Written by Reid Spencer
This document is another way to learn about LLVM. Unlike the LLVM Reference Manual or LLVM Programmer's Manual, here we learn about LLVM through the experience of creating a simple programming language named Stacker. Stacker was invented specifically as a demonstration of LLVM. The emphasis in this document is not on describing the intricacies of LLVM itself but on how to use it to build your own compiler system.
Amongst other things, LLVM is a platform for compiler writers. Because of its exceptionally clean and small IR (intermediate representation), compiler writing with LLVM is much easier than with other system. As proof, I wrote the entire compiler (language definition, lexer, parser, code generator, etc.) in about four days! That's important to know because it shows how quickly you can get a new language running when using LLVM. Furthermore, this was the first language the author ever created using LLVM. The learning curve is included in that four days.
The language described here, Stacker, is Forth-like. Programs are simple collections of word definitions, and the only thing definitions can do is manipulate a stack or generate I/O. Stacker is not a "real" programming language; it's very simple. Although it is computationally complete, you wouldn't use it for your next big project. However, the fact that it is complete, it's simple, and it doesn't have a C-like syntax make it useful for demonstration purposes. It shows that LLVM could be applied to a wide variety of languages.
The basic notions behind stacker is very simple. There's a stack of integers (or character pointers) that the program manipulates. Pretty much the only thing the program can do is manipulate the stack and do some limited I/O operations. The language provides you with several built-in words that manipulate the stack in interesting ways. To get your feet wet, here's how you write the traditional "Hello, World" program in Stacker:
: hello_world "Hello, World!" >s DROP CR ;
: MAIN hello_world ;
This has two "definitions" (Stacker manipulates words, not
functions and words have definitions): MAIN
and
hello_world
. The MAIN
definition is standard; it
tells Stacker where to start. Here, MAIN
is defined to
simply invoke the word hello_world
. The
hello_world
definition tells stacker to push the
"Hello, World!"
string on to the stack, print it out
(>s
), pop it off the stack (DROP
), and
finally print a carriage return (CR
). Although
hello_world
uses the stack, its net effect is null. Well
written Stacker definitions have that characteristic.
Exercise for the reader: how could you make this a one line program?
Stacker was written for two purposes:
During the development of Stacker, many lessons about LLVM were learned. Those lessons are described in the following subsections.
Although I knew that LLVM uses a Single Static Assignment (SSA) format, it wasn't obvious to me how prevalent this idea was in LLVM until I really started using it. Reading the Programmer's Manual and Language Reference, I noted that most of the important LLVM IR (Intermediate Representation) C++ classes were derived from the Value class. The full power of that simple design only became fully understood once I started constructing executable expressions for Stacker.
This really makes your programming go faster. Think about compiling code
for the following C/C++ expression: (a|b)*((x+1)/(y+1))
. Assuming
the values are on the stack in the order a, b, x, y, this could be
expressed in stacker as: 1 + SWAP 1 + / ROT2 OR *
.
You could write a function using LLVM that computes this expression like this:
Value*
expression(BasicBlock* bb, Value* a, Value* b, Value* x, Value* y )
{
Instruction* tail = bb->getTerminator();
ConstantSInt* one = ConstantSInt::get( Type::IntTy, 1);
BinaryOperator* or1 =
BinaryOperator::create( Instruction::Or, a, b, "", tail );
BinaryOperator* add1 =
BinaryOperator::create( Instruction::Add, x, one, "", tail );
BinaryOperator* add2 =
BinaryOperator::create( Instruction::Add, y, one, "", tail );
BinaryOperator* div1 =
BinaryOperator::create( Instruction::Div, add1, add2, "", tail);
BinaryOperator* mult1 =
BinaryOperator::create( Instruction::Mul, or1, div1, "", tail );
return mult1;
}
"Okay, big deal," you say? It is a big deal. Here's why. Note that I didn't
have to tell this function which kinds of Values are being passed in. They could be
Instruction
s, Constant
s, GlobalVariable
s, or
any of the other subclasses of Value
that LLVM supports.
Furthermore, if you specify Values that are incorrect for this sequence of
operations, LLVM will either notice right away (at compilation time) or the LLVM
Verifier will pick up the inconsistency when the compiler runs. In either case
LLVM prevents you from making a type error that gets passed through to the
generated program. This really helps you write a compiler that
always generates correct code!
The second point is that we don't have to worry about branching, registers, stack variables, saving partial results, etc. The instructions we create are the values we use. Note that all that was created in the above code is a Constant value and five operators. Each of the instructions is the resulting value of that instruction. This saves a lot of time.
