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506 lines
14 KiB
Go
506 lines
14 KiB
Go
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/*
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Copyright 2018 The Kubernetes Authors.
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Licensed under the Apache License, Version 2.0 (the "License");
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you may not use this file except in compliance with the License.
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You may obtain a copy of the License at
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http://www.apache.org/licenses/LICENSE-2.0
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Unless required by applicable law or agreed to in writing, software
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distributed under the License is distributed on an "AS IS" BASIS,
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WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
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See the License for the specific language governing permissions and
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limitations under the License.
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*/
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package fieldpath
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import (
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"sort"
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"strings"
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"sigs.k8s.io/structured-merge-diff/v4/schema"
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)
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// Set identifies a set of fields.
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type Set struct {
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// Members lists fields that are part of the set.
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// TODO: will be serialized as a list of path elements.
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Members PathElementSet
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// Children lists child fields which themselves have children that are
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// members of the set. Appearance in this list does not imply membership.
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// Note: this is a tree, not an arbitrary graph.
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Children SetNodeMap
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}
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// NewSet makes a set from a list of paths.
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func NewSet(paths ...Path) *Set {
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s := &Set{}
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for _, p := range paths {
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s.Insert(p)
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}
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return s
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}
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// Insert adds the field identified by `p` to the set. Important: parent fields
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// are NOT added to the set; if that is desired, they must be added separately.
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func (s *Set) Insert(p Path) {
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if len(p) == 0 {
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// Zero-length path identifies the entire object; we don't
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// track top-level ownership.
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return
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}
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for {
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if len(p) == 1 {
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s.Members.Insert(p[0])
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return
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}
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s = s.Children.Descend(p[0])
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p = p[1:]
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}
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}
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// Union returns a Set containing elements which appear in either s or s2.
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func (s *Set) Union(s2 *Set) *Set {
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return &Set{
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Members: *s.Members.Union(&s2.Members),
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Children: *s.Children.Union(&s2.Children),
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}
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}
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// Intersection returns a Set containing leaf elements which appear in both s
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// and s2. Intersection can be constructed from Union and Difference operations
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// (example in the tests) but it's much faster to do it in one pass.
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func (s *Set) Intersection(s2 *Set) *Set {
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return &Set{
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Members: *s.Members.Intersection(&s2.Members),
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Children: *s.Children.Intersection(&s2.Children),
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}
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}
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// Difference returns a Set containing elements which:
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// * appear in s
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// * do not appear in s2
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//
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// In other words, for leaf fields, this acts like a regular set difference
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// operation. When non leaf fields are compared with leaf fields ("parents"
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// which contain "children"), the effect is:
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// * parent - child = parent
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// * child - parent = {empty set}
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func (s *Set) Difference(s2 *Set) *Set {
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return &Set{
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Members: *s.Members.Difference(&s2.Members),
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Children: *s.Children.Difference(s2),
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}
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}
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// RecursiveDifference returns a Set containing elements which:
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// * appear in s
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// * do not appear in s2
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//
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// Compared to a regular difference,
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// this removes every field **and its children** from s that is contained in s2.
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//
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// For example, with s containing `a.b.c` and s2 containing `a.b`,
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// a RecursiveDifference will result in `a`, as the entire node `a.b` gets removed.
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func (s *Set) RecursiveDifference(s2 *Set) *Set {
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return &Set{
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Members: *s.Members.Difference(&s2.Members),
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Children: *s.Children.RecursiveDifference(s2),
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}
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}
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// EnsureNamedFieldsAreMembers returns a Set that contains all the
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// fields in s, as well as all the named fields that are typically not
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// included. For example, a set made of "a.b.c" will end-up also owning
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// "a" if it's a named fields but not "a.b" if it's a map.
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func (s *Set) EnsureNamedFieldsAreMembers(sc *schema.Schema, tr schema.TypeRef) *Set {
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members := PathElementSet{
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members: make(sortedPathElements, 0, s.Members.Size()+len(s.Children.members)),
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}
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atom, _ := sc.Resolve(tr)
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members.members = append(members.members, s.Members.members...)
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for _, node := range s.Children.members {
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// Only insert named fields.
