# How can I solve the "term type wrong" errror in coq?

I am building up a system which contains both Family of sets and function, and I'm facing lots of errors that goes:

"The term "_" has type "_" while it is expected to have type "_"."


Here are my codes:

From mathcomp
Require Import ssreflect.
Require Import Ensembles.
Require Import Classical.

Ltac RAA := apply NNPP; intro.
Ltac Subset := unfold Included; intros.
Ltac Seteq:= apply Extensionality_Ensembles; unfold Same_set;split.

Notation "x ∈ A" := (In _ A x)(at level 50, no associativity).
Notation "A ⊆ B" := (Included _ A B)(at level 100, no associativity).
Notation "A ∩ B" := (Intersection _ A B)(at level 80, no associativity).
Notation "A ∪ B" := (Union _ A B)(at level 80, no associativity).
Notation "A \ B" := (Setminus _ A B)(at level 60, no associativity).
Notation "∅":= (Empty_set _).
Notation Ω:= (Full_set _).

Section Sets.
Variable U:Type.
Definition Ensemble := U -> Prop.
Definition In (A:Ensemble) (x:U) : Prop := A x.

Inductive Singleton (x:U) : Ensemble := In_singleton : In (Singleton x) x.

End Sets.

Section Family.

Variable U:Type.
Notation set := (Ensemble U).
Variable I: Type.
Definition Fam:= I ->set.
Definition UFam (F:Fam)(X:set):Fam:=fun i:I=> X∪(F i).
Definition IFam (F:Fam)(X:set):Fam:=fun i:I=> X∩(F i).
Inductive UnionF (X:Fam):set:=
unionf_intro:forall x:U, (exists i:I,(x∈(X i)))->(x∈UnionF X).

Inductive InterF (X:Fam):set:=
interf_intro:forall x:U, (forall i:I,(x∈(X i)))->(x∈InterF X).

End Family.

Section Function.
Variables U V:Type.

Notation set := (Ensemble U).
Notation Domain := (Ensemble U).
Notation Range := (Ensemble V).

Inductive Im (X:Domain)(f:U->V) : Range :=
Im_intro : forall x:U, x∈X->(f x)∈(Im X f).

Inductive InvIm (Y:Range)(f:U->V) : Domain :=
InvIm_intro : forall x:U, (f x)∈Y->x∈(InvIm Y f).

End Function.

Section HW_9_E1.

Variables U V:Type.

Lemma E1_1:forall (X Y:Fam)(i:I)(f:U->V)(x:U)(y:V),
(Im (UnionF X) f) = Union (Im (X i) f).


There's an error in the Lemma:

Lemma E1_1:forall (X Y:Fam)(i:I)(f:U->V)(x:U)(y:V),(Im (UnionF X) f) = Union (Im (X i) f).


Say, for example, how can I write the Lemma:

\forall f:U->V, (X_{i}){i\in I}\subseteq U and (Y{i})_{i\in I}\subseteq Y,

f[\bigcup_{i\in I}X_{i}] = \bigcup_{i\in I} f[X_{i}]

What occurs the error and how could I solve it?

• How did you create the definition without understanding what it means? Also, the code is not self-contained -- what is an Ensemble? Please add the relevant imports so that we playing along at home can figure out what is the actual error you are getting. Commented Jul 16 at 12:04
• I copied it from the textbook but the author didn't explain its meanings. Commented Jul 16 at 12:11
• The indentation of your code is misleading.  ssreflect is imported from  mathcomp but Ensembles and  Classical are not.
– Yves
Commented Jul 17 at 9:04
• I do not manage to reproduce your error message. On my computer, the system complains that Fam has type  Type -> Type -> Type instead of  Set, Prop, or Type. Which version of Coq and mathcomp are you using?
– Yves
Commented Jul 17 at 9:12
• If you replace Fam by something that is a reasonable type, the rest of the statement has an other error: you are using I as if it was a set, but we are out of scope of the variable  I which you introduced in section Family which is now closed.
– Yves
Commented Jul 17 at 9:19