The lesson is this: SSA form is very powerful: there is no difference between a value and the instruction that created it. This is fully enforced by the LLVM IR. Use it to your best advantage.
I had to learn about terminating blocks the hard way: using the debugger to figure out what the LLVM verifier was trying to tell me and begging for help on the LLVMdev mailing list. I hope you avoid this experience.
Emblazon this rule in your mind:
BasicBlock
s in your compiler must be
terminated with a terminating instruction (branch, return, etc.).
Terminating instructions are a semantic requirement of the LLVM IR. There is no facility for implicitly chaining together blocks placed into a function in the order they occur. Indeed, in the general case, blocks will not be added to the function in the order of execution because of the recursive way compilers are written.
Furthermore, if you don't terminate your blocks, your compiler code will compile just fine. You won't find out about the problem until you're running the compiler and the module you just created fails on the LLVM Verifier.
After a little initial fumbling around, I quickly caught on to how blocks should be constructed. In general, here's what I learned:
insert_before
argument. At first, I thought this was a mistake
because clearly the normal mode of inserting instructions would be one at
a time after some other instruction, not before. However,
if you hold on to your terminating instruction (or use the handy dandy
getTerminator()
method on a BasicBlock
), it can
always be used as the insert_before
argument to your instruction
constructors. This causes the instruction to automatically be inserted in
the RightPlace™ place, just before the terminating instruction. The
nice thing about this design is that you can pass blocks around and insert
new instructions into them without ever knowing what instructions came
before. This makes for some very clean compiler design.The foregoing is such an important principal, its worth making an idiom:
BasicBlock* bb = new BasicBlock(); bb->getInstList().push_back( new Branch( ... ) ); new Instruction(..., bb->getTerminator() );
To make this clear, consider the typical if-then-else statement (see StackerCompiler::handle_if() method). We can set this up in a single function using LLVM in the following way:
using namespace llvm; BasicBlock* MyCompiler::handle_if( BasicBlock* bb, SetCondInst* condition ) { // Create the blocks to contain code in the structure of if/then/else BasicBlock* then_bb = new BasicBlock(); BasicBlock* else_bb = new BasicBlock(); BasicBlock* exit_bb = new BasicBlock(); // Insert the branch instruction for the "if" bb->getInstList().push_back( new BranchInst( then_bb, else_bb, condition ) ); // Set up the terminating instructions then->getInstList().push_back( new BranchInst( exit_bb ) ); else->getInstList().push_back( new BranchInst( exit_bb ) ); // Fill in the then part .. details excised for brevity this->fill_in( then_bb ); // Fill in the else part .. details excised for brevity this->fill_in( else_bb ); // Return a block to the caller that can be filled in with the code // that follows the if/then/else construct. return exit_bb; }
Presumably in the foregoing, the calls to the "fill_in" method would add
the instructions for the "then" and "else" parts. They would use the third part
of the idiom almost exclusively (inserting new instructions before the
terminator). Furthermore, they could even recurse back to handle_if
should they encounter another if/then/else statement, and it will just work.
Note how cleanly this all works out. In particular, the push_back methods on
the BasicBlock
's instruction list. These are lists of type
Instruction
(which is also of type Value
). To create
the "if" branch we merely instantiate a BranchInst
that takes as
arguments the blocks to branch to and the condition to branch on. The
BasicBlock
objects act like branch labels! This new
BranchInst
terminates the BasicBlock
provided
as an argument. To give the caller a way to keep inserting after calling
handle_if
, we create an exit_bb
block which is
returned
to the caller. Note that the exit_bb
block is used as the
terminator for both the then_bb
and the else_bb
blocks. This guarantees that no matter what else handle_if
or fill_in
does, they end up at the exit_bb
block.
One of the first things I noticed is the frequent use of the "push_back" method on the various lists. This is so common that it is worth mentioning. The "push_back" inserts a value into an STL list, vector, array, etc. at the end. The method might have also been named "insert_tail" or "append". Although I've used STL quite frequently, my use of push_back wasn't very high in other programs. In LLVM, you'll use it all the time.
