src/runtime/mgclarge.go - go - Git at Google

 // Copyright 2009 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.

 // Page heap.
 //
 // See malloc.go for the general overview.
 //
 // Large spans are the subject of this file. Spans consisting of less than
 // _MaxMHeapLists are held in lists of like sized spans. Larger spans
 // are held in a treap. See https://en.wikipedia.org/wiki/Treap or
 // https://faculty.washington.edu/aragon/pubs/rst89.pdf for an overview.
 // sema.go also holds an implementation of a treap.
 //
 // Each treapNode holds a single span. The treap is sorted by page size
 // and for spans of the same size a secondary sort based on start address
 // is done.
 // Spans are returned based on a best fit algorithm and for spans of the same
 // size the one at the lowest address is selected.
 //
 // The primary routines are
 // insert: adds a span to the treap
 // remove: removes the span from that treap that best fits the required size
 // removeSpan: which removes a specific span from the treap
 //
 // _mheap.lock must be held when manipulating this data structure.

 package runtime

 import (
 	"unsafe"
 )

 //go:notinheap
 type mTreap struct {
 	treap *treapNode
 }

 //go:notinheap
 type treapNode struct {
 	right     *treapNode // all treapNodes > this treap node
 	left      *treapNode // all treapNodes < this treap node
 	parent    *treapNode // direct parent of this node, nil if root
 	npagesKey uintptr    // number of pages in spanKey, used as primary sort key
 	spanKey   *mspan     // span of size npagesKey, used as secondary sort key
 	priority  uint32     // random number used by treap algorithm to keep tree probabilistically balanced
 }

 func (t *treapNode) pred() *treapNode {
 	if t.left != nil {
 		// If it has a left child, its predecessor will be
 		// its right most left (grand)child.
 		t = t.left
 		for t.right != nil {
 			t = t.right
 		}
 		return t
 	}
 	// If it has no left child, its predecessor will be
 	// the first grandparent who's right child is its
 	// ancestor.
 	//
 	// We compute this by walking up the treap until the
 	// current node's parent is its parent's right child.
 	//
 	// If we find at any point walking up the treap
 	// that the current node doesn't have a parent,
 	// we've hit the root. This means that t is already
 	// the left-most node in the treap and therefore
 	// has no predecessor.
 	for t.parent != nil && t.parent.right != t {
 		if t.parent.left != t {
 			println("runtime: predecessor t=", t, "t.spanKey=", t.spanKey)
 			throw("node is not its parent's child")
 		}
 		t = t.parent
 	}
 	return t.parent
 }

 func (t *treapNode) succ() *treapNode {
 	if t.right != nil {
 		// If it has a right child, its successor will be
 		// its left-most right (grand)child.
 		t = t.right
 		for t.left != nil {
 			t = t.left
 		}
 		return t
 	}
 	// See pred.
 	for t.parent != nil && t.parent.left != t {
 		if t.parent.right != t {
 			println("runtime: predecessor t=", t, "t.spanKey=", t.spanKey)
 			throw("node is not its parent's child")
 		}
 		t = t.parent
 	}
 	return t.parent
 }

 // isSpanInTreap is handy for debugging. One should hold the heap lock, usually
 // mheap_.lock().
 func (t *treapNode) isSpanInTreap(s *mspan) bool {
 	if t == nil {
 		return false
 	}
 	return t.spanKey == s || t.left.isSpanInTreap(s) || t.right.isSpanInTreap(s)
 }

 // walkTreap is handy for debugging.
 // Starting at some treapnode t, for example the root, do a depth first preorder walk of
 // the tree executing fn at each treap node. One should hold the heap lock, usually
 // mheap_.lock().
 func (t *treapNode) walkTreap(fn func(tn *treapNode)) {
 	if t == nil {
 		return
 	}
 	fn(t)
 	t.left.walkTreap(fn)
 	t.right.walkTreap(fn)
 }

