Depsets are a specialized data structure for efficiently collecting data across a target’s transitive dependencies. Since this use case concerns the analysis phase, depsets are useful for authors of rules and aspects, but probably not macros.
The main feature of depsets is that they support a time- and space-efficient merge operation, whose cost is independent of the size of the existing contents. Depsets also have well-defined ordering semantics.
Example uses of depsets include:
storing the paths of all object files for a program’s libraries, which can then be passed to a linker action
for an interpreted language, storing the transitive source files that will be included in an executable's runfiles
If you don't need the merge operation, consider using another type, such as list or dict.
This example is available at https://github.com/bazelbuild/examples/tree/master/rules/depsets.
Suppose we have a hypothetical interpreted language Foo. In order to build each foo_binary
we need to know all the *.foo
files that it directly or indirectly depends on.
# //depsets:BUILD load(":foo.bzl", "foo_library", "foo_binary") # Our hypothetical Foo compiler. py_binary( name = "foocc", srcs = ["foocc.py"], ) foo_library( name = "a", srcs = ["a.foo", "a_impl.foo"], ) foo_library( name = "b", srcs = ["b.foo", "b_impl.foo"], deps = [":a"], ) foo_library( name = "c", srcs = ["c.foo", "c_impl.foo"], deps = [":a"], ) foo_binary( name = "d", srcs = ["d.foo"], deps = [":b", ":c"], )
# //depsets:foocc.py # "Foo compiler" that just concatenates its inputs to form its output. import sys if __name__ == "__main__": assert len(sys.argv) >= 1 output = open(sys.argv[1], "wt") for path in sys.argv[2:]: input = open(path, "rt") output.write(input.read())
Here, the transitive sources of the binary d
are all of the *.foo
files in the srcs
fields of a
, b
, c
, and d
. In order for the foo_binary
target to know about any file besides d.foo
, the foo_library
targets need to pass them along in a provider. Each library receives the providers from its own dependencies, adds its own immediate sources, and passes on a new provider with the augmented contents. The foo_binary
rule does the same, except that instead of returning a provider, it uses the complete list of sources to construct a command line for an action.
Here’s a complete implementation of the foo_library
and foo_binary
rules.
# //depsets/foo.bzl # A provider with one field, transitive_sources. FooFiles = provider(fields = ["transitive_sources"]) def get_transitive_srcs(srcs, deps): """Obtain the source files for a target and its transitive dependencies. Args: srcs: a list of source files deps: a list of targets that are direct dependencies Returns: a collection of the transitive sources """ return depset( srcs, transitive = [dep[FooFiles].transitive_sources for dep in deps]) def _foo_library_impl(ctx): trans_srcs = get_transitive_srcs(ctx.files.srcs, ctx.attr.deps) return [FooFiles(transitive_sources=trans_srcs)] foo_library = rule( implementation = _foo_library_impl, attrs = { "srcs": attr.label_list(allow_files=True), "deps": attr.label_list(), }, ) def _foo_binary_impl(ctx): foocc = ctx.executable._foocc out = ctx.outputs.out trans_srcs = get_transitive_srcs(ctx.files.srcs, ctx.attr.deps) srcs_list = trans_srcs.to_list() ctx.actions.run(executable = foocc, arguments = [out.path] + [src.path for src in srcs_list], inputs = srcs_list + [foocc], outputs = [out]) foo_binary = rule( implementation = _foo_binary_impl, attrs = { "srcs": attr.label_list(allow_files=True), "deps": attr.label_list(), "_foocc": attr.label(default=Label("//depsets:foocc"), allow_files=True, executable=True, cfg="host") }, outputs = {"out": "%{name}.out"}, )
You can test this by copying these files into a fresh package, renaming the labels appropriately, creating the source *.foo
files with dummy content, and building the d
target.
Conceptually, a depset is a directed acyclic graph (DAG) that typically looks similar to the target graph. It is constructed from the leaves up to the root. Each target in a dependency chain can add its own contents on top of the previous without having to read or copy them.
Each node in the DAG holds a list of direct elements and a list of child nodes. The contents of the depset are the transitive elements, i.e. the direct elements of all the nodes. A new depset can be created using the depset constructor: it accepts a list of direct elements and another list of child nodes.
s = depset(["a", "b", "c"]) t = depset(["d", "e"], transitive = [s]) print(s) # depset(["a", "b", "c"]) print(t) # depset(["d", "e", "a", "b", "c"])
To retrieve the contents of a depset, use the to_list() method. It returns a list of all transitive elements, not including duplicates. There is no way to directly inspect the precise structure of the DAG, although this structure does affect the order in which the elements are returned.
s = depset(["a", "b", "c"]) print("c" in s.to_list()) # True print(s.to_list() == ["a", "b", "c"]) # True
The allowed items in a depset are restricted, just as the allowed keys in dictionaries are restricted. In particular, depset contents may not be mutable.
Depsets use reference equality: a depset is equal to itself, but unequal to any other depset, even if they have the same contents and same internal structure.
s = depset(["a", "b", "c"]) t = s print(s == t) # True t = depset(["a", "b", "c"]) print(s == t) # False d = {} d[s] = None d[t] = None print(len(d)) # 2
To compare depsets by their contents, convert them to sorted lists.
s = depset(["a", "b", "c"]) t = depset(["c", "b", "a"]) print(sorted(s.to_list()) == sorted(t.to_list())) # True
There is no ability to remove elements from a depset. If this is needed, you must read out the entire contents of the depset, filter the elements you want to remove, and reconstruct a new depset. This is not particularly efficient.
s = depset(["a", "b", "c"]) t = depset(["b", "c"]) # Compute set difference s - t. Precompute t.to_list() so it's not done # in a loop, and convert it to a dictionary for fast membership tests. t_items = {e: None for e in t.to_list()} diff_items = [x for x in s.to_list() if x not in t_items] # Convert back to depset if it's still going to be used for merge operations. s = depset(diff_items) print(s) # depset(["a"])
The to_list
operation performs a traversal over the DAG. The kind of traversal depends on the order that was specified at the time the depset was constructed. It is useful for Bazel to support multiple orders because sometimes tools care about the order of their inputs. For example, a linker action may need to ensure that if B
depends on A
, then A.o
comes before B.o
on the linker’s command line. Other tools might have the opposite requirement.
Three traversal orders are supported: postorder
, preorder
, and topological
. The first two work exactly like tree traversals except that they operate on DAGs and skip already visited nodes. The third order works as a topological sort from root to leaves, essentially the same as preorder except that shared children are listed only after all of their parents. Preorder and postorder operate as left-to-right traversals, but note that within each node direct elements have no order relative to children. For topological order, there is no left-to-right guarantee, and even the all-parents-before-child guarantee does not apply in the case that there are duplicate elements in different nodes of the DAG.
# This demonstrates different traversal orders. def create(order): cd = depset(["c", "d"], order = order) gh = depset(["g", "h"], order = order) return depset(["a", "b", "e", "f"], transitive = [cd, gh]) print(create("postorder").to_list()) # ["c", "d", "g", "h", "a", "b", "e", "f"] print(create("preorder").to_list()) # ["a", "b", "e", "f", "c", "d", "g", "h"]
# This demonstrates different orders on a diamond graph. def create(order): a = depset(["a"], order=order) b = depset(["b"], transitive = [a], order = order) c = depset(["c"], transitive = [a], order = order) d = depset(["d"], transitive = [b, c], order = order) return d print(create("postorder").to_list()) # ["a", "b", "c", "d"] print(create("preorder").to_list()) # ["d", "b", "a", "c"] print(create("topological").to_list()) # ["d", "b", "c", "a"]
Due to how traversals are implemented, the order must be specified at the time the depset is created with the constructor’s order
keyword argument. If this argument is omitted, the depset has the special default
order, in which case there are no guarantees about the order of any of its elements (except that it is deterministic).
For safety, depsets with different orders cannot be merged with the +
operator unless one of them uses the default order; the resulting depset’s order is the same as the left operand. Note that when two depsets of different order are merged in this way, the child may appear to have had its elements rearranged when it is traversed via the parent. The +
operator is deprecated, anyway; use the transitive
argument instead.
To see the motivation for using depsets, consider what would have happened if we had implemented get_transitive_srcs()
without them. A naive way of writing this function would be to collect the sources in a list.
def get_transitive_srcs(srcs, deps): trans_srcs = [] for dep in deps: trans_srcs += dep[FooFiles].transitive_sources trans_srcs += srcs return trans_srcs
However, this does not take into account duplicates, so the source files for a
will appear twice on the command line and twice in the contents of the output file.
The next alternative is using a general set, which can be simulated by a dictionary where the keys are the elements and all the keys map to True
.
def get_transitive_srcs(srcs, deps): trans_srcs = {} for dep in deps: for file in dep[FooFiles].transitive_sources: trans_srcs[file] = True for file in srcs: trans_srcs[file] = True return trans_srcs
This gets rid of the duplicates, but it makes the order of the command line arguments (and therefore the contents of the files) unspecified, although still deterministic.
Moreover, both this approach and the list-based one are asymptotically worse than the depset-based approach. Consider the case where there is a long chain of dependencies on Foo libraries. Processing every rule requires copying all of the transitive sources that came before it into a new data structure. This means that the time and space cost for analyzing an individual library or binary target is proportional to its own height in the chain. For a chain of length n, foolib_1 ← foolib_2 ← … ← foolib_n, the overall cost is effectively the triangle sum 1 + 2 + … + n, which is O(n^2). This cost is wasteful because the library rule’s behavior is not actually affected by the transitive sources.
Generally speaking, depsets should be used whenever you are accumulating more and more information through your transitive dependencies. This helps ensure that your build scales well as your target graph grows deeper. The exact advantage will depend on how deep the target graph is and how many elements per target are added.
To actually get the performance advantage, it’s important to not retrieve the contents of the depset unnecessarily in library rules. One call to to_list()
at the end in a binary rule is fine, since the overall cost is just O(n). It’s when many non-terminal targets try to call to_list()
that we start to get into quadratic behavior.
The API for depsets is being updated to be more consistent. Here are some recent and/or upcoming changes.
When it‘s necessary to retrieve a depset’s contents, this should be done by explicitly converting the depset to a list via its to_list()
method. Do not iterate directly over the depset itself; direct iteration is deprecated and will be removed. For example, don't use list(...)
, sorted(...)
, or other functions expecting an iterable, on depsets. The rationale of this change is that iterating over depsets is generally expensive, and expensive operations should be made obvious in code.
Depset elements currently must have the same type, e.g. all ints or all strings. This restriction will be lifted.
A merge operation should be done by using the transitive
argument in the depset constructor. All other methods (|
and +
operators, and the union
method) are deprecated and will be going away.