It took a little getting used to and several rounds of postings to the LLVM mailing list to wrap my head around this instruction correctly. Even though I had read the Language Reference and Programmer's Manual a couple times each, I still missed a few very key points:
This means that when you look up an element in the global variable (assuming it's a struct or array), you must deference the pointer first! For many things, this leads to the idiom:
std::vector<Value*> index_vector; index_vector.push_back( ConstantSInt::get( Type::LongTy, 0 ); // ... push other indices ... GetElementPtrInst* gep = new GetElementPtrInst( ptr, index_vector );
For example, suppose we have a global variable whose type is [24 x int]. The variable itself represents a pointer to that array. To subscript the array, we need two indices, not just one. The first index (0) dereferences the pointer. The second index subscripts the array. If you're a "C" programmer, this will run against your grain because you'll naturally think of the global array variable and the address of its first element as the same. That tripped me up for a while until I realized that they really do differ .. by type. Remember that LLVM is strongly typed. Everything has a type. The "type" of the global variable is [24 x int]*. That is, it's a pointer to an array of 24 ints. When you dereference that global variable with a single (0) index, you now have a "[24 x int]" type. Although the pointer value of the dereferenced global and the address of the zero'th element in the array will be the same, they differ in their type. The zero'th element has type "int" while the pointer value has type "[24 x int]".
Get this one aspect of LLVM right in your head, and you'll save yourself a lot of compiler writing headaches down the road.
Linkage types in LLVM can be a little confusing, especially if your compiler writing mind has affixed firm concepts to particular words like "weak", "external", "global", "linkonce", etc. LLVM does not use the precise definitions of, say, ELF or GCC, even though they share common terms. To be fair, the concepts are related and similar but not precisely the same. This can lead you to think you know what a linkage type represents but in fact it is slightly different. I recommend you read the Language Reference on this topic very carefully. Then, read it again.
Here are some handy tips that I discovered along the way:
Constants in LLVM took a little getting used to until I discovered a few utility functions in the LLVM IR that make things easier. Here's what I learned:
This section describes the Stacker language
Stacker definitions define what they do to the global stack. Before proceeding, a few words about the stack are in order. The stack is simply a global array of 32-bit integers or pointers. A global index keeps track of the location of the top of the stack. All of this is hidden from the programmer, but it needs to be noted because it is the foundation of the conceptual programming model for Stacker. When you write a definition, you are, essentially, saying how you want that definition to manipulate the global stack.
Manipulating the stack can be quite hazardous. There is no distinction given and no checking for the various types of values that can be placed on the stack. Automatic coercion between types is performed. In many cases, this is useful. For example, a boolean value placed on the stack can be interpreted as an integer with good results. However, using a word that interprets that boolean value as a pointer to a string to print out will almost always yield a crash. Stacker simply leaves it to the programmer to get it right without any interference or hindering on interpretation of the stack values. You've been warned. :)
Punctuation in Stacker is very simple. The colon and semi-colon characters are used to introduce and terminate a definition (respectively). Except for FORWARD declarations, definitions are all you can specify in Stacker. Definitions are read left to right. Immediately after the colon comes the name of the word being defined. The remaining words in the definition specify what the word does. The definition is terminated by a semi-colon.
So, your typical definition will have the form:
: name ... ;
The name
is up to you but it must start with a letter and contain
only letters, numbers, and underscore. Names are case sensitive and must not be
the same as the name of a built-in word. The ...
is replaced by
the stack manipulating words that you wish to define name
as.
Stacker supports two types of comments. A hash mark (#) starts a comment that extends to the end of the line. It is identical to the kind of comments commonly used in shell scripts. A pair of parentheses also surround a comment. In both cases, the content of the comment is ignored by the Stacker compiler. The following does nothing in Stacker.
# This is a comment to end of line
( This is an enclosed comment )
See the example program to see comments in use in a real program.
There are three kinds of literal values in Stacker: Integers, Strings,
and Booleans. In each case, the stack operation is to simply push the
value on to the stack. So, for example:
42 " is the answer." TRUE
will push three values on to the stack: the integer 42, the
string " is the answer.", and the boolean TRUE.
Each definition in Stacker is composed of a set of words. Words are read and executed in order from left to right. There is very little checking in Stacker to make sure you're doing the right thing with the stack. It is assumed that the programmer knows how the stack transformation he applies will affect the program.
Words in a definition come in two flavors: built-in and programmer defined. Simply mentioning the name of a previously defined or declared programmer-defined word causes that word's stack actions to be invoked. It is somewhat like a function call in other languages. The built-in words have various effects, described below.
Sometimes you need to call a word before it is defined. For this, you can
use the FORWARD
declaration. It looks like this:
FORWARD name ;
This simply states to Stacker that "name" is the name of a definition
that is defined elsewhere. Generally it means the definition can be found
"forward" in the file. But, it doesn't have to be in the current compilation
unit. Anything declared with FORWARD
is an external symbol for
linking.
