisor * (dividend / divisor).floor(),
ModRemOp::Rem => dividend - divisor * (dividend / divisor).trunc(),
}
},
Self::Hypot(ref c) => {
let mut result: O = Zero::zero();
for child in &**c {
result = result + child.resolve_internal(leaf_to_output_fn)?.powi(2);
}
result.sqrt()
},
})
}
fn is_negative_leaf(&self) -> bool {
match *self {
Self::Leaf(ref l) => l.is_negative(),
_ => false,
}
}
fn is_zero_leaf(&self) -> bool {
match *self {
Self::Leaf(ref l) => l.is_zero(),
_ => false,
}
}
fn is_infinite_leaf(&self) -> bool {
match *self {
Self::Leaf(ref l) => l.is_infinite(),
_ => false,
}
}
/// Multiplies the node by a scalar.
pub fn mul_by(&mut self, scalar: f32) {
match *self {
Self::Leaf(ref mut l) => l.map(|v| v * scalar),
Self::Negate(ref mut value) => value.mul_by(scalar),
// Multiplication is distributive across this.
Self::Sum(ref mut children) => {
for node in &mut **children {
node.mul_by(scalar);
}
},
// This one is a bit trickier.
Self::MinMax(ref mut children, ref mut op) => {
for node in &mut **children {
node.mul_by(scalar);
}
// For negatives we need to invert the operation.
if scalar < 0. {
*op = match *op {
MinMaxOp::Min => MinMaxOp::Max,
MinMaxOp::Max => MinMaxOp::Min,
}
}
},
// This one is slightly tricky too.
Self::Clamp {
ref mut min,
ref mut center,
ref mut max,
} => {
min.mul_by(scalar);
center.mul_by(scalar);
max.mul_by(scalar);
// For negatives we need to swap min / max.
if scalar < 0. {
mem::swap(min, max);
}
},
Self::Round {
ref mut value,
ref mut step,
..
} => {
value.mul_by(scalar);
step.mul_by(scalar);
},
Self::ModRem {
ref mut dividend,
ref mut divisor,
..
} => {
dividend.mul_by(scalar);
divisor.mul_by(scalar);
},
// Not possible to handle negatives in this case, see: https://bugzil.la/1815448
Self::Hypot(ref mut children) => {
for node in &mut **children {
node.mul_by(scalar);
}
},
}
}
/// Visits all the nodes in this calculation tree recursively, starting by
/// the leaves and bubbling all the way up.
///
/// This is useful for simplification, but can also be used for validation
/// and such.
pub fn visit_depth_first(&mut self, mut f: impl FnMut(&mut Self)) {
self.visit_depth_first_internal(&mut f);
}
fn visit_depth_first_internal(&mut self, f: &mut impl FnMut(&mut Self)) {
match *self {
Self::Clamp {
ref mut min,
ref mut center,
ref mut max,
} => {
min.visit_depth_first_internal(f);
center.visit_depth_first_internal(f);
max.visit_depth_first_internal(f);
},
Self::Round {
ref mut value,
ref mut step,
..
} => {
value.visit_depth_first_internal(f);
step.visit_depth_first_internal(f);
},
Self::ModRem {
ref mut dividend,
ref mut divisor,
..
} => {
dividend.visit_depth_first_internal(f);
divisor.visit_depth_first_internal(f);
},
Self::Sum(ref mut children) |
Self::MinMax(ref mut children, _) |
Self::Hypot(ref mut children) => {
for child in &mut **children {
child.visit_depth_first_internal(f);
}
},
Self::Negate(ref mut value) => {
value.visit_depth_first_internal(f);
},
Self::Leaf(..) => {},
}
f(self);
}
/// Simplifies and sorts the calculation of a given node. All the nodes
/// below it should be simplified already, this only takes care of
/// simplifying directly nested nodes. So, probably should always be used in
/// combination with `visit_depth_first()`.
///
/// This is only needed if it's going to be preserved after parsing (so, for
/// `<length-percentage>`). Otherwise we can just evaluate it using
/// `resolve()`, and we'll come up with a simplified value anyways.
