Obviously the standard says nothing about this, but I'm interested m开发者_开发问答ore from a practical/historical standpoint: did systems with non-twos-complement arithmetic use a plain char
type that's unsigned? Otherwise you have potentially all sorts of weirdness, like two representations for the null terminator, and the inability to represent all "byte" values in char
. Do/did systems this weird really exist?
The null character used to terminate strings could never have two representations. It's defined like so (even in C90):
A byte with all bits set to 0, called the null character, shall exist in the basic execution character set
So a 'negative zero' on a ones-complement wouldn't do.
That said, I really don't know much of anything about non-two's complement C implementations. I used a one's-complement machine way back when in university, but don't remember much about it (and even if I cared about the standard back then, it was before it existed).
It's true, for the first 10 or 20 years of commercially produced computers (the 1950's and 60's) there were, apparently, some disagreements on how to represent negative numbers in binary. There were actually three contenders:
- Two's complement, which not only won the war but also drove the others to extinction
- One's complement,
-x == ~x
- Sign-magnitude,
-x = x ^ 0x80000000
I think the last important ones-complement machine was probably the CDC-6600, at the time, the fastest machine on earth and the immediate predecessor of the first supercomputer.1.
Unfortunately, your question cannot really be answered, not because no one here knows the answer :-) but because the choice never had to be made. And this was for actually two reasons:
Two's complement took over simultaneously with byte machines. Byte addressing hit the world with the twos-complement IBM System/360. Previous machines had no bytes, only complete words had addresses. Sometimes programmers would pack characters inside these words and sometimes they would just use the whole word. (Word length varied from 12 bits to 60.)
C was not invented until a decade after the byte machines and two's complement transition. Item #1 happened in the 1960's, C first appeared on small machines in the 1970's and did not take over the world until the 1980's.
So there simply never was a time when a machine had signed bytes, a C compiler, and something other than a twos-complement data format. The idea of null-terminated strings was probably a repeatedly-invented design pattern thought up by one assembly language programmer after another, but I don't know that it was specified by a compiler until the C era.
In any case, the first actually standardized C ("C89") simply specifies "a byte or code of value zero is appended" and it is clear from the context that they were trying to be number-format independent. So, "+0" is a theoretical answer, but it may never really have existed in practice.
1. The 6600 was one of the most important machines historically, and not just because it was fast. Designed by Seymour Cray himself, it introduced out-of-order execution and various other elements later collectively called "RISC". Although others tried to claimed credit, Seymour Cray is the real inventor of the RISC architecture. There is no dispute that he invented the supercomputer. It's actually hard to name a past "supercomputer" that he didn't design.
I believe it would be almost but not quite possible for a system to have a one's-complement 'char' type, but there are four problems which cannot all be resolved:
- Every data type must be representable as a sequence of char, such that if all the char values comprising two objects compare identical, the data objects containing in question will be identical.
- Every data type must likewise be representable as a sequence of 'unsigned char'.
- The unsigned char values into which any data type can be decomposed must form a group whose order is a power of two.
- I don't believe the standard permits a one's-complement machine to special-case the value that would be negative zero and make it behave as something else.
It might be possible to have a standards-compliant machine with a one's-complement or sign-magnitude "char" type if the only way to get a negative zero would be by overlaying some other data type, and if negative zero compared unequal to positive zero. I'm not sure if that could be standards-compliant or not.
EDIT
BTW, if requirement #2 were relaxed, I wonder what the exact requirements would be when overlaying other data types onto 'char'? Among other things, while the standard makes it abundantly clear that one must be able to perform assignments and comparisons on any 'char' values that may result from overlaying another variable onto a 'char', I don't know that it imposes any requirement that all such values must behave as an arithmetic group. For example, I wonder what the legality would be of a machine in which every memory location was physically stored as 66 bits, with the top two bits indicating whether the value was a 64-bit integer, a 32-bit memory handle plus a 32-bit offset, or a 64-bit double-precision floating-point number? Since the standard allows implementations to do anything they like when an arithmetic computation exceeds the range of a signed type, that would suggest that signed types do not necessarily have to behave as a group.
For most signed types, there's no requirement that the type be unable to represent any numbers outside the range specified in limits.h; if limits.h specifies that the minimum "int" is -32767, then it would be perfectly legitimate for an implementation to in fact allow a value of -32768 since any program that tried to do so would invoke Undefined Behavior. The key question would probably be whether it would be legitimate for a 'char' value resulting from the overlay of some other type to yield a value outside the range specified in limits.h. I wonder what the standard says?
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