The built-in words of the Stacker language are put in several groups depending on what they do. The groups are as follows:
While you may be familiar with many of these operations from other programming languages, a careful review of their semantics is important for correct programming in Stacker. Of most importance is the effect that each of these built-in words has on the global stack. The effect is not always intuitive. To better describe the effects, we'll borrow from Forth the idiom of describing the effect on the stack with:
BEFORE -- AFTER
That is, to the left of the -- is a representation of the stack before the operation. To the right of the -- is a representation of the stack after the operation. In the table below that describes the operation of each of the built in words, we will denote the elements of the stack using the following construction:
Definition Of Operation Of Built In Words | |||
LOGICAL OPERATIONS | |||
Word | Name | Operation | Description |
< | LT | w1 w2 -- b | Two values (w1 and w2) are popped off the stack and compared. If w1 is less than w2, TRUE is pushed back on the stack, otherwise FALSE is pushed back on the stack. |
> | GT | w1 w2 -- b | Two values (w1 and w2) are popped off the stack and compared. If w1 is greater than w2, TRUE is pushed back on the stack, otherwise FALSE is pushed back on the stack. |
>= | GE | w1 w2 -- b | Two values (w1 and w2) are popped off the stack and compared. If w1 is greater than or equal to w2, TRUE is pushed back on the stack, otherwise FALSE is pushed back on the stack. |
<= | LE | w1 w2 -- b | Two values (w1 and w2) are popped off the stack and compared. If w1 is less than or equal to w2, TRUE is pushed back on the stack, otherwise FALSE is pushed back on the stack. |
= | EQ | w1 w2 -- b | Two values (w1 and w2) are popped off the stack and compared. If w1 is equal to w2, TRUE is pushed back on the stack, otherwise FALSE is pushed back |
<> | NE | w1 w2 -- b | Two values (w1 and w2) are popped off the stack and compared. If w1 is equal to w2, TRUE is pushed back on the stack, otherwise FALSE is pushed back |
FALSE | FALSE | -- b | The boolean value FALSE (0) is pushed on to the stack. |
TRUE | TRUE | -- b | The boolean value TRUE (-1) is pushed on to the stack. |
BITWISE OPERATORS | |||
Word | Name | Operation | Description |
<< | SHL | w1 w2 -- w1<<w2 | Two values (w1 and w2) are popped off the stack. The w2 operand is shifted left by the number of bits given by the w1 operand. The result is pushed back to the stack. |
>> | SHR | w1 w2 -- w1>>w2 | Two values (w1 and w2) are popped off the stack. The w2 operand is shifted right by the number of bits given by the w1 operand. The result is pushed back to the stack. |
OR | OR | w1 w2 -- w2|w1 | Two values (w1 and w2) are popped off the stack. The values are bitwise OR'd together and pushed back on the stack. This is not a logical OR. The sequence 1 2 OR yields 3 not 1. |
AND | AND | w1 w2 -- w2&w1 | Two values (w1 and w2) are popped off the stack. The values are bitwise AND'd together and pushed back on the stack. This is not a logical AND. The sequence 1 2 AND yields 0 not 1. |
XOR | XOR | w1 w2 -- w2^w1 | Two values (w1 and w2) are popped off the stack. The values are bitwise exclusive OR'd together and pushed back on the stack. For example, The sequence 1 3 XOR yields 2. |
ARITHMETIC OPERATORS | |||
Word | Name | Operation | Description |
ABS | ABS | w -- |w| | One value s popped off the stack; its absolute value is computed and then pushed on to the stack. If w1 is -1 then w2 is 1. If w1 is 1 then w2 is also 1. |
NEG | NEG | w -- -w | One value is popped off the stack which is negated and then pushed back on to the stack. If w1 is -1 then w2 is 1. If w1 is 1 then w2 is -1. |
+ | ADD | w1 w2 -- w2+w1 | Two values are popped off the stack. Their sum is pushed back on to the stack |
- | SUB | w1 w2 -- w2-w1 | Two values are popped off the stack. Their difference is pushed back on to the stack |
* | MUL | w1 w2 -- w2*w1 | Two values are popped off the stack. Their product is pushed back on to the stack |
/ | DIV | w1 w2 -- w2/w1 | Two values are popped off the stack. Their quotient is pushed back on to the stack |
MOD | MOD | w1 w2 -- w2%w1 | Two values are popped off the stack. Their remainder after division of w1 by w2 is pushed back on to the stack |
*/ | STAR_SLAH | w1 w2 w3 -- (w3*w2)/w1 | Three values are popped off the stack. The product of w1 and w2 is divided by w3. The result is pushed back on to the stack. |
++ | INCR | w -- w+1 | One value is popped off the stack. It is incremented by one and then pushed back on to the stack. |
-- | DECR | w -- w-1 | One value is popped off the stack. It is decremented by one and then pushed back on to the stack. |
MIN | MIN | w1 w2 -- (w2<w1?w2:w1) | Two values are popped off the stack. The larger one is pushed back on to the stack. |
MAX | MAX | w1 w2 -- (w2>w1?w2:w1) | Two values are popped off the stack. The larger value is pushed back on to the stack. |
STACK MANIPULATION OPERATORS | |||
Word | Name | Operation | Description |
DROP | DROP | w -- | One value is popped off the stack. |