 // checkTreapNode when used in conjunction with walkTreap can usually detect a
 // poorly formed treap.
 func checkTreapNode(t *treapNode) {
 	// lessThan is used to order the treap.
 	// npagesKey and npages are the primary keys.
 	// spanKey and span are the secondary keys.
 	// span == nil (0) will always be lessThan all
 	// spans of the same size.
 	lessThan := func(npages uintptr, s *mspan) bool {
 		if t.npagesKey != npages {
 			return t.npagesKey < npages
 		}
 		// t.npagesKey == npages
 		return uintptr(unsafe.Pointer(t.spanKey)) < uintptr(unsafe.Pointer(s))
 	}

 	if t == nil {
 		return
 	}
 	if t.spanKey.npages != t.npagesKey || t.spanKey.next != nil {
 		println("runtime: checkTreapNode treapNode t=", t, "     t.npagesKey=", t.npagesKey,
 			"t.spanKey.npages=", t.spanKey.npages)
 		throw("why does span.npages and treap.ngagesKey do not match?")
 	}
 	if t.left != nil && lessThan(t.left.npagesKey, t.left.spanKey) {
 		throw("t.lessThan(t.left.npagesKey, t.left.spanKey) is not false")
 	}
 	if t.right != nil && !lessThan(t.right.npagesKey, t.right.spanKey) {
 		throw("!t.lessThan(t.left.npagesKey, t.left.spanKey) is not false")
 	}
 }

 // treapIter is a bidirectional iterator type which may be used to iterate over a
 // an mTreap in-order forwards (increasing order) or backwards (decreasing order).
 // Its purpose is to hide details about the treap from users when trying to iterate
 // over it.
 //
 // To create iterators over the treap, call start or end on an mTreap.
 type treapIter struct {
 	t *treapNode
 }

 // span returns the span at the current position in the treap.
 // If the treap is not valid, span will panic.
 func (i *treapIter) span() *mspan {
 	return i.t.spanKey
 }

 // valid returns whether the iterator represents a valid position
 // in the mTreap.
 func (i *treapIter) valid() bool {
 	return i.t != nil
 }

 // next moves the iterator forward by one. Once the iterator
 // ceases to be valid, calling next will panic.
 func (i treapIter) next() treapIter {
 	i.t = i.t.succ()
 	return i
 }

 // prev moves the iterator backwards by one. Once the iterator
 // ceases to be valid, calling prev will panic.
 func (i treapIter) prev() treapIter {
 	i.t = i.t.pred()
 	return i
 }

 // start returns an iterator which points to the start of the treap (the
 // left-most node in the treap).
 func (root *mTreap) start() treapIter {
 	t := root.treap
 	if t == nil {
 		return treapIter{}
 	}
 	for t.left != nil {
 		t = t.left
 	}
 	return treapIter{t: t}
 }

 // end returns an iterator which points to the end of the treap (the
 // right-most node in the treap).
 func (root *mTreap) end() treapIter {
 	t := root.treap
 	if t == nil {
 		return treapIter{}
 	}
 	for t.right != nil {
 		t = t.right
 	}
 	return treapIter{t: t}
 }

 // insert adds span to the large span treap.
 func (root *mTreap) insert(span *mspan) {
 	npages := span.npages
 	var last *treapNode
 	pt := &root.treap
 	for t := *pt; t != nil; t = *pt {
 		last = t
 		if t.npagesKey < npages {
 			pt = &t.right
 		} else if t.npagesKey > npages {
 			pt = &t.left
 		} else if t.spanKey.base() < span.base() {
 			// t.npagesKey == npages, so sort on span addresses.
 			pt = &t.right
 		} else if t.spanKey.base() > span.base() {
 			pt = &t.left
 		} else {
 			throw("inserting span already in treap")
 		}
 	}

 	// Add t as new leaf in tree of span size and unique addrs.
 	// The balanced tree is a treap using priority as the random heap priority.
 	// That is, it is a binary tree ordered according to the npagesKey,
 	// but then among the space of possible binary trees respecting those
 	// npagesKeys, it is kept balanced on average by maintaining a heap ordering
 	// on the priority: s.priority <= both s.right.priority and s.right.priority.
 	// https://en.wikipedia.org/wiki/Treap
 	// https://faculty.washington.edu/aragon/pubs/rst89.pdf