///
/// <https://drafts.csswg.org/css-values-4/#calc-simplification>
pub fn simplify_and_sort_direct_children(&mut self) {
macro_rules! replace_self_with {
($slot:expr) => {{
let dummy = Self::MinMax(Default::default(), MinMaxOp::Max);
let result = mem::replace($slot, dummy);
*self = result;
}};
}
match *self {
Self::Clamp {
ref mut min,
ref mut center,
ref mut max,
} => {
// NOTE: clamp() is max(min, min(center, max))
let min_cmp_center = match min.partial_cmp(¢er) {
Some(o) => o,
None => return,
};
// So if we can prove that min is more than center, then we won,
// as that's what we should always return.
if matches!(min_cmp_center, cmp::Ordering::Greater) {
return replace_self_with!(&mut **min);
}
// Otherwise try with max.
let max_cmp_center = match max.partial_cmp(¢er) {
Some(o) => o,
None => return,
};
if matches!(max_cmp_center, cmp::Ordering::Less) {
// max is less than center, so we need to return effectively
// `max(min, max)`.
let max_cmp_min = match max.partial_cmp(&min) {
Some(o) => o,
None => {
debug_assert!(
false,
"We compared center with min and max, how are \
min / max not comparable with each other?"
);
return;
},
};
if matches!(max_cmp_min, cmp::Ordering::Less) {
return replace_self_with!(&mut **min);
}
return replace_self_with!(&mut **max);
}
// Otherwise we're the center node.
return replace_self_with!(&mut **center);
},
Self::Round {
strategy,
ref mut value,
ref mut step,
} => {
if step.is_zero_leaf() {
value.mul_by(f32::NAN);
return replace_self_with!(&mut **value);
}
if value.is_infinite_leaf() && step.is_infinite_leaf() {
value.mul_by(f32::NAN);
return replace_self_with!(&mut **value);
}
if value.is_infinite_leaf() {
return replace_self_with!(&mut **value);
}
if step.is_infinite_leaf() {
match strategy {
RoundingStrategy::Nearest | RoundingStrategy::ToZero => {
value.mul_by(0.);
return replace_self_with!(&mut **value);
},
RoundingStrategy::Up => {
if !value.is_negative_leaf() && !value.is_zero_leaf() {
value.mul_by(f32::INFINITY);
return replace_self_with!(&mut **value);
} else if !value.is_negative_leaf() && value.is_zero_leaf() {
return replace_self_with!(&mut **value);
} else {
value.mul_by(0.);
return replace_self_with!(&mut **value);
}
},
RoundingStrategy::Down => {
if value.is_negative_leaf() && !value.is_zero_leaf() {
value.mul_by(f32::INFINITY);
return replace_self_with!(&mut **value);
} else if value.is_negative_leaf() && value.is_zero_leaf() {
return replace_self_with!(&mut **value);
} else {
value.mul_by(0.);
return replace_self_with!(&mut **value);
}
},
}
}
if step.is_negative_leaf() {
step.negate();
}
let remainder = match value.try_op(step, Rem::rem) {
Ok(res) => res,
Err(..) => return,
};
let (mut lower_bound, mut upper_bound) = if value.is_negative_leaf() {
let upper_bound = match value.try_op(&remainder, Sub::sub) {
Ok(res) => res,
Err(..) => return,
};
let lower_bound = match upper_bound.try_op(&step, Sub::sub) {
Ok(res) => res,
Err(..) => return,
};
(lower_bound, upper_bound)
} else {
let lower_bound = match value.try_op(&remainder, Sub::sub) {
Ok(res) => res,
Err(..) => return,
};
let upper_bound = match lower_bound.try_op(&step, Add::add) {
Ok(res) => res,
Err(..) => return,
};
(lower_bound, upper_bound)
};
match strategy {
RoundingStrategy::Nearest => {
let lower_diff = match value.try_op(&lower_bound, Sub::sub) {
Ok(res) => res,
Err(..) => return,
};
let upper_diff = match upper_bound.try_op(value, Sub::sub) {
Ok(res) => res,
Err(..) => return,
};
// In case of a tie, use the upper bound
if lower_diff < upper_diff {
return replace_self_with!(&mut lower_bound);
} else {
return replace_self_with!(&mut upper_bound);
}
},
RoundingStrategy::Up => return replace_self_with!(&mut upper_bound),
RoundingStrategy::Down => return replace_self_with!(&mut lower_bound),
RoundingStrategy::ToZero => {
let mut lower_diff = lower_bound.clone();
let mut upper_diff = upper_bound.clone();
if lower_diff.is_negative_leaf() {
lower_diff.negate();
}
if upper_diff.is_negative_leaf() {
upper_diff.negate();
}
// In case of a tie, use the upper bound
if lower_diff < upper_diff {
return replace_self_with!(&mut lower_bound);
} else {
return replace_self_with!(&mut upper_bound);
}
},
};
},
Self::ModRem {
ref dividend,
ref divisor,
op,
} => {
let mut result = dividend.clone();
// In mod(A, B) only, if B is infinite and A has opposite sign to B
// (including an oppositely-signed zero), the result is NaN.