DROP2 | DROP2 | w1 w2 -- | Two values are popped off the stack. |
NIP | NIP | w1 w2 -- w2 | The second value on the stack is removed from the stack. That is, a value is popped off the stack and retained. Then a second value is popped and the retained value is pushed. |
NIP2 | NIP2 | w1 w2 w3 w4 -- w3 w4 | The third and fourth values on the stack are removed from it. That is, two values are popped and retained. Then two more values are popped and the two retained values are pushed back on. |
DUP | DUP | w1 -- w1 w1 | One value is popped off the stack. That value is then pushed on to the stack twice to duplicate the top stack vaue. |
DUP2 | DUP2 | w1 w2 -- w1 w2 w1 w2 | The top two values on the stack are duplicated. That is, two vaues are popped off the stack. They are alternately pushed back on the stack twice each. |
SWAP | SWAP | w1 w2 -- w2 w1 | The top two stack items are reversed in their order. That is, two values are popped off the stack and pushed back on to the stack in the opposite order they were popped. |
SWAP2 | SWAP2 | w1 w2 w3 w4 -- w3 w4 w2 w1 | The top four stack items are swapped in pairs. That is, two values are popped and retained. Then, two more values are popped and retained. The values are pushed back on to the stack in the reverse order but in pairs. |
OVER | OVER | w1 w2-- w1 w2 w1 | Two values are popped from the stack. They are pushed back on to the stack in the order w1 w2 w1. This seems to cause the top stack element to be duplicated "over" the next value. |
OVER2 | OVER2 | w1 w2 w3 w4 -- w1 w2 w3 w4 w1 w2 | The third and fourth values on the stack are replicated on to the top of the stack |
ROT | ROT | w1 w2 w3 -- w2 w3 w1 | The top three values are rotated. That is, three value are popped off the stack. They are pushed back on to the stack in the order w1 w3 w2. |
ROT2 | ROT2 | w1 w2 w3 w4 w5 w6 -- w3 w4 w5 w6 w1 w2 | Like ROT but the rotation is done using three pairs instead of three singles. |
RROT | RROT | w1 w2 w3 -- w2 w3 w1 | Reverse rotation. Like ROT, but it rotates the other way around. Essentially, the third element on the stack is moved to the top of the stack. |
RROT2 | RROT2 | w1 w2 w3 w4 w5 w6 -- w3 w4 w5 w6 w1 w2 | Double reverse rotation. Like RROT but the rotation is done using three pairs instead of three singles. The fifth and sixth stack elements are moved to the first and second positions |
TUCK | TUCK | w1 w2 -- w2 w1 w2 | Similar to OVER except that the second operand is being replicated. Essentially, the first operand is being "tucked" in between two instances of the second operand. Logically, two values are popped off the stack. They are placed back on the stack in the order w2 w1 w2. |
TUCK2 | TUCK2 | w1 w2 w3 w4 -- w3 w4 w1 w2 w3 w4 | Like TUCK but a pair of elements is tucked over two pairs. That is, the top two elements of the stack are duplicated and inserted into the stack at the fifth and positions. |
PICK | PICK | x0 ... Xn n -- x0 ... Xn x0 | The top of the stack is used as an index into the remainder of the stack. The element at the nth position replaces the index (top of stack). This is useful for cycling through a set of values. Note that indexing is zero based. So, if n=0 then you get the second item on the stack. If n=1 you get the third, etc. Note also that the index is replaced by the n'th value. |
SELECT | SELECT | m n X0..Xm Xm+1 .. Xn -- Xm | This is like PICK but the list is removed and you need to specify both the index and the size of the list. Careful with this one, the wrong value for n can blow away a huge amount of the stack. |
ROLL | ROLL | x0 x1 .. xn n -- x1 .. xn x0 | Not Implemented. This one has been left as an exercise to the student. See Exercise. ROLL requires a value, "n", to be on the top of the stack. This value specifies how far into the stack to "roll". The n'th value is moved (not copied) from its location and replaces the "n" value on the top of the stack. In this way, all the values between "n" and x0 roll up the stack. The operation of ROLL is a generalized ROT. The "n" value specifies how much to rotate. That is, ROLL with n=1 is the same as ROT and ROLL with n=2 is the same as ROT2. |
MEMORY OPERATORS | |||
Word | Name | Operation | Description |
MALLOC | MALLOC | w1 -- p | One value is popped off the stack. The value is used as the size of a memory block to allocate. The size is in bytes, not words. The memory allocation is completed and the address of the memory block is pushed on to the stack. |
FREE | FREE | p -- | One pointer value is popped off the stack. The value should be
the address of a memory block created by the MALLOC operation. The
associated memory block is freed. Nothing is pushed back on the
stack. Many bugs can be created by attempting to FREE something
that isn't a pointer to a MALLOC allocated memory block. Make
sure you know what's on the stack. One way to do this is with
the following idiom:64 MALLOC DUP DUP (use ptr) DUP (use ptr) ... FREE
This ensures that an extra copy of the pointer is placed on the stack (for the FREE at the end) and that every use of the pointer is preceded by a DUP to retain the copy for FREE. |