 	t := (*treapNode)(mheap_.treapalloc.alloc())
 	t.npagesKey = span.npages
 	t.priority = fastrand()
 	t.spanKey = span
 	t.parent = last
 	*pt = t // t now at a leaf.
 	// Rotate up into tree according to priority.
 	for t.parent != nil && t.parent.priority > t.priority {
 		if t != nil && t.spanKey.npages != t.npagesKey {
 			println("runtime: insert t=", t, "t.npagesKey=", t.npagesKey)
 			println("runtime:      t.spanKey=", t.spanKey, "t.spanKey.npages=", t.spanKey.npages)
 			throw("span and treap sizes do not match?")
 		}
 		if t.parent.left == t {
 			root.rotateRight(t.parent)
 		} else {
 			if t.parent.right != t {
 				throw("treap insert finds a broken treap")
 			}
 			root.rotateLeft(t.parent)
 		}
 	}
 }

 func (root *mTreap) removeNode(t *treapNode) {
 	if t.spanKey.npages != t.npagesKey {
 		throw("span and treap node npages do not match")
 	}
 	// Rotate t down to be leaf of tree for removal, respecting priorities.
 	for t.right != nil || t.left != nil {
 		if t.right == nil || t.left != nil && t.left.priority < t.right.priority {
 			root.rotateRight(t)
 		} else {
 			root.rotateLeft(t)
 		}
 	}
 	// Remove t, now a leaf.
 	if t.parent != nil {
 		if t.parent.left == t {
 			t.parent.left = nil
 		} else {
 			t.parent.right = nil
 		}
 	} else {
 		root.treap = nil
 	}
 	// Return the found treapNode's span after freeing the treapNode.
 	mheap_.treapalloc.free(unsafe.Pointer(t))
 }

 // find searches for, finds, and returns the treap node containing the
 // smallest span that can hold npages. If no span has at least npages
 // it returns nil.
 // This is slightly more complicated than a simple binary tree search
 // since if an exact match is not found the next larger node is
 // returned.
 func (root *mTreap) find(npages uintptr) *treapNode {
 	t := root.treap
 	for t != nil {
 		if t.spanKey == nil {
 			throw("treap node with nil spanKey found")
 		}
 		if t.npagesKey < npages {
 			t = t.right
 		} else if t.left != nil && t.left.npagesKey >= npages {
 			t = t.left
 		} else {
 			return t
 		}
 	}
 	return nil
 }

 // removeSpan searches for, finds, deletes span along with
 // the associated treap node. If the span is not in the treap
 // then t will eventually be set to nil and the t.spanKey
 // will throw.
 func (root *mTreap) removeSpan(span *mspan) {
 	npages := span.npages
 	t := root.treap
 	for t.spanKey != span {
 		if t.npagesKey < npages {
 			t = t.right
 		} else if t.npagesKey > npages {
 			t = t.left
 		} else if t.spanKey.base() < span.base() {
 			t = t.right
 		} else if t.spanKey.base() > span.base() {
 			t = t.left
 		}
 	}
 	root.removeNode(t)
 }

 // erase removes the element referred to by the current position of the
 // iterator. This operation consumes the given iterator, so it should no
 // longer be used. It is up to the caller to get the next or previous
 // iterator before calling erase, if need be.
 func (root *mTreap) erase(i treapIter) {
 	root.removeNode(i.t)
 }

 // rotateLeft rotates the tree rooted at node x.
 // turning (x a (y b c)) into (y (x a b) c).
 func (root *mTreap) rotateLeft(x *treapNode) {
 	// p -> (x a (y b c))
 	p := x.parent
 	a, y := x.left, x.right
 	b, c := y.left, y.right

 	y.left = x
 	x.parent = y
 	y.right = c
 	if c != nil {
 		c.parent = y
 	}
 	x.left = a
 	if a != nil {
 		a.parent = x
 	}
 	x.right = b
 	if b != nil {
 		b.parent = x
 	}

 	y.parent = p
 	if p == nil {
 		root.treap = y
 	} else if p.left == x {
 		p.left = y
 	} else {
 		if p.right != x {
 			throw("large span treap rotateLeft")
 		}
 		p.right = y
 	}
 }

 // rotateRight rotates the tree rooted at node y.
 // turning (y (x a b) c) into (x a (y b c)).
 func (root *mTreap) rotateRight(y *treapNode) {
 	// p -> (y (x a b) c)
 	p := y.parent
 	x, c := y.left, y.right
 	a, b := x.left, x.right

 	x.left = a
 	if a != nil {
 		a.parent = x
 	}
 	x.right = y
 	y.parent = x
 	y.left = b
 	if b != nil {
 		b.parent = y
 	}
 	y.right = c
 	if c != nil {
 		c.parent = y
 	}

 	x.parent = p
 	if p == nil {
 		root.treap = x
 	} else if p.left == y {
 		p.left = x
 	} else {
 		if p.right != y {
 			throw("large span treap rotateRight")
 		}
 		p.right = x
 	}
 }
	// Copyright 2009 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.

