26 KiB
| title | TARGET DECK | FILE TAGS | tags | |
|---|---|---|---|---|
| α-conversion | Obsidian::STEM | λ-calculus |
|
Overview
Let \lambda-term P contain an occurrence of \lambda x. M, and let y \not\in FV(M). The act of replacing this occurrence of \lambda x. M with \lambda y. [y/x]M is called a change of bound variable or an \alpha-conversion in P.
If P can be changed to \lambda-term Q by a finite series of changes of bound variables, we shall say P is congruent to Q, or P \alpha-converts to Q, or P \equiv_\alpha Q.
%%ANKI
Basic
If P \equiv Q, does P \equiv_\alpha Q?
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
P \equiv Q is to {equivalent} whereas P \equiv_\alpha Q is to {congruent}.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What two ways can we pronounce P \equiv_\alpha Q?
Back: "P is congruent to Q" and "P \alpha-converts to Q".
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If P \equiv_\alpha Q, does P \equiv Q?
Back: Not necessarily.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What does an \alpha-conversion refer to?
Back: The act of replacing an occurrence of (\lambda x. M) with \lambda y. [y/x]M.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What distinguishes terms "\alpha-conversion" and "\alpha-converts"?
Back: The latter refers to 0 or more applications of the former.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Is \alpha-conversion a symmetric relation?
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
\alpha-conversion is most related to what kind of \lambda-term?
Back: Abstractions.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What property must y satisfy for \lambda x. M \equiv_\alpha \lambda y. [y/x]M?
Back: y \not\in FV(M)
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
"\alpha-{conversion}" refers to exactly one change of bound variable.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
"\alpha-{converts}" refers to zero or more change of bound variables.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What kind of conversion is a change of bound variable?
Back: An \alpha-conversion.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Given \lambda-terms P and Q, what does it mean for P to be congruent to Q?
Back: P \equiv_\alpha Q
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Given \lambda-terms P and Q, P \equiv_\alpha Q if and only if what?
Back: P can be changed to Q with a finite number of changes of bound variables.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Is the following identity true? \lambda x y. x(xy) \equiv \lambda x. (\lambda y. x(xy))
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Is the following identity true? \lambda x y. x(xy) \equiv_\alpha \lambda x. (\lambda y. x(xy))
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Is the following identity true? \lambda x y. x(xy) \equiv \lambda u v. u(uv))
Back: No.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Is the following identity true? \lambda x y. x(xy) \equiv_\alpha \lambda u v. u(uv))
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
\alpha-conversion is known as a change of {bound variable}.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What greek-prefixed term is a change of bound variable known as?
Back: An \alpha-conversion.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If P \equiv_\alpha Q, what can be said about the free variables of P and Q?
Back: FV(P) = FV(Q)
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What does it mean for \equiv_\alpha to be reflexive?
Back: P \equiv_\alpha P
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What does it mean for \equiv_\alpha to be symmetric?
Back: P \equiv_\alpha Q \Rightarrow Q \equiv_\alpha P
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What does it mean for \equiv_\alpha to be transitive?
Back: P \equiv_\alpha Q \land Q \equiv_\alpha R \Rightarrow P \equiv_\alpha R
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What three properties make \equiv_\alpha an equivalence relation?
Back: \equiv_\alpha is reflexive, symmetric, and transitive.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
Let x, y, and v be distinct variables. Then
v \not\in FV(M) \Rightarrow [P/v][v/x]M \equiv_\alpha [P/x]Mv \not\in FV(M) \Rightarrow [x/v][v/x]M \equiv_\alpha My \not\in FV(P) \Rightarrow [P/x][Q/y]M \equiv_\alpha [([P/x]Q)/y][P/x]Mx \not\in FV(Q) \land y \not\in FV(P) \Rightarrow [P/x][Q/y]M \equiv_\alpha [Q/y][P/x]M[P/x][Q/x]M \equiv_\alpha [([P/x]Q)/x]M
%%ANKI
Basic
[N/x]M corresponds to which equivalence-transformation inference rule?
Back: Substitution.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
[P/v][v/x]M \equiv [P/x]M corresponds to which equivalence-transformation inference rule?