GET | GET | w1 p -- w2 p | An integer index and a pointer to a memory block are popped of the block. The index is used to index one byte from the memory block. That byte value is retained, the pointer is pushed again and the retained value is pushed. Note that the pointer value s essentially retained in its position so this doesn't count as a "use ptr" in the FREE idiom. |
PUT | PUT | w1 w2 p -- p | An integer value is popped of the stack. This is the value to be put into a memory block. Another integer value is popped of the stack. This is the indexed byte in the memory block. A pointer to the memory block is popped off the stack. The first value (w1) is then converted to a byte and written to the element of the memory block(p) at the index given by the second value (w2). The pointer to the memory block is pushed back on the stack so this doesn't count as a "use ptr" in the FREE idiom. |
CONTROL FLOW OPERATORS | |||
Word | Name | Operation | Description |
RETURN | RETURN | -- | The currently executing definition returns immediately to its caller.
Note that there is an implicit RETURN at the end of each
definition, logically located at the semi-colon. The sequence
RETURN ; is valid but redundant. |
EXIT | EXIT | w1 -- | A return value for the program is popped off the stack. The program is
then immediately terminated. This is normally an abnormal exit from the
program. For a normal exit (when MAIN finishes), the exit
code will always be zero in accordance with UNIX conventions. |
RECURSE | RECURSE | -- | The currently executed definition is called again. This operation is
needed since the definition of a word doesn't exist until the semi colon
is reacher. Attempting something like: : recurser recurser ; will yield and error saying that "recurser" is not defined yet. To accomplish the same thing, change this to: : recurser RECURSE ; |
IF (words...) ENDIF | IF (words...) ENDIF | b -- | A boolean value is popped of the stack. If it is non-zero then the "words..." are executed. Otherwise, execution continues immediately following the ENDIF. |
IF (words...) ELSE (words...) ENDIF | IF (words...) ELSE (words...) ENDIF | b -- | A boolean value is popped of the stack. If it is non-zero then the "words..." between IF and ELSE are executed. Otherwise the words between ELSE and ENDIF are executed. In either case, after the (words....) have executed, execution continues immediately following the ENDIF. |
WHILE (words...) END | WHILE (words...) END | b -- b | The boolean value on the top of the stack is examined. If it is non-zero then the
"words..." between WHILE and END are executed. Execution then begins again at the WHILE where another
boolean is popped off the stack. To prevent this operation from eating up the entire
stack, you should push on to the stack (just before the END) a boolean value that indicates
whether to terminate. Note that since booleans and integers can be coerced you can
use the following "for loop" idiom:(push count) WHILE (words...) -- END For example: 10 WHILE DUP >d -- END This will print the numbers from 10 down to 1. 10 is pushed on the stack. Since that is non-zero, the while loop is entered. The top of the stack (10) is duplicated and then printed out with >d. The top of the stack is decremented, yielding 9 and control is transfered back to the WHILE keyword. The process starts all over again and repeats until the top of stack is decremented to 0 at which the WHILE test fails and control is transfered to the word after the END. |
INPUT & OUTPUT OPERATORS | |||
Word | Name | Operation | Description |
SPACE | SPACE | -- | A space character is put out. There is no stack effect. |
TAB | TAB | -- | A tab character is put out. There is no stack effect. |
CR | CR | -- | A carriage return character is put out. There is no stack effect. |
>s | OUT_STR | -- | A string pointer is popped from the stack. It is put out. |
>d | OUT_STR | -- | A value is popped from the stack. It is put out as a decimal integer. |
>c | OUT_CHR | -- | A value is popped from the stack. It is put out as an ASCII character. |
<s | IN_STR | -- s | A string is read from the input via the scanf(3) format string " %as". The resulting string is pushed on to the stack. |
<d | IN_STR | -- w | An integer is read from the input via the scanf(3) format string " %d". The resulting value is pushed on to the stack |
<c | IN_CHR | -- w | A single character is read from the input via the scanf(3) format string " %c". The value is converted to an integer and pushed on to the stack. |
DUMP | DUMP | -- | The stack contents are dumped to standard output. This is useful for debugging your definitions. Put DUMP at the beginning and end of a definition to see instantly the net effect of the definition. |
The following fully documented program highlights many features of both the Stacker language and what is possible with LLVM. The program has two modes of operation. If you provide numeric arguments to the program, it checks to see if those arguments are prime numbers and prints out the results. Without any arguments, the program prints out any prime numbers it finds between 1 and one million (there's a lot of them!). The source code comments below tell the remainder of the story.