	// Page heap.
	//
	// See malloc.go for the general overview.
	//
	// Large spans are the subject of this file. Spans consisting of less than
	// _MaxMHeapLists are held in lists of like sized spans. Larger spans
	// are held in a treap. See https://en.wikipedia.org/wiki/Treap or
	// https://faculty.washington.edu/aragon/pubs/rst89.pdf for an overview.
	// sema.go also holds an implementation of a treap.
	//
	// Each treapNode holds a single span. The treap is sorted by page size
	// and for spans of the same size a secondary sort based on start address
	// is done.
	// Spans are returned based on a best fit algorithm and for spans of the same
	// size the one at the lowest address is selected.
	//
	// The primary routines are
	// insert: adds a span to the treap
	// remove: removes the span from that treap that best fits the required size
	// removeSpan: which removes a specific span from the treap
	//
	// _mheap.lock must be held when manipulating this data structure.

	package runtime

	import (
	"unsafe"
	)

	//go:notinheap
	type mTreap struct {
	treap *treapNode
	}

	//go:notinheap
	type treapNode struct {
	right *treapNode // all treapNodes > this treap node
	left *treapNode // all treapNodes < this treap node
	parent *treapNode // direct parent of this node, nil if root
	npagesKey uintptr // number of pages in spanKey, used as primary sort key
	spanKey *mspan // span of size npagesKey, used as secondary sort key
	priority uint32 // random number used by treap algorithm to keep tree probabilistically balanced
	}

	func (t treapNode) pred() treapNode {
	if t.left != nil {
	// If it has a left child, its predecessor will be
	// its right most left (grand)child.
	t = t.left
	for t.right != nil {
	t = t.right
	}
	return t
	}
	// If it has no left child, its predecessor will be
	// the first grandparent who's right child is its
	// ancestor.
	//
	// We compute this by walking up the treap until the
	// current node's parent is its parent's right child.
	//
	// If we find at any point walking up the treap
	// that the current node doesn't have a parent,
	// we've hit the root. This means that t is already
	// the left-most node in the treap and therefore
	// has no predecessor.
	for t.parent != nil && t.parent.right != t {
	if t.parent.left != t {
	println("runtime: predecessor t=", t, "t.spanKey=", t.spanKey)
	throw("node is not its parent's child")
	}
	t = t.parent
	}
	return t.parent
	}

	func (t treapNode) succ() treapNode {
	if t.right != nil {
	// If it has a right child, its successor will be
	// its left-most right (grand)child.
	t = t.right
	for t.left != nil {
	t = t.left
	}
	return t
	}
	// See pred.
	for t.parent != nil && t.parent.left != t {
	if t.parent.right != t {
	println("runtime: predecessor t=", t, "t.spanKey=", t.spanKey)
	throw("node is not its parent's child")
	}
	t = t.parent
	}
	return t.parent
	}

	// isSpanInTreap is handy for debugging. One should hold the heap lock, usually
	// mheap_.lock().
	func (t treapNode) isSpanInTreap(s mspan) bool {
	if t == nil {
	return false
	}
	return t.spanKey == s \|\| t.left.isSpanInTreap(s) \|\| t.right.isSpanInTreap(s)
	}

	// walkTreap is handy for debugging.
	// Starting at some treapnode t, for example the root, do a depth first preorder walk of
	// the tree executing fn at each treap node. One should hold the heap lock, usually
	// mheap_.lock().
	func (t treapNode) walkTreap(fn func(tn treapNode)) {
	if t == nil {
	return
	}
	fn(t)
	t.left.walkTreap(fn)
	t.right.walkTreap(fn)
	}

	// checkTreapNode when used in conjunction with walkTreap can usually detect a
	// poorly formed treap.
	func checkTreapNode(t *treapNode) {
	// lessThan is used to order the treap.
	// npagesKey and npages are the primary keys.
	// spanKey and span are the secondary keys.
	// span == nil (0) will always be lessThan all
	// spans of the same size.
	lessThan := func(npages uintptr, s *mspan) bool {
	if t.npagesKey != npages {
	return t.npagesKey < npages
	}
	// t.npagesKey == npages
	return uintptr(unsafe.Pointer(t.spanKey)) < uintptr(unsafe.Pointer(s))
	}

	if t == nil {
	return
	}
	if t.spanKey.npages != t.npagesKey \|\| t.spanKey.next != nil {
	println("runtime: checkTreapNode treapNode t=", t, " t.npagesKey=", t.npagesKey,
	"t.spanKey.npages=", t.spanKey.npages)
	throw("why does span.npages and treap.ngagesKey do not match?")
	}
	if t.left != nil && lessThan(t.left.npagesKey, t.left.spanKey) {
	throw("t.lessThan(t.left.npagesKey, t.left.spanKey) is not false")
	}
	if t.right != nil && !lessThan(t.right.npagesKey, t.right.spanKey) {
	throw("!t.lessThan(t.left.npagesKey, t.left.spanKey) is not false")
	}
	}

	// treapIter is a bidirectional iterator type which may be used to iterate over a
	// an mTreap in-order forwards (increasing order) or backwards (decreasing order).
	// Its purpose is to hide details about the treap from users when trying to iterate
	// over it.
	//
	// To create iterators over the treap, call start or end on an mTreap.
	type treapIter struct {
	t *treapNode
	}

	// span returns the span at the current position in the treap.
	// If the treap is not valid, span will panic.
	func (i treapIter) span() mspan {
	return i.t.spanKey
	}

	// valid returns whether the iterator represents a valid position
	// in the mTreap.
	func (i *treapIter) valid() bool {
	return i.t != nil
	}

	// next moves the iterator forward by one. Once the iterator
	// ceases to be valid, calling next will panic.
	func (i treapIter) next() treapIter {
	i.t = i.t.succ()
	return i
	}

	// prev moves the iterator backwards by one. Once the iterator
	// ceases to be valid, calling prev will panic.
	func (i treapIter) prev() treapIter {
	i.t = i.t.pred()
	return i
	}

	// start returns an iterator which points to the start of the treap (the
	// left-most node in the treap).
	func (root *mTreap) start() treapIter {
	t := root.treap
	if t == nil {
	return treapIter{}
	}
	for t.left != nil {
	t = t.left
	}
	return treapIter{t: t}
	}

	// end returns an iterator which points to the end of the treap (the
	// right-most node in the treap).
	func (root *mTreap) end() treapIter {
	t := root.treap
	if t == nil {
	return treapIter{}
	}
	for t.right != nil {
	t = t.right
	}
	return treapIter{t: t}
	}

	// insert adds span to the large span treap.
	func (root mTreap) insert(span mspan) {
	npages := span.npages
	var last *treapNode
	pt := &root.treap
	for t := pt; t != nil; t = pt {
	last = t
	if t.npagesKey < npages {
	pt = &t.right
	} else if t.npagesKey > npages {
	pt = &t.left
	} else if t.spanKey.base() < span.base() {
	// t.npagesKey == npages, so sort on span addresses.
	pt = &t.right
	} else if t.spanKey.base() > span.base() {
	pt = &t.left
	} else {
	throw("inserting span already in treap")
	}
	}

	// Add t as new leaf in tree of span size and unique addrs.
	// The balanced tree is a treap using priority as the random heap priority.
	// That is, it is a binary tree ordered according to the npagesKey,
	// but then among the space of possible binary trees respecting those
	// npagesKeys, it is kept balanced on average by maintaining a heap ordering
	// on the priority: s.priority <= both s.right.priority and s.right.priority.
	// https://en.wikipedia.org/wiki/Treap
	// https://faculty.washington.edu/aragon/pubs/rst89.pdf

