go/callgraph/vta/propagation.go - tools - Git at Google

 // Copyright 2021 The Go Authors. All rights reserved.
 // Use of this source code is governed by a BSD-style
 // license that can be found in the LICENSE file.

 package vta

 import (
 	"go/types"

 	"golang.org/x/tools/go/ssa"

 	"golang.org/x/tools/go/types/typeutil"
 )

 // scc computes strongly connected components (SCCs) of `g` using the
 // classical Tarjan's algorithm for SCCs. The result is a pair <m, id>
 // where m is a map from nodes to unique id of their SCC in the range
 // [0, id). The SCCs are sorted in reverse topological order: for SCCs
 // with ids X and Y s.t. X < Y, Y comes before X in the topological order.
 func scc(g vtaGraph) (map[node]int, int) {
 	// standard data structures used by Tarjan's algorithm.
 	var index uint64
 	var stack []node
 	indexMap := make(map[node]uint64)
 	lowLink := make(map[node]uint64)
 	onStack := make(map[node]bool)

 	nodeToSccID := make(map[node]int)
 	sccID := 0

 	var doSCC func(node)
 	doSCC = func(n node) {
 		indexMap[n] = index
 		lowLink[n] = index
 		index = index + 1
 		onStack[n] = true
 		stack = append(stack, n)

 		for s := range g[n] {
 			if _, ok := indexMap[s]; !ok {
 				// Analyze successor s that has not been visited yet.
 				doSCC(s)
 				lowLink[n] = min(lowLink[n], lowLink[s])
 			} else if onStack[s] {
 				// The successor is on the stack, meaning it has to be
 				// in the current SCC.
 				lowLink[n] = min(lowLink[n], indexMap[s])
 			}
 		}

 		// if n is a root node, pop the stack and generate a new SCC.
 		if lowLink[n] == indexMap[n] {
 			for {
 				w := stack[len(stack)-1]
 				stack = stack[:len(stack)-1]
 				onStack[w] = false
 				nodeToSccID[w] = sccID
 				if w == n {
 					break
 				}
 			}
 			sccID++
 		}
 	}

 	index = 0
 	for n := range g {
 		if _, ok := indexMap[n]; !ok {
 			doSCC(n)
 		}
 	}

 	return nodeToSccID, sccID
 }

 func min(x, y uint64) uint64 {
 	if x < y {
 		return x
 	}
 	return y
 }

 // propType represents type information being propagated
 // over the vta graph. f != nil only for function nodes
 // and nodes reachable from function nodes. There, we also
 // remember the actual *ssa.Function in order to more
 // precisely model higher-order flow.
 type propType struct {
 	typ types.Type
 	f   *ssa.Function
 }

 // propTypeMap is an auxiliary structure that serves
 // the role of a map from nodes to a set of propTypes.
 type propTypeMap struct {
 	nodeToScc  map[node]int
 	sccToTypes map[int]map[propType]bool
 }

 // propTypes returns a set of propTypes associated with
 // node `n`. If `n` is not in the map `ptm`, nil is returned.
 //
 // Note: for performance reasons, the returned set is a
 // reference to existing set in the map `ptm`, so any updates
 // to it will affect `ptm` as well.
 func (ptm propTypeMap) propTypes(n node) map[propType]bool {
 	id, ok := ptm.nodeToScc[n]
 	if !ok {
 		return nil
 	}
 	return ptm.sccToTypes[id]
 }

 // propagate reduces the `graph` based on its SCCs and
 // then propagates type information through the reduced
 // graph. The result is a map from nodes to a set of types
 // and functions, stemming from higher-order data flow,
 // reaching the node. `canon` is used for type uniqueness.
 func propagate(graph vtaGraph, canon *typeutil.Map) propTypeMap {
 	nodeToScc, sccID := scc(graph)
 	// Initialize sccToTypes to avoid repeated check
 	// for initialization later.
 	sccToTypes := make(map[int]map[propType]bool, sccID)
 	for i := 0; i <= sccID; i++ {
 		sccToTypes[i] = make(map[propType]bool)
 	}

 	// We also need the reverse map, from ids to SCCs.
 	sccs := make(map[int][]node, sccID)
 	for n, id := range nodeToScc {
 		sccs[id] = append(sccs[id], n)
 	}

 	for i := len(sccs) - 1; i >= 0; i-- {
 		nodes := sccs[i]
 		// Save the types induced by the nodes of the SCC.
 		mergeTypes(sccToTypes[i], nodeTypes(nodes, canon))
 		nextSccs := make(map[int]bool)
 		for _, node := range nodes {
 			for succ := range graph[node] {
 				nextSccs[nodeToScc[succ]] = true
 			}
 		}
 		// Propagate types to all successor SCCs.
 		for nextScc := range nextSccs {
 			mergeTypes(sccToTypes[nextScc], sccToTypes[i])
 		}
 	}

 	return propTypeMap{nodeToScc: nodeToScc, sccToTypes: sccToTypes}
 }

 // nodeTypes returns a set of propTypes for `nodes`. These are the
 // propTypes stemming from the type of each node in `nodes` plus.
 func nodeTypes(nodes []node, canon *typeutil.Map) map[propType]bool {
 	types := make(map[propType]bool)
 	for _, n := range nodes {
 		if hasInitialTypes(n) {
 			types[getPropType(n, canon)] = true
 		}
 	}
 	return types
 }

 // getPropType creates a propType for `node` based on its type.
 // propType.typ is always node.Type(). If node is function, then
 // propType.val is the underlying function; nil otherwise.
 func getPropType(node node, canon *typeutil.Map) propType {
 	t := canonicalize(node.Type(), canon)
 	if fn, ok := node.(function); ok {
 		return propType{f: fn.f, typ: t}
 	}
 	return propType{f: nil, typ: t}
 }

 // mergeTypes merges propTypes in `rhs` to `lhs`.
 func mergeTypes(lhs, rhs map[propType]bool) {
 	for typ := range rhs {
 		lhs[typ] = true
 	}
 }
	// Copyright 2021 The Go Authors. All rights reserved.
	// Use of this source code is governed by a BSD-style
	// license that can be found in the LICENSE file.

	package vta

	import (
	"go/types"

	"golang.org/x/tools/go/ssa"

	"golang.org/x/tools/go/types/typeutil"
	)

	// scc computes strongly connected components (SCCs) of `g` using the
	// classical Tarjan's algorithm for SCCs. The result is a pair <m, id>
	// where m is a map from nodes to unique id of their SCC in the range
	// [0, id). The SCCs are sorted in reverse topological order: for SCCs
	// with ids X and Y s.t. X < Y, Y comes before X in the topological order.
	func scc(g vtaGraph) (map[node]int, int) {
	// standard data structures used by Tarjan's algorithm.
	var index uint64
	var stack []node
	indexMap := make(map[node]uint64)
	lowLink := make(map[node]uint64)
	onStack := make(map[node]bool)

	nodeToSccID := make(map[node]int)
	sccID := 0

	var doSCC func(node)
	doSCC = func(n node) {
	indexMap[n] = index
	lowLink[n] = index
	index = index + 1
	onStack[n] = true
	stack = append(stack, n)

	for s := range g[n] {
	if _, ok := indexMap[s]; !ok {
	// Analyze successor s that has not been visited yet.
	doSCC(s)
	lowLink[n] = min(lowLink[n], lowLink[s])
	} else if onStack[s] {
	// The successor is on the stack, meaning it has to be
	// in the current SCC.
	lowLink[n] = min(lowLink[n], indexMap[s])
	}
	}