################################################################################
#
# Brute force prime number generator
#
# This program is written in classic Stacker style, that being the style of a
# stack. Start at the bottom and read your way up !
#
# Reid Spencer - Nov 2003
################################################################################
# Utility definitions
################################################################################
: print >d CR ;
: it_is_a_prime TRUE ;
: it_is_not_a_prime FALSE ;
: continue_loop TRUE ;
: exit_loop FALSE;
################################################################################
# This definition tries an actual division of a candidate prime number. It
# determines whether the division loop on this candidate should continue or
# not.
# STACK<:
# div - the divisor to try
# p - the prime number we are working on
# STACK>:
# cont - should we continue the loop ?
# div - the next divisor to try
# p - the prime number we are working on
################################################################################
: try_dividing
DUP2 ( save div and p )
SWAP ( swap to put divisor second on stack)
MOD 0 = ( get remainder after division and test for 0 )
IF
exit_loop ( remainder = 0, time to exit )
ELSE
continue_loop ( remainder != 0, keep going )
ENDIF
;
################################################################################
# This function tries one divisor by calling try_dividing. But, before doing
# that it checks to see if the value is 1. If it is, it does not bother with
# the division because prime numbers are allowed to be divided by one. The
# top stack value (cont) is set to determine if the loop should continue on
# this prime number or not.
# STACK<:
# cont - should we continue the loop (ignored)?
# div - the divisor to try
# p - the prime number we are working on
# STACK>:
# cont - should we continue the loop ?
# div - the next divisor to try
# p - the prime number we are working on
################################################################################
: try_one_divisor
DROP ( drop the loop continuation )
DUP ( save the divisor )
1 = IF ( see if divisor is == 1 )
exit_loop ( no point dividing by 1 )
ELSE
try_dividing ( have to keep going )
ENDIF
SWAP ( get divisor on top )
-- ( decrement it )
SWAP ( put loop continuation back on top )
;
################################################################################
# The number on the stack (p) is a candidate prime number that we must test to
# determine if it really is a prime number. To do this, we divide it by every
# number from one p-1 to 1. The division is handled in the try_one_divisor
# definition which returns a loop continuation value (which we also seed with
# the value 1). After the loop, we check the divisor. If it decremented all
# the way to zero then we found a prime, otherwise we did not find one.
# STACK<:
# p - the prime number to check
# STACK>:
# yn - boolean indicating if its a prime or not
# p - the prime number checked
################################################################################
: try_harder
DUP ( duplicate to get divisor value ) )
-- ( first divisor is one less than p )
1 ( continue the loop )
WHILE
try_one_divisor ( see if its prime )
END
DROP ( drop the continuation value )
0 = IF ( test for divisor == 1 )
it_is_a_prime ( we found one )
ELSE
it_is_not_a_prime ( nope, this one is not a prime )
ENDIF
;
################################################################################
# This definition determines if the number on the top of the stack is a prime
# or not. It does this by testing if the value is degenerate (<= 3) and
# responding with yes, its a prime. Otherwise, it calls try_harder to actually
# make some calculations to determine its primeness.
# STACK<:
# p - the prime number to check
# STACK>:
# yn - boolean indicating if its a prime or not
# p - the prime number checked
################################################################################
: is_prime
DUP ( save the prime number )
3 >= IF ( see if its <= 3 )
it_is_a_prime ( its <= 3 just indicate its prime )
ELSE
try_harder ( have to do a little more work )
ENDIF
;
