I have successfully implemented a shunting yard algorithm in java. The algorithm itself was simple however I am having trouble with the tokenizer. Currently the algorithm works with everything I want excluding one thing. How can I tell the difference between subtraction(-) and negative (-)
such as 4-3 is subtraction but -4+3 is negative
I now know how to find out when it should be a negative and when it should be a minus, but where in the algorithm should it be placed because if you use it like a function it wont always work for example
3 + 4 * 2 / -( 1 − 5 ) ^ 2 ^ 3
when 1-5 becomes -4 it will become 4 before it gets squared and cubed
just like 3 + 4 * 2 / cos( 1 − 5 ) ^ 2 ^ 3 , you would take the cosine before squaring and cubing
but in real math you wouldn’t with a - because what your really saying is 3 + 4 * 2 / -(( 1 − 5 ) ^ 2 ^ 3) in order to have the right value
It sounds like you're doing a lex-then-parse style parser, where you're going to need a simple state machine in the lexer in order to get separate tokens for unary and binary minus. (In a PEG parser, this isn't something you have to worry about.)
In JavaCC, you would have a DEFAULT
state, where you would consider the -
character to be UNARY_MINUS
. When you tokenized the end of a primary expression (either a closing paren, or an integer, based on the examples you gave), then you would switch to the INFIX
state where -
would be considered to be INFIX_MINUS
. Once you encountered any infix operator, you would return to the DEFAULT
state.
If you're rolling your own, it might be a bit simpler than that. Look at this Python code for a clever way of doing it. Basically, when you encounter a -
, you just check to see if the previous token was an infix operator. That example uses the string "-u"
to represent the unary minus token, which is convenient for an informal tokenization. Best I can tell, the Python example does fail to handle case where a -
follows an open paren, or comes at the beginning of the input. Those should be considered unary as well.
In order for unary minus to be handled correctly in the shunting-yard algorithm itself, it needs to have higher precedence than any of the infix operators, and it needs to marked as right-associative. (Make sure you handle right-associativity. You may have left it out since the rest of your operators are left-associative.) This is clear enough in the Python code (although I would use some kind of struct rather than two separate maps).
When it comes time to evaluate, you will need to handle unary operators a little differently, since you only need to pop one number off the stack, rather than two. Depending on what your implementation looks like, it may be easier to just go through the list and replace every occurrence of "-u"
with [-1, "*"]
.
If you can follow Python at all, you should be able to see everything I'm talking about in the example I linked to. I find the code to be a bit easier to read than the C version that someone else mentioned. Also, if you're curious, I did a little write-up a while back about using shunting-yard in Ruby, but I handled unary operators as a separate nonterminal, so they are not shown.