	t := (*treapNode)(mheap_.treapalloc.alloc())
	t.npagesKey = span.npages
	t.priority = fastrand()
	t.spanKey = span
	t.parent = last
	*pt = t // t now at a leaf.
	// Rotate up into tree according to priority.
	for t.parent != nil && t.parent.priority > t.priority {
	if t != nil && t.spanKey.npages != t.npagesKey {
	println("runtime: insert t=", t, "t.npagesKey=", t.npagesKey)
	println("runtime: t.spanKey=", t.spanKey, "t.spanKey.npages=", t.spanKey.npages)
	throw("span and treap sizes do not match?")
	}
	if t.parent.left == t {
	root.rotateRight(t.parent)
	} else {
	if t.parent.right != t {
	throw("treap insert finds a broken treap")
	}
	root.rotateLeft(t.parent)
	}
	}
	}

	func (root mTreap) removeNode(t treapNode) {
	if t.spanKey.npages != t.npagesKey {
	throw("span and treap node npages do not match")
	}
	// Rotate t down to be leaf of tree for removal, respecting priorities.
	for t.right != nil \|\| t.left != nil {
	if t.right == nil \|\| t.left != nil && t.left.priority < t.right.priority {
	root.rotateRight(t)
	} else {
	root.rotateLeft(t)
	}
	}
	// Remove t, now a leaf.
	if t.parent != nil {
	if t.parent.left == t {
	t.parent.left = nil
	} else {
	t.parent.right = nil
	}
	} else {
	root.treap = nil
	}
	// Return the found treapNode's span after freeing the treapNode.
	mheap_.treapalloc.free(unsafe.Pointer(t))
	}

	// find searches for, finds, and returns the treap node containing the
	// smallest span that can hold npages. If no span has at least npages
	// it returns nil.
	// This is slightly more complicated than a simple binary tree search
	// since if an exact match is not found the next larger node is
	// returned.
	func (root mTreap) find(npages uintptr) treapNode {
	t := root.treap
	for t != nil {
	if t.spanKey == nil {
	throw("treap node with nil spanKey found")
	}
	if t.npagesKey < npages {
	t = t.right
	} else if t.left != nil && t.left.npagesKey >= npages {
	t = t.left
	} else {
	return t
	}
	}
	return nil
	}

	// removeSpan searches for, finds, deletes span along with
	// the associated treap node. If the span is not in the treap
	// then t will eventually be set to nil and the t.spanKey
	// will throw.
	func (root mTreap) removeSpan(span mspan) {
	npages := span.npages
	t := root.treap
	for t.spanKey != span {
	if t.npagesKey < npages {
	t = t.right
	} else if t.npagesKey > npages {
	t = t.left
	} else if t.spanKey.base() < span.base() {
	t = t.right
	} else if t.spanKey.base() > span.base() {
	t = t.left
	}
	}
	root.removeNode(t)
	}

	// erase removes the element referred to by the current position of the
	// iterator. This operation consumes the given iterator, so it should no
	// longer be used. It is up to the caller to get the next or previous
	// iterator before calling erase, if need be.
	func (root *mTreap) erase(i treapIter) {
	root.removeNode(i.t)
	}

	// rotateLeft rotates the tree rooted at node x.
	// turning (x a (y b c)) into (y (x a b) c).
	func (root mTreap) rotateLeft(x treapNode) {
	// p -> (x a (y b c))
	p := x.parent
	a, y := x.left, x.right
	b, c := y.left, y.right

	y.left = x
	x.parent = y
	y.right = c
	if c != nil {
	c.parent = y
	}
	x.left = a
	if a != nil {
	a.parent = x
	}
	x.right = b
	if b != nil {
	b.parent = x
	}

	y.parent = p
	if p == nil {
	root.treap = y
	} else if p.left == x {
	p.left = y
	} else {
	if p.right != x {
	throw("large span treap rotateLeft")
	}
	p.right = y
	}
	}

	// rotateRight rotates the tree rooted at node y.
	// turning (y (x a b) c) into (x a (y b c)).
	func (root mTreap) rotateRight(y treapNode) {
	// p -> (y (x a b) c)
	p := y.parent
	x, c := y.left, y.right
	a, b := x.left, x.right

	x.left = a
	if a != nil {
	a.parent = x
	}
	x.right = y
	y.parent = x
	y.left = b
	if b != nil {
	b.parent = y
	}
	y.right = c
	if c != nil {
	c.parent = y
	}

	x.parent = p
	if p == nil {
	root.treap = x
	} else if p.left == y {
	p.left = x
	} else {
	if p.right != y {
	throw("large span treap rotateRight")
	}
	p.right = x
	}
	}