You can search for identifiers within the package.
in-package search v0.2.0
Infix operators
val (:=) : var -> exp -> stmt
x := y -> Move (x,y)
val (+) : exp -> exp -> exp
x + y -> BinOp (PLUS,x,y)
val (-) : exp -> exp -> exp
x - y -> BinOp(MINUS,x,y)
val (*) : exp -> exp -> exp
x * y -> BinOp(TIMES,x,y)
val (/) : exp -> exp -> exp
x / y -> BinOp(DIVIDE,x,y)
val (/$) : exp -> exp -> exp
x /$ y -> BinOp(SDIVIDE,x,y)
val (mod) : exp -> exp -> exp
x mod y -> BinOp (MOD,x,y)
val (%$) : exp -> exp -> exp
x %$ y -> BinOp (SMOD,x,y)
val (lsl) : exp -> exp -> exp
x lsl y = BinOp (LSHIFT,x,y)
val (lsr) : exp -> exp -> exp
x lsr y = BinOp (RSHIFT,x,y)
val (asr) : exp -> exp -> exp
x asr y = BinOp (ARSHIFT,x,y)
val (land) : exp -> exp -> exp
x land y = BinOp (AND,x,y)
val (lor) : exp -> exp -> exp
x lor y = BinOp (OR,x,y)
val (lxor) : exp -> exp -> exp
x lxor y = BinOp (XOR,x,y)
val lnot : exp -> exp
lnot x = UnOp (NOT,x,y)
val (=) : exp -> exp -> exp
x = y -> BinOp(EQ,x,y)
val (<>) : exp -> exp -> exp
x = y -> BinOp(NEQ,x,y)
val (<) : exp -> exp -> exp
x < y -> BinOp(LT,x,y)
val (>) : exp -> exp -> exp
x > y -> Binop(LT,y,x)
val (<=) : exp -> exp -> exp
x <= y -> Binop(LE,x,y)
val (>=) : exp -> exp -> exp
x <= y -> Binop(LE,y,x)
val (<$) : exp -> exp -> exp
x <$ x -> Binop(SLT,x,y)
val (>$) : exp -> exp -> exp
x >$ x -> Binop(SLT,y,x)
val (<=$) : exp -> exp -> exp
x <=$ x -> Binop(SLE,x,y)
val (>=$) : exp -> exp -> exp
x >=$ x -> Binop(SLE,y,x)
val (^) : exp -> exp -> exp
a ^ b -> Concat (a,b)