package frama-c

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Floating-point intervals, used to construct arithmetic lattices. The interfaces of this module may change between Frama-C versions. Contact us if you need stable APIs.

type kind = Float_sig.prec =
  1. | Single
    (*

    32 bits float (a.k.a 'float' C type)

    *)
  2. | Double
    (*

    64 bits float (a.k.a 'double' C type)

    *)
  3. | Long_Double
  4. | Real
    (*

    set of real

    *)
val pretty_kind : Format.formatter -> kind -> unit
module F : sig ... end
include Float_interval_sig.S with type float := F.t and type widen_hints := Fc_float.widen_hints
type t

Type of intervals.

val packed_descr : Structural_descr.pack
val compare : t -> t -> int
val equal : t -> t -> bool
val pretty : Format.formatter -> t -> unit
val hash : t -> int
val min_and_max : t -> (F.t * F.t) option * bool

Returns the bounds of the float interval, (or None if the argument is exactly NaN), and a boolean indicating the possibility that the value may be NaN.

val nan : t

The NaN singleton

val pos_infinity : Float_interval_sig.prec -> t

The infinities singleton

val neg_infinity : Float_interval_sig.prec -> t
val singleton : F.t -> t

singleton f creates the singleton interval f, without NaN.

val top_finite : Float_interval_sig.prec -> t

The interval of all finite values in the given precision.

Lattice operators.

val is_included : t -> t -> bool
val join : t -> t -> t
val narrow : t -> t -> t Lattice_bounds.or_bottom
val contains_a_zero : t -> bool
val contains_pos_zero : t -> bool
val contains_neg_zero : t -> bool
val contains_non_zero : t -> bool
val contains_pos_infinity : t -> bool
val contains_neg_infinity : t -> bool
val contains_nan : t -> bool
val is_negative : t -> Abstract_interp.Comp.result

is_negative f returns True iff all values in f are negative; False iff all values are positive; and Unknown otherwise. Note that we do not keep sign information for NaN, so if f may contain NaN, the result is always Unknown.

val is_finite : t -> Abstract_interp.Comp.result
val is_infinite : t -> Abstract_interp.Comp.result
val is_not_nan : t -> Abstract_interp.Comp.result
val backward_is_finite : positive:bool -> Float_interval_sig.prec -> t -> t Lattice_bounds.or_bottom
val backward_is_infinite : positive:bool -> Float_interval_sig.prec -> t -> t Lattice_bounds.or_bottom
val backward_is_nan : positive:bool -> t -> t Lattice_bounds.or_bottom
val has_greater_min_bound : t -> t -> int

has_greater_min_bound f1 f2 returns 1 if the interval f1 has a better minimum bound (i.e. greater) than the interval f2.

val has_smaller_max_bound : t -> t -> int

has_smaller_max_bound f1 f2 returns 1 if the interval f1 has a better maximum bound (i.e. lower) than the interval f2.

backward_comp_left_true op prec f1 f2 attempts to reduce f1 into f1' so that the relation f1' op f2 holds. prec is the precision of f1 and f1', but not necessarily of f2.

val backward_comp_left_false : Abstract_interp.Comp.t -> Float_interval_sig.prec -> t -> t -> t Lattice_bounds.or_bottom

backward_comp_left_false op prec f1 f2 attempts to reduce f1 into f1' so that the relation f1' op f2 doesn't holds. prec is the precision of f1 and f1', but not necessarily of f2.

val neg : t -> t
val abs : Float_interval_sig.prec -> t -> t
val add : Float_interval_sig.prec -> t -> t -> t
val sub : Float_interval_sig.prec -> t -> t -> t
val mul : Float_interval_sig.prec -> t -> t -> t
val div : Float_interval_sig.prec -> t -> t -> t
val sqrt : Float_interval_sig.prec -> t -> t
val pow : Float_interval_sig.prec -> t -> t -> t
val fmod : Float_interval_sig.prec -> t -> t -> t
val cos : Float_interval_sig.prec -> t -> t
val sin : Float_interval_sig.prec -> t -> t
val acos : Float_interval_sig.prec -> t -> t
val asin : Float_interval_sig.prec -> t -> t
val atan : Float_interval_sig.prec -> t -> t
val atan2 : Float_interval_sig.prec -> t -> t -> t
val backward_add : Float_interval_sig.prec -> left:t -> right:t -> result:t -> (t * t) Lattice_bounds.or_bottom
val backward_sub : Float_interval_sig.prec -> left:t -> right:t -> result:t -> (t * t) Lattice_bounds.or_bottom
val forward_cast : dst:Float_interval_sig.prec -> t -> t
val backward_cast : src:Float_interval_sig.prec -> t -> t Lattice_bounds.or_bottom
val cast_int_to_float : Float_interval_sig.prec -> Integer.t option -> Integer.t option -> t
val bits_of_float64_list : t -> (Integer.t * Integer.t) list

Bitwise reinterpretation of a floating-point interval of double precision into consecutive ranges of integers.

val bits_of_float32_list : t -> (Integer.t * Integer.t) list

Bitwise reinterpretation of a floating-point interval of single precision into consecutive ranges of integers.

val subdivide : Float_interval_sig.prec -> t -> t * t

Subdivides an interval of a given precision into two intervals. Raises Abstract_interp.Can_not_subdiv if it can't be subdivided. prec must be Single or Double.

val round_to_single_precision_float : t -> t
val inject : ?nan:bool -> kind -> F.t -> F.t -> t

inject creates an abstract float interval. It handles infinities, flush-to-zero (rounding subnormals if needed) and NaN. Inputs must be compatible with float_kind. Raises no exceptions (unless values are not compatible with float_kind, in which case execution is aborted). The two floating point numbers must be ordered (so not NaN). ~nan indicates if NaN is present.

val inject_singleton : F.t -> t
val top : t
val plus_zero : t
val minus_zero : t
val zeros : t

Both positive and negative zero

val pi : t

Real representation of \pi.

val e : t

Real representation of \e.

val contains_plus_zero : t -> bool
val meet : t -> t -> t Lattice_bounds.or_bottom
val is_singleton : t -> bool

Returns true on NaN. We expect this function to be e.g. to perform subdivisions/enumerations. The size of the concretization is less interesting to us. (And it is also possible to consider that there is only one NaN value in the concrete anyway.)

exception Not_Singleton_Float
val project_float : t -> F.t
val subdiv_float_interval : kind -> t -> t * t

Raise Can_not_subdiv if it can't be subdivided

Discussion regarding kind and the 3 functions below.

Support for fesetround(FE_UPWARD) and fesetround(FE_DOWNWARD) seems to be especially poor, including in not-so-old versions of Glibc (https://sourceware.org/bugzilla/show_bug.cgi?id=3976). The code for exp, log and log10 is correct wrt. kind=Reak ONLY if the C implementation of these functions is correct in directed rounding modes. Otherwise, anything could happen, including crashes. For now, unless the Libc is known to be reliable, these functions should be called with rounding_mode=Nearest_Even only. Also note that there the Glibc does not guarantee that f(FE_DOWNWARD) <= f(FE_TONEAREST) <= f(FE_UPWARD), which implies that using different rounding modes to bound the final result does not ensure correct bounds. Here's an example where it does not hold (glibc 2.21): log10f(3, FE_TONEAREST) < log10f(3, FE_DOWNWARD).

Also, we have observed bugs in powf, which is called when kind=Float32.

val exp : kind -> t -> t
val log : kind -> t -> t
val log10 : kind -> t -> t
val floor : kind -> t -> t
val ceil : kind -> t -> t
val trunc : kind -> t -> t
val fround : kind -> t -> t
val backward_cast_float_to_double : t -> t Lattice_bounds.or_bottom

backward_cast_float_to_double d return all possible float32 f such that (double)f = d. The double of d that have no float32 equivalent are discarded.

val backward_cast_double_to_real : t -> t
val kind : Cil_types.fkind -> kind

Classify a Cil_types.fkind as either a 32 or 64 floating-point type. Long double are over approximated by Reals

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