################################################################################
# This definition is called when it is time to exit the program, after we have
# found a sufficiently large number of primes.
# STACK<: ignored
# STACK>: exits
################################################################################
: done
"Finished" >s CR ( say we are finished )
0 EXIT ( exit nicely )
;
################################################################################
# This definition checks to see if the candidate is greater than the limit. If
# it is, it terminates the program by calling done. Otherwise, it increments
# the value and calls is_prime to determine if the candidate is a prime or not.
# If it is a prime, it prints it. Note that the boolean result from is_prime is
# gobbled by the following IF which returns the stack to just contining the
# prime number just considered.
# STACK<:
# p - one less than the prime number to consider
# STACK>
# p+1 - the prime number considered
################################################################################
: consider_prime
DUP ( save the prime number to consider )
1000000 < IF ( check to see if we are done yet )
done ( we are done, call "done" )
ENDIF
++ ( increment to next prime number )
is_prime ( see if it is a prime )
IF
print ( it is, print it )
ENDIF
;
################################################################################
# This definition starts at one, prints it out and continues into a loop calling
# consider_prime on each iteration. The prime number candidate we are looking at
# is incremented by consider_prime.
# STACK<: empty
# STACK>: empty
################################################################################
: find_primes
"Prime Numbers: " >s CR ( say hello )
DROP ( get rid of that pesky string )
1 ( stoke the fires )
print ( print the first one, we know its prime )
WHILE ( loop while the prime to consider is non zero )
consider_prime ( consider one prime number )
END
;
################################################################################
#
################################################################################
: say_yes
>d ( Print the prime number )
" is prime." ( push string to output )
>s ( output it )
CR ( print carriage return )
DROP ( pop string )
;
: say_no
>d ( Print the prime number )
" is NOT prime." ( push string to put out )
>s ( put out the string )
CR ( print carriage return )
DROP ( pop string )
;
################################################################################
# This definition processes a single command line argument and determines if it
# is a prime number or not.
# STACK<:
# n - number of arguments
# arg1 - the prime numbers to examine
# STACK>:
# n-1 - one less than number of arguments
# arg2 - we processed one argument
################################################################################
: do_one_argument
-- ( decrement loop counter )
SWAP ( get the argument value )
is_prime IF ( determine if its prime )
say_yes ( uhuh )
ELSE
say_no ( nope )
ENDIF
DROP ( done with that argument )
;
################################################################################
# The MAIN program just prints a banner and processes its arguments.
# STACK<:
# n - number of arguments
# ... - the arguments
################################################################################
: process_arguments
WHILE ( while there are more arguments )
do_one_argument ( process one argument )
END
;
################################################################################
# The MAIN program just prints a banner and processes its arguments.
# STACK<: arguments
################################################################################
: MAIN
NIP ( get rid of the program name )
-- ( reduce number of arguments )
DUP ( save the arg counter )
1 <= IF ( See if we got an argument )
process_arguments ( tell user if they are prime )
ELSE
find_primes ( see how many we can find )
ENDIF
0 ( push return code )
;
This section is under construction.
In the mean time, you can always read the code! It has comments!
The source code, test programs, and sample programs can all be found under the LLVM "projects" directory. You will need to obtain the LLVM sources to find it (either via anonymous CVS or a tarball. See the Getting Started document).
Under the "projects" directory there is a directory named "Stacker". That directory contains everything, as follows:
See projects/Stacker/lib/compiler/Lexer.l
See projects/Stacker/lib/compiler/StackerParser.y
See projects/Stacker/lib/compiler/StackerCompiler.cpp
See projects/Stacker/lib/runtime/stacker_rt.c
See projects/Stacker/tools/stkrc/stkrc.cpp
See projects/Stacker/test/*.st
As you may have noted from a careful inspection of the Built-In word definitions, the ROLL word is not implemented. This word was left out of Stacker on purpose so that it can be an exercise for the student. The exercise is to implement the ROLL functionality (in your own workspace) and build a test program for it. If you can implement ROLL, you understand Stacker and probably a fair amount about LLVM since this is one of the more complicated Stacker operations. The work will almost be completely limited to the compiler.
The ROLL word is already recognized by both the lexer and parser but ignored
by the compiler. That means you don't have to futz around with figuring out how
to get the keyword recognized. It already is. The part of the compiler that
you need to implement is the ROLL
case in the
StackerCompiler::handle_word(int)
method.
Good luck!
The initial implementation of Stacker has several deficiencies. If you're interested, here are some things that could be implemented better: