Module `Declarations`

Representation of constants (Definition/Axiom)

type template_arity = { template_level : Univ.Universe.t; }
type template_universes = { template_param_levels : Univ.Level.t option list; template_context : Univ.ContextSet.t; }
type ('a, 'b) declaration_arity = | RegularArity of 'a | TemplateArity of 'b

type inline = int option

type ('a, 'opaque) constant_def = | Undef of inline a global assumption | Def of 'a or a transparent global definition | OpaqueDef of 'opaque or an opaque global definition | Primitive of CPrimitives.t or a primitive operation
type universes = | Monomorphic | Polymorphic of Univ.AbstractContext.t
type typing_flags = { check_guarded : bool; If false then fixed points and co-fixed points are assumed to be total. check_positive : bool; If false then inductive types are assumed positive and co-inductive types are assumed productive. check_universes : bool; If false universe constraints are not checked conv_oracle : Conv_oracle.oracle; Unfolding strategies for conversion share_reduction : bool; Use by-need reduction algorithm enable_VM : bool; If false, all VM conversions fall back to interpreted ones enable_native_compiler : bool; If false, all native conversions fall back to VM ones indices_matter : bool; The universe of an inductive type must be above that of its indices. impredicative_set : bool; Predicativity of the Set universe. sprop_allowed : bool; If false, error when encountering SProp. cumulative_sprop : bool; SProp <= Type allow_uip : bool; Allow definitional UIP (breaks termination) }: The typing_flags are instructions to the type-checker which modify its behaviour. The typing flags used in the type-checking of a constant are tracked in their constant_body so that they can be displayed to the user.

type work_list = (Univ.Instance.t * Names.Id.t array) Names.Cmap.t * (Univ.Instance.t * Names.Id.t array) Names.Mindmap.t
type abstr_info = { abstr_ctx : Constr.named_context; Section variables of this prefix abstr_subst : Univ.Instance.t; Actual names of the abstracted variables abstr_uctx : Univ.AbstractContext.t; Universe quantification, same length as the substitution }: Data needed to abstract over the section variable and universe hypotheses

type cooking_info = { modlist : work_list; abstract : abstr_info; }
type 'opaque pconstant_body = { const_hyps : Constr.named_context; younger hyp at top const_body : (Constr.t, 'opaque) constant_def; const_type : Constr.types; const_relevance : Sorts.relevance; const_body_code : Vmemitcodes.body_code option; const_universes : universes; const_inline_code : bool; const_typing_flags : typing_flags; The typing options which were used for type-checking. }
type constant_body = cooking_info Opaqueproof.opaque pconstant_body
type nested_type = | NestedInd of Names.inductive | NestedPrimitive of Names.Constant.t: Representation of mutual inductive types in the kernel

type recarg = | Norec | Mrec of Names.inductive | Nested of nested_type
type wf_paths = recarg Rtree.t

   Inductive I1 (params) : U1 := c11 : T11 | ... | c1p1 : T1p1
   ...
   with      In (params) : Un := cn1 : Tn1 | ... | cnpn : Tnpn

type record_info = | NotRecord | FakeRecord | PrimRecord of (Names.Id.t * Names.Label.t array * Sorts.relevance array * Constr.types array) array
type regular_inductive_arity = { mind_user_arity : Constr.types; mind_sort : Sorts.t; }
type inductive_arity = (regular_inductive_arity, template_arity) declaration_arity
type one_inductive_body = { mind_typename : Names.Id.t; Name of the type: Ii mind_arity_ctxt : Constr.rel_context; Arity context of Ii. It includes the context of parameters, that is, it has the form paramdecls, realdecls_i such that Ui (see above) is forall realdecls_i, si for some sort si and such that Ii has thus type forall paramdecls, forall realdecls_i, si. The context itself is represented internally as a list in reverse order [realdecl_i{r_i};...;realdecl_i1;paramdecl_m;...;paramdecl_1]. mind_arity : inductive_arity; Arity sort and original user arity mind_consnames : Names.Id.t array; Names of the constructors: cij mind_user_lc : Constr.types array; Types of the constructors with parameters: forall params, Tij, where the recursive occurrences of the inductive types in Tij (i.e. in the type of the j-th constructor of the i-th types of the block a shown above) have the form Ind ((mind,0),u), ..., Ind ((mind,n-1),u) for u the canonical abstract instance associated to mind_universes and mind the name to which the inductive block is bound in the environment. mind_nrealargs : int; Number of expected real arguments of the type (no let, no params) mind_nrealdecls : int; Length of realargs context (with let, no params) mind_kelim : Sorts.family; Highest allowed elimination sort mind_nf_lc : (Constr.rel_context * Constr.types) array; Head normalized constructor types so that their conclusion exposes the inductive type. It includes the parameters, i.e. each component of the array has the form (decls_ij, Ii params realargs_ij) where decls_ij is the concatenation of the context of parameters (possibly with let-ins) and of the arguments of the constructor (possibly with let-ins). This context is internally represented as a list [cstrdecl_ij{q_ij};...;cstrdecl_ij1;paramdecl_m;...;paramdecl_1] such that the constructor in fine has type forall paramdecls, forall cstrdecls_ij, Ii params realargs_ij] with params referring to the assumptions of paramdecls and realargs_ij being the "indices" specific to the constructor. mind_consnrealargs : int array; Number of expected proper arguments of the constructors (w/o params) mind_consnrealdecls : int array; Length of the signature of the constructors (with let, w/o params) mind_recargs : wf_paths; Signature of recursive arguments in the constructors mind_relevance : Sorts.relevance; mind_nb_constant : int; number of constant constructor mind_nb_args : int; number of no constant constructor mind_reloc_tbl : Vmvalues.reloc_table; }: Datas specific to a single type of a block of mutually inductive type

type recursivity_kind = | Finite = inductive | CoFinite = coinductive | BiFinite = non-recursive, like in "Record" definitions

Datas associated to a full block of mutually inductive types

type mutual_inductive_body = { mind_packets : one_inductive_body array; The component of the mutual inductive block mind_record : record_info; The record information mind_finite : recursivity_kind; Whether the type is inductive or coinductive mind_ntypes : int; Number of types in the block mind_hyps : Constr.named_context; Section hypotheses on which the block depends mind_nparams : int; Number of expected parameters including non-uniform ones (i.e. length of mind_params_ctxt w/o let-in) mind_nparams_rec : int; Number of recursively uniform (i.e. ordinary) parameters mind_params_ctxt : Constr.rel_context; The context of parameters (includes let-in declaration) mind_universes : universes; Information about monomorphic/polymorphic/cumulative inductives and their universes mind_template : template_universes option; mind_variance : Univ.Variance.t array option; Variance info, None when non-cumulative. mind_sec_variance : Univ.Variance.t array option; Variance info for section polymorphic universes. None outside sections. The final variance once all sections are discharged is mind_sec_variance ++ mind_variance. mind_private : bool option; allow pattern-matching: Some true ok, Some false blocked mind_typing_flags : typing_flags; typing flags at the time of the inductive creation }

Module declarations

type ('ty, 'a) functorize = | NoFunctor of 'a | MoreFunctor of Names.MBId.t * 'ty * ('ty, 'a) functorize

type with_declaration = | WithMod of Names.Id.t list * Names.ModPath.t | WithDef of Names.Id.t list * Constr.constr * Univ.AbstractContext.t option
type module_alg_expr = | MEident of Names.ModPath.t | MEapply of module_alg_expr * Names.ModPath.t | MEwith of module_alg_expr * with_declaration

type structure_field_body = | SFBconst of constant_body | SFBmind of mutual_inductive_body | SFBmodule of module_body | SFBmodtype of module_type_body

and structure_body = (Names.Label.t * structure_field_body) list

and module_signature = (module_type_body, structure_body) functorize

and module_expression = (module_type_body, module_alg_expr) functorize
and module_implementation = | Abstract no accessible implementation | Algebraic of module_expression non-interactive algebraic expression | Struct of module_signature interactive body | FullStruct special case of Struct : the body is exactly mod_type
and 'a generic_module_body = { mod_mp : Names.ModPath.t; absolute path of the module mod_expr : 'a; implementation mod_type : module_signature; expanded type mod_type_alg : module_expression option; algebraic type mod_delta : Mod_subst.delta_resolver; quotiented set of equivalent constants and inductive names mod_retroknowledge : 'a module_retroknowledge; }

and module_body = module_implementation generic_module_body

and module_type_body = unit generic_module_body
and _ module_retroknowledge = | ModBodyRK : Retroknowledge.action list -> module_implementation module_retroknowledge | ModTypeRK : unit module_retroknowledge

`\|` `Undef of inline`	a global assumption
`\|` `Def of 'a`	or a transparent global definition
`\|` `OpaqueDef of 'opaque`	or an opaque global definition
`\|` `Primitive of CPrimitives.t`	or a primitive operation

`check_guarded : bool;`	If `false` then fixed points and co-fixed points are assumed to be total.
`check_positive : bool;`	If `false` then inductive types are assumed positive and co-inductive types are assumed productive.
`check_universes : bool;`	If `false` universe constraints are not checked
`conv_oracle : Conv_oracle.oracle;`	Unfolding strategies for conversion
`share_reduction : bool;`	Use by-need reduction algorithm
`enable_VM : bool;`	If `false`, all VM conversions fall back to interpreted ones
`enable_native_compiler : bool;`	If `false`, all native conversions fall back to VM ones
`indices_matter : bool;`	The universe of an inductive type must be above that of its indices.
`impredicative_set : bool;`	Predicativity of the `Set` universe.
`sprop_allowed : bool;`	If `false`, error when encountering `SProp`.
`cumulative_sprop : bool;`	SProp <= Type
`allow_uip : bool;`	Allow definitional UIP (breaks termination)

`abstr_ctx : Constr.named_context;`	Section variables of this prefix
`abstr_subst : Univ.Instance.t;`	Actual names of the abstracted variables
`abstr_uctx : Univ.AbstractContext.t;`	Universe quantification, same length as the substitution

`const_hyps : Constr.named_context;`	younger hyp at top
`const_body : (Constr.t, 'opaque) constant_def;`
`const_type : Constr.types;`
`const_relevance : Sorts.relevance;`
`const_body_code : Vmemitcodes.body_code option;`
`const_universes : universes;`
`const_inline_code : bool;`
`const_typing_flags : typing_flags;`	The typing options which were used for type-checking.

`mind_typename : Names.Id.t;`	Name of the type: `Ii`
`mind_arity_ctxt : Constr.rel_context;`	Arity context of `Ii`. It includes the context of parameters, that is, it has the form `paramdecls, realdecls_i` such that `Ui` (see above) is `forall realdecls_i, si` for some sort `si` and such that `Ii` has thus type `forall paramdecls, forall realdecls_i, si`. The context itself is represented internally as a list in reverse order `[realdecl_i{r_i};...;realdecl_i1;paramdecl_m;...;paramdecl_1]`.
`mind_arity : inductive_arity;`	Arity sort and original user arity
`mind_consnames : Names.Id.t array;`	Names of the constructors: `cij`
`mind_user_lc : Constr.types array;`	Types of the constructors with parameters: `forall params, Tij`, where the recursive occurrences of the inductive types in `Tij` (i.e. in the type of the j-th constructor of the i-th types of the block a shown above) have the form `Ind ((mind,0),u)`, ..., `Ind ((mind,n-1),u)` for `u` the canonical abstract instance associated to `mind_universes` and `mind` the name to which the inductive block is bound in the environment.
`mind_nrealargs : int;`	Number of expected real arguments of the type (no let, no params)
`mind_nrealdecls : int;`	Length of realargs context (with let, no params)
`mind_kelim : Sorts.family;`	Highest allowed elimination sort
`mind_nf_lc : (Constr.rel_context * Constr.types) array;`	Head normalized constructor types so that their conclusion exposes the inductive type. It includes the parameters, i.e. each component of the array has the form `(decls_ij, Ii params realargs_ij)` where `decls_ij` is the concatenation of the context of parameters (possibly with let-ins) and of the arguments of the constructor (possibly with let-ins). This context is internally represented as a list `[cstrdecl_ij{q_ij};...;cstrdecl_ij1;paramdecl_m;...;paramdecl_1]` such that the constructor in fine has type `forall paramdecls, forall cstrdecls_ij, Ii params realargs_ij`] with `params` referring to the assumptions of `paramdecls` and `realargs_ij` being the "indices" specific to the constructor.
`mind_consnrealargs : int array;`	Number of expected proper arguments of the constructors (w/o params)
`mind_consnrealdecls : int array;`	Length of the signature of the constructors (with let, w/o params)
`mind_recargs : wf_paths;`	Signature of recursive arguments in the constructors
`mind_relevance : Sorts.relevance;`
`mind_nb_constant : int;`	number of constant constructor
`mind_nb_args : int;`	number of no constant constructor
`mind_reloc_tbl : Vmvalues.reloc_table;`

`\|` `Finite`	= inductive
`\|` `CoFinite`	= coinductive
`\|` `BiFinite`	= non-recursive, like in "Record" definitions

`mind_packets : one_inductive_body array;`	The component of the mutual inductive block
`mind_record : record_info;`	The record information
`mind_finite : recursivity_kind;`	Whether the type is inductive or coinductive
`mind_ntypes : int;`	Number of types in the block
`mind_hyps : Constr.named_context;`	Section hypotheses on which the block depends
`mind_nparams : int;`	Number of expected parameters including non-uniform ones (i.e. length of mind_params_ctxt w/o let-in)
`mind_nparams_rec : int;`	Number of recursively uniform (i.e. ordinary) parameters
`mind_params_ctxt : Constr.rel_context;`	The context of parameters (includes let-in declaration)
`mind_universes : universes;`	Information about monomorphic/polymorphic/cumulative inductives and their universes
`mind_template : template_universes option;`
`mind_variance : Univ.Variance.t array option;`	Variance info, `None` when non-cumulative.
`mind_sec_variance : Univ.Variance.t array option;`	Variance info for section polymorphic universes. `None` outside sections. The final variance once all sections are discharged is `mind_sec_variance ++ mind_variance`.
`mind_private : bool option;`	allow pattern-matching: Some true ok, Some false blocked
`mind_typing_flags : typing_flags;`	typing flags at the time of the inductive creation

`\|` `Abstract`	no accessible implementation
`\|` `Algebraic of module_expression`	non-interactive algebraic expression
`\|` `Struct of module_signature`	interactive body
`\|` `FullStruct`	special case of `Struct` : the body is exactly `mod_type`

`mod_mp : Names.ModPath.t;`	absolute path of the module
`mod_expr : 'a;`	implementation
`mod_type : module_signature;`	expanded type
`mod_type_alg : module_expression option;`	algebraic type
`mod_delta : Mod_subst.delta_resolver;`	quotiented set of equivalent constants and inductive names
`mod_retroknowledge : 'a module_retroknowledge;`

Representation of mutual inductive types in the kernel

Datas specific to a single type of a block of mutually inductive type