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if node.pathElement.FieldName != nil && atom.Map != nil {
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if _, has := atom.Map.FindField(*node.pathElement.FieldName); has {
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members.Insert(node.pathElement)
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}
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}
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}
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return &Set{
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Members: members,
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Children: *s.Children.EnsureNamedFieldsAreMembers(sc, tr),
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}
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}
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// Size returns the number of members of the set.
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func (s *Set) Size() int {
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return s.Members.Size() + s.Children.Size()
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}
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// Empty returns true if there are no members of the set. It is a separate
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// function from Size since it's common to check whether size > 0, and
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// potentially much faster to return as soon as a single element is found.
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func (s *Set) Empty() bool {
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if s.Members.Size() > 0 {
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return false
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}
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return s.Children.Empty()
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}
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// Has returns true if the field referenced by `p` is a member of the set.
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func (s *Set) Has(p Path) bool {
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if len(p) == 0 {
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// No one owns "the entire object"
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return false
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}
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for {
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if len(p) == 1 {
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return s.Members.Has(p[0])
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}
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var ok bool
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s, ok = s.Children.Get(p[0])
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if !ok {
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return false
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}
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p = p[1:]
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}
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}
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// Equals returns true if s and s2 have exactly the same members.
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func (s *Set) Equals(s2 *Set) bool {
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return s.Members.Equals(&s2.Members) && s.Children.Equals(&s2.Children)
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}
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// String returns the set one element per line.
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func (s *Set) String() string {
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elements := []string{}
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s.Iterate(func(p Path) {
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elements = append(elements, p.String())
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})
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return strings.Join(elements, "\n")
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}
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// Iterate calls f once for each field that is a member of the set (preorder
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// DFS). The path passed to f will be reused so make a copy if you wish to keep
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// it.
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func (s *Set) Iterate(f func(Path)) {
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s.iteratePrefix(Path{}, f)
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}
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func (s *Set) iteratePrefix(prefix Path, f func(Path)) {
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s.Members.Iterate(func(pe PathElement) { f(append(prefix, pe)) })
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s.Children.iteratePrefix(prefix, f)
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}
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// WithPrefix returns the subset of paths which begin with the given prefix,
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// with the prefix not included.
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func (s *Set) WithPrefix(pe PathElement) *Set {
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subset, ok := s.Children.Get(pe)
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if !ok {
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return NewSet()
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}
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return subset
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}
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// Leaves returns a set containing only the leaf paths
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// of a set.
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func (s *Set) Leaves() *Set {
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leaves := PathElementSet{}
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im := 0
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ic := 0
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// any members that are not also children are leaves
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outer:
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for im < len(s.Members.members) {
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member := s.Members.members[im]
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for ic < len(s.Children.members) {
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d := member.Compare(s.Children.members[ic].pathElement)
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if d == 0 {
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ic++
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im++
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continue outer
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} else if d < 0 {
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break
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} else /* if d > 0 */ {
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ic++
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}
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}
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leaves.members = append(leaves.members, member)
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im++
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}
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return &Set{
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Members: leaves,
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Children: *s.Children.Leaves(),
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}
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}
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// setNode is a pair of PathElement / Set, for the purpose of expressing
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// nested set membership.
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type setNode struct {
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pathElement PathElement
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set *Set
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}
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// SetNodeMap is a map of PathElement to subset.
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type SetNodeMap struct {
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members sortedSetNode
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}
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type sortedSetNode []setNode
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// Implement the sort interface; this would permit bulk creation, which would
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// be faster than doing it one at a time via Insert.
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func (s sortedSetNode) Len() int { return len(s) }
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func (s sortedSetNode) Less(i, j int) bool { return s[i].pathElement.Less(s[j].pathElement) }
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func (s sortedSetNode) Swap(i, j int) { s[i], s[j] = s[j], s[i] }
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// Descend adds pe to the set if necessary, returning the associated subset.
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func (s *SetNodeMap) Descend(pe PathElement) *Set {
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loc := sort.Search(len(s.members), func(i int) bool {
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return !s.members[i].pathElement.Less(pe)
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})
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if loc == len(s.members) {
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s.members = append(s.members, setNode{pathElement: pe, set: &Set{}})
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return s.members[loc].set
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}
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if s.members[loc].pathElement.Equals(pe) {
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return s.members[loc].set
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}
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s.members = append(s.members, setNode{})
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copy(s.members[loc+1:], s.members[loc:])
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s.members[loc] = setNode{pathElement: pe, set: &Set{}}
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return s.members[loc].set
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}
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// Size returns the sum of the number of members of all subsets.