	// if n is a root node, pop the stack and generate a new SCC.
	if lowLink[n] == indexMap[n] {
	for {
	w := stack[len(stack)-1]
	stack = stack[:len(stack)-1]
	onStack[w] = false
	nodeToSccID[w] = sccID
	if w == n {
	break
	}
	}
	sccID++
	}
	}

	index = 0
	for n := range g {
	if _, ok := indexMap[n]; !ok {
	doSCC(n)
	}
	}

	return nodeToSccID, sccID
	}

	func min(x, y uint64) uint64 {
	if x < y {
	return x
	}
	return y
	}

	// propType represents type information being propagated
	// over the vta graph. f != nil only for function nodes
	// and nodes reachable from function nodes. There, we also
	// remember the actual *ssa.Function in order to more
	// precisely model higher-order flow.
	type propType struct {
	typ types.Type
	f *ssa.Function
	}

	// propTypeMap is an auxiliary structure that serves
	// the role of a map from nodes to a set of propTypes.
	type propTypeMap struct {
	nodeToScc map[node]int
	sccToTypes map[int]map[propType]bool
	}

	// propTypes returns a set of propTypes associated with
	// node `n`. If `n` is not in the map `ptm`, nil is returned.
	//
	// Note: for performance reasons, the returned set is a
	// reference to existing set in the map `ptm`, so any updates
	// to it will affect `ptm` as well.
	func (ptm propTypeMap) propTypes(n node) map[propType]bool {
	id, ok := ptm.nodeToScc[n]
	if !ok {
	return nil
	}
	return ptm.sccToTypes[id]
	}

	// propagate reduces the `graph` based on its SCCs and
	// then propagates type information through the reduced
	// graph. The result is a map from nodes to a set of types
	// and functions, stemming from higher-order data flow,
	// reaching the node. `canon` is used for type uniqueness.
	func propagate(graph vtaGraph, canon *typeutil.Map) propTypeMap {
	nodeToScc, sccID := scc(graph)
	// Initialize sccToTypes to avoid repeated check
	// for initialization later.
	sccToTypes := make(map[int]map[propType]bool, sccID)
	for i := 0; i <= sccID; i++ {
	sccToTypes[i] = make(map[propType]bool)
	}

	// We also need the reverse map, from ids to SCCs.
	sccs := make(map[int][]node, sccID)
	for n, id := range nodeToScc {
	sccs[id] = append(sccs[id], n)
	}

	for i := len(sccs) - 1; i >= 0; i-- {
	nodes := sccs[i]
	// Save the types induced by the nodes of the SCC.
	mergeTypes(sccToTypes[i], nodeTypes(nodes, canon))
	nextSccs := make(map[int]bool)
	for _, node := range nodes {
	for succ := range graph[node] {
	nextSccs[nodeToScc[succ]] = true
	}
	}
	// Propagate types to all successor SCCs.
	for nextScc := range nextSccs {
	mergeTypes(sccToTypes[nextScc], sccToTypes[i])
	}
	}

	return propTypeMap{nodeToScc: nodeToScc, sccToTypes: sccToTypes}
	}

	// nodeTypes returns a set of propTypes for `nodes`. These are the
	// propTypes stemming from the type of each node in `nodes` plus.
	func nodeTypes(nodes []node, canon *typeutil.Map) map[propType]bool {
	types := make(map[propType]bool)
	for _, n := range nodes {
	if hasInitialTypes(n) {
	types[getPropType(n, canon)] = true
	}
	}
	return types
	}

	// getPropType creates a propType for `node` based on its type.
	// propType.typ is always node.Type(). If node is function, then
	// propType.val is the underlying function; nil otherwise.
	func getPropType(node node, canon *typeutil.Map) propType {
	t := canonicalize(node.Type(), canon)
	if fn, ok := node.(function); ok {
	return propType{f: fn.f, typ: t}
	}
	return propType{f: nil, typ: t}
	}

	// mergeTypes merges propTypes in `rhs` to `lhs`.
	func mergeTypes(lhs, rhs map[propType]bool) {
	for typ := range rhs {
	lhs[typ] = true
	}
	}