// https://drafts.csswg.org/css-values/#round-infinities
if matches!(op, ModRemOp::Mod) &&
divisor.is_infinite_leaf() &&
dividend.is_negative_leaf() != divisor.is_negative_leaf()
{
result.mul_by(f32::NAN);
return replace_self_with!(&mut *result);
}
let result = match op {
ModRemOp::Mod => dividend.try_op(divisor, |a, b| a - b * (a / b).floor()),
ModRemOp::Rem => dividend.try_op(divisor, |a, b| a - b * (a / b).trunc()),
};
let mut result = match result {
Ok(res) => res,
Err(..) => return,
};
return replace_self_with!(&mut result);
},
Self::MinMax(ref mut children, op) => {
let winning_order = match op {
MinMaxOp::Min => cmp::Ordering::Less,
MinMaxOp::Max => cmp::Ordering::Greater,
};
let mut result = 0;
for i in 1..children.len() {
let o = match children[i].partial_cmp(&children[result]) {
// We can't compare all the children, so we can't
// know which one will actually win. Bail out and
// keep ourselves as a min / max function.
//
// TODO: Maybe we could simplify compatible children,
// see https://github.com/w3c/csswg-drafts/issues/4756
None => return,
Some(o) => o,
};
if o == winning_order {
result = i;
}
}
replace_self_with!(&mut children[result]);
},
Self::Sum(ref mut children_slot) => {
let mut sums_to_merge = SmallVec::<[_; 3]>::new();
let mut extra_kids = 0;
for (i, child) in children_slot.iter().enumerate() {
if let Self::Sum(ref children) = *child {
extra_kids += children.len();
sums_to_merge.push(i);
}
}
// If we only have one kid, we've already simplified it, and it
// doesn't really matter whether it's a sum already or not, so
// lift it up and continue.
if children_slot.len() == 1 {
return replace_self_with!(&mut children_slot[0]);
}
let mut children = mem::replace(children_slot, Default::default()).into_vec();
if !sums_to_merge.is_empty() {
children.reserve(extra_kids - sums_to_merge.len());
// Merge all our nested sums, in reverse order so that the
// list indices are not invalidated.
for i in sums_to_merge.drain(..).rev() {
let kid_children = match children.swap_remove(i) {
Self::Sum(c) => c,
_ => unreachable!(),
};
// This would be nicer with
// https://github.com/rust-lang/rust/issues/59878 fixed.
children.extend(kid_children.into_vec());
}
}
debug_assert!(children.len() >= 2, "Should still have multiple kids!");
// Sort by spec order.
children.sort_unstable_by_key(|c| c.sort_key());
// NOTE: if the function returns true, by the docs of dedup_by,
// a is removed.
children.dedup_by(|a, b| b.try_sum_in_place(a).is_ok());
if children.len() == 1 {
// If only one children remains, lift it up, and carry on.
replace_self_with!(&mut children[0]);
} else {
// Else put our simplified children back.
*children_slot = children.into_boxed_slice().into();
}
},
Self::Hypot(ref children) => {
let mut result = match children[0].try_op(&children[0], Mul::mul) {
Ok(res) => res,
Err(..) => return,
};
for child in children.iter().skip(1) {
let square = match child.try_op(&child, Mul::mul) {
Ok(res) => res,
Err(..) => return,
};
result = match result.try_op(&square, Add::add) {
Ok(res) => res,
Err(..) => return,
}
}
result = match result.try_op(&result, |a, _| a.sqrt()) {
Ok(res) => res,
Err(..) => return,
};
replace_self_with!(&mut result);
},
Self::Negate(ref mut child) => {
// Step 6.
match &mut **child {
CalcNode::Leaf(_) => {
// 1. If root’s child is a numeric value, return an equivalent numeric value, but
// with the value negated (0 - value).
child.negate();
replace_self_with!(&mut **child);
},
CalcNode::Negate(value) => {
// 2. If root’s child is a Negate node, return the child’s child.
replace_self_with!(&mut **value);
},
_ => {
// 3. Return root.