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func (s *SetNodeMap) Size() int {
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count := 0
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for _, v := range s.members {
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count += v.set.Size()
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}
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return count
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}
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// Empty returns false if there's at least one member in some child set.
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func (s *SetNodeMap) Empty() bool {
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for _, n := range s.members {
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if !n.set.Empty() {
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return false
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}
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}
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return true
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}
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// Get returns (the associated set, true) or (nil, false) if there is none.
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func (s *SetNodeMap) Get(pe PathElement) (*Set, bool) {
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loc := sort.Search(len(s.members), func(i int) bool {
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return !s.members[i].pathElement.Less(pe)
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})
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if loc == len(s.members) {
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return nil, false
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}
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if s.members[loc].pathElement.Equals(pe) {
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return s.members[loc].set, true
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}
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return nil, false
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}
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// Equals returns true if s and s2 have the same structure (same nested
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// child sets).
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func (s *SetNodeMap) Equals(s2 *SetNodeMap) bool {
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if len(s.members) != len(s2.members) {
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return false
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}
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for i := range s.members {
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if !s.members[i].pathElement.Equals(s2.members[i].pathElement) {
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return false
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}
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if !s.members[i].set.Equals(s2.members[i].set) {
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return false
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}
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}
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return true
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}
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// Union returns a SetNodeMap with members that appear in either s or s2.
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func (s *SetNodeMap) Union(s2 *SetNodeMap) *SetNodeMap {
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out := &SetNodeMap{}
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i, j := 0, 0
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for i < len(s.members) && j < len(s2.members) {
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if s.members[i].pathElement.Less(s2.members[j].pathElement) {
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out.members = append(out.members, s.members[i])
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i++
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} else {
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if !s2.members[j].pathElement.Less(s.members[i].pathElement) {
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out.members = append(out.members, setNode{pathElement: s.members[i].pathElement, set: s.members[i].set.Union(s2.members[j].set)})
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i++
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} else {
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out.members = append(out.members, s2.members[j])
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}
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j++
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}
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}
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if i < len(s.members) {
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out.members = append(out.members, s.members[i:]...)
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}
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if j < len(s2.members) {
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out.members = append(out.members, s2.members[j:]...)
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}
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return out
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}
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// Intersection returns a SetNodeMap with members that appear in both s and s2.
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func (s *SetNodeMap) Intersection(s2 *SetNodeMap) *SetNodeMap {
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out := &SetNodeMap{}
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i, j := 0, 0
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for i < len(s.members) && j < len(s2.members) {
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if s.members[i].pathElement.Less(s2.members[j].pathElement) {
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i++
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} else {
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if !s2.members[j].pathElement.Less(s.members[i].pathElement) {
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res := s.members[i].set.Intersection(s2.members[j].set)
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if !res.Empty() {
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out.members = append(out.members, setNode{pathElement: s.members[i].pathElement, set: res})
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}
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i++
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}
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j++
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}
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}
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return out
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}
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// Difference returns a SetNodeMap with members that appear in s but not in s2.
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func (s *SetNodeMap) Difference(s2 *Set) *SetNodeMap {
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out := &SetNodeMap{}
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i, j := 0, 0
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for i < len(s.members) && j < len(s2.Children.members) {
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if s.members[i].pathElement.Less(s2.Children.members[j].pathElement) {
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out.members = append(out.members, setNode{pathElement: s.members[i].pathElement, set: s.members[i].set})
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i++
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} else {
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if !s2.Children.members[j].pathElement.Less(s.members[i].pathElement) {
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diff := s.members[i].set.Difference(s2.Children.members[j].set)
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// We aren't permitted to add nodes with no elements.
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if !diff.Empty() {
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out.members = append(out.members, setNode{pathElement: s.members[i].pathElement, set: diff})
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}
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i++
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}
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j++
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}
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}
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if i < len(s.members) {
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out.members = append(out.members, s.members[i:]...)
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}
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return out
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}
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// RecursiveDifference returns a SetNodeMap with members that appear in s but not in s2.
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//
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// Compared to a regular difference,
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|
// this removes every field **and its children** from s that is contained in s2.
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//
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// For example, with s containing `a.b.c` and s2 containing `a.b`,
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// a RecursiveDifference will result in `a`, as the entire node `a.b` gets removed.
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func (s *SetNodeMap) RecursiveDifference(s2 *Set) *SetNodeMap {
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out := &SetNodeMap{}
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i, j := 0, 0
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for i < len(s.members) && j < len(s2.Children.members) {
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if s.members[i].pathElement.Less(s2.Children.members[j].pathElement) {
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if !s2.Members.Has(s.members[i].pathElement) {
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out.members = append(out.members, setNode{pathElement: s.members[i].pathElement, set: s.members[i].set})
|
||
|
}
|
||
|
i++
|
||
|
} else {
|
||
|
if !s2.Children.members[j].pathElement.Less(s.members[i].pathElement) {
|
||
|
if !s2.Members.Has(s.members[i].pathElement) {
|
||
|
diff := s.members[i].set.RecursiveDifference(s2.Children.members[j].set)
|
||
|
if !diff.Empty() {
|
||
|
out.members = append(out.members, setNode{pathElement: s.members[i].pathElement, set: diff})
|
||
|
}
|
||
|
}
|
||
|
i++
|
||
|
}
|
||
|
j++
|
||
|
}
|
||
|
}
|
||
|
|
||
|
if i < len(s.members) {
|
||
|
for _, c := range s.members[i:] {
|
||
|
if !s2.Members.Has(c.pathElement) {
|
||
|
out.members = append(out.members, c)
|
||
|
}
|
||
|
}
|
||
|
}
|
||
|
|
||
|
return out
|
||
|
}
|
||
|
|
||
|
// EnsureNamedFieldsAreMembers returns a set that contains all the named fields along with the leaves.
|
||
|
func (s *SetNodeMap) EnsureNamedFieldsAreMembers(sc *schema.Schema, tr schema.TypeRef) *SetNodeMap {
|
||
|
out := make(sortedSetNode, 0, s.Size())
|
||
|
atom, _ := sc.Resolve(tr)
|
||
|
for _, member := range s.members {
|
||
|
tr := schema.TypeRef{}
|
||
|
if member.pathElement.FieldName != nil && atom.Map != nil {
|
||
|
tr = atom.Map.ElementType
|
||
|
if sf, ok := atom.Map.FindField(*member.pathElement.FieldName); ok {
|
||
|
tr = sf.Type
|
||
|
}
|
||
|
} else if member.pathElement.Key != nil && atom.List != nil {
|
||
|
tr = atom.List.ElementType
|
||
|
}
|
||
|
out = append(out, setNode{
|
||
|
pathElement: member.pathElement,
|
||
|
set: member.set.EnsureNamedFieldsAreMembers(sc, tr),
|
||
|
})
|
||
|
}
|
||
|
|
||
|
return &SetNodeMap{
|
||
|
members: out,
|
||
|
}
|
||
|
}
|
||
|
|
||
|
// Iterate calls f for each PathElement in the set.
|
||
|
func (s *SetNodeMap) Iterate(f func(PathElement)) {
|
||
|
for _, n := range s.members {
|
||
|
f(n.pathElement)
|
||
|
}
|
||
|
}
|
||
|
|
||
|
func (s *SetNodeMap) iteratePrefix(prefix Path, f func(Path)) {
|
||
|
for _, n := range s.members {
|
||
|
pe := n.pathElement
|
||
|
n.set.iteratePrefix(append(prefix, pe), f)
|
||
|
}
|
||
|
}
|
||
|
|
||
|
// Leaves returns a SetNodeMap containing
|
||
|
// only setNodes with leaf PathElements.
|
||
|
func (s *SetNodeMap) Leaves() *SetNodeMap {
|
||
|
out := &SetNodeMap{}
|
||
|
out.members = make(sortedSetNode, len(s.members))
|
||
|
for i, n := range s.members {
|
||
|
out.members[i] = setNode{
|
||
|
pathElement: n.pathElement,
|
||
|
set: n.set.Leaves(),
|
||
|
}
|
||
|
}
|
||
|
return out
|
||
|
}
|