},
}
},
Self::Leaf(ref mut l) => {
l.simplify();
},
}
}
/// Simplifies and sorts the kids in the whole calculation subtree.
pub fn simplify_and_sort(&mut self) {
self.visit_depth_first(|node| node.simplify_and_sort_direct_children())
}
fn to_css_impl<W>(&self, dest: &mut CssWriter<W>, level: ArgumentLevel) -> fmt::Result
where
W: Write,
{
let write_closing_paren = match *self {
Self::MinMax(_, op) => {
dest.write_str(match op {
MinMaxOp::Max => "max(",
MinMaxOp::Min => "min(",
})?;
true
},
Self::Clamp { .. } => {
dest.write_str("clamp(")?;
true
},
Self::Round { strategy, .. } => {
match strategy {
RoundingStrategy::Nearest => dest.write_str("round("),
RoundingStrategy::Up => dest.write_str("round(up, "),
RoundingStrategy::Down => dest.write_str("round(down, "),
RoundingStrategy::ToZero => dest.write_str("round(to-zero, "),
}?;
true
},
Self::ModRem { op, .. } => {
dest.write_str(match op {
ModRemOp::Mod => "mod(",
ModRemOp::Rem => "rem(",
})?;
true
},
Self::Hypot(_) => {
dest.write_str("hypot(")?;
true
},
Self::Negate(_) => {
// We never generate a [`Negate`] node as the root of a calculation, only inside
// [`Sum`] nodes as a child. Because negate nodes are handled by the [`Sum`] node
// directly (see below), this node will never be serialized.
debug_assert!(
false,
"We never serialize Negate nodes as they are handled inside Sum nodes."
);
dest.write_str("(-1 * ")?;
true
},
Self::Sum(_) => match level {
ArgumentLevel::CalculationRoot => {
dest.write_str("calc(")?;
true
},
ArgumentLevel::ArgumentRoot => false,
ArgumentLevel::Nested => {
dest.write_str("(")?;
true
},
},
Self::Leaf(_) => match level {
ArgumentLevel::CalculationRoot => {
dest.write_str("calc(")?;
true
},
ArgumentLevel::ArgumentRoot | ArgumentLevel::Nested => false,
},
};
match *self {
Self::MinMax(ref children, _) | Self::Hypot(ref children) => {
let mut first = true;
for child in &**children {
if !first {
dest.write_str(", ")?;
}
first = false;
child.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
}
},
Self::Negate(ref value) => value.to_css_impl(dest, ArgumentLevel::Nested)?,
Self::Sum(ref children) => {
let mut first = true;
for child in &**children {
if !first {
match child {
Self::Leaf(l) => {
if l.is_negative() {
dest.write_str(" - ")?;
let mut negated = l.clone();
negated.negate();
negated.to_css(dest)?;
} else {
dest.write_str(" + ")?;
l.to_css(dest)?;
}
},
Self::Negate(n) => {
dest.write_str(" - ")?;
n.to_css_impl(dest, ArgumentLevel::Nested)?;
},
_ => {
dest.write_str(" + ")?;
child.to_css_impl(dest, ArgumentLevel::Nested)?;
},
}
} else {
first = false;
child.to_css_impl(dest, ArgumentLevel::Nested)?;
}
}
},
Self::Clamp {
ref min,
ref center,
ref max,
} => {
min.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
dest.write_str(", ")?;
center.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
dest.write_str(", ")?;
max.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
},
Self::Round {
ref value,
ref step,
..
} => {
value.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
dest.write_str(", ")?;
step.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
},
Self::ModRem {
ref dividend,
ref divisor,
..
} => {
dividend.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
dest.write_str(", ")?;
divisor.to_css_impl(dest, ArgumentLevel::ArgumentRoot)?;
},
Self::Leaf(ref l) => l.to_css(dest)?,
}
if write_closing_paren {
dest.write_char(')')?;
}
Ok(())
}
}
impl<L: CalcNodeLeaf> PartialOrd for CalcNode<L> {
fn partial_cmp(&self, other: &Self) -> Option<cmp::Ordering> {
match (self, other) {
(&CalcNode::Leaf(ref one), &CalcNode::Leaf(ref other)) => one.partial_cmp(other),
_ => None,
}
}
}
impl<L: CalcNodeLeaf> ToCss for CalcNode<L> {
/// <https://drafts.csswg.org/css-values/#calc-serialize>
fn to_css<W>(&self, dest: &mut CssWriter<W>) -> fmt::Result
where
W: Write,
{
self.to_css_impl(dest, ArgumentLevel::CalculationRoot)
}
}
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