Back: Transitivity.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Rewrite (E_u^x)_v^x using \lambda-calculus syntax.
Back: [v/x][u/x]E
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Rewrite [x/v][v/x]M using equivalence-transformation syntax.
Back: (M^x_v)^v_x
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
{v \not\in FV(M)} \Rightarrow [P/v][v/x]M \equiv_\alpha [P/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What happens if the antecedent is false in v \not\in FV(M) \Rightarrow [P/v][v/x]M \equiv_\alpha [P/x]M?
Back: The LHS of the identity has more occurrences of P than the right.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \in FV(M) and x \not\in FV(M), does [P/v][v/x]M \equiv_\alpha [P/x]M?
Back: No.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \not\in FV(M) and x \in FV(M), does [P/v][v/x]M \equiv_\alpha [P/x]M?
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \not\in FV(M), what simpler term is [P/v][v/x]M congruent to?
Back: [P/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \not\in FV(M) and x \in FV(M), does [x/v][v/x]M \equiv_\alpha M?
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \not\in FV(M) and x \in FV(M), does [v/x][x/v]M \equiv_\alpha M?
Back: No.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \in FV(M) and x \not\in FV(M), does [v/x][x/v]M \equiv_\alpha M?
Back: Yes.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If v \in FV(M) and x \not\in FV(M), does [x/v][v/x]M \equiv_\alpha M?
Back: No.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
If y \not\in FV(P), "commuting" substitution in [P/x][Q/y]M yields what congruent term?
Back: [([P/x]Q)/y][P/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
{y \not\in FV(P)} \Rightarrow [P/x][Q/y]M \equiv_\alpha [([P/x]Q)/y][P/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
{x \not\in FV(Q) \land y \not\in FV(P)} \Rightarrow [P/x][Q/y]M \equiv_\alpha [Q/y][P/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
[P/x][Q/y]M \equiv_\alpha [Q/y][P/x]M is a specialization of what more general congruence?
Back: [P/x][Q/y]M \equiv_\alpha [([P/x]Q)/y][P/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
{T} \Rightarrow [P/x][Q/x]M \equiv_\alpha [([P/x]Q)/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What expression containing nested substitutions is congruent to [P/x][Q/x]M?
Back: [([P/x]Q)/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What expression containing adjacent substitutions is congruent to [([P/x]Q)/x]M?
Back: [P/x][Q/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What happens if the antecedent of the following lemma is false? $y \not\in FV(P) \Rightarrow [P/x][Q/y]M \equiv_\alpha [([P/x]Q)/y][P/x]M$
Back: y is subbed in M on the LHS but subbed in both P and M on the RHS.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Free occurrences of x are substituted in which \lambda-terms of [P/x][Q/y]M?
Back: Q and M.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Free occurrences of y are substituted in which \lambda-terms of [P/x][Q/y]M?
Back: M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Free occurrences of x are substituted in which \lambda-terms of [([P/x]Q)/y][P/x]M?
Back: Q and M.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Free occurrences of y are substituted in which \lambda-terms of [([P/x]Q)/y][P/x]M?
Back: P and M.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
Substitution is well-defined with respect to \alpha-conversion. That is, if M \equiv_\alpha M' and N \equiv N', then [N/x]M \equiv_\alpha [N'/x]M'
%%ANKI
Basic
The proof of which implication shows substitution is well-behaved w.r.t. \alpha-conversion?
Back: M \equiv_\alpha M' \land N \equiv_\alpha N' \Rightarrow [N/x]M \equiv_\alpha [N'/x]M'
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
What does Hindley et al. mean by "substitution is well-behaved w.r.t. \alpha-conversion"?
Back: Substitution then \alpha-conversion is congruent to \alpha-conversion then substitution.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Cloze
{M \equiv_\alpha M' \land N \equiv_\alpha N'} \Rightarrow [N/x]M \equiv_\alpha [N'/x]M'
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
How does Hindley et al. describe the following implication? $M \equiv_\alpha M' \land N \equiv_\alpha N' \Rightarrow [N/x]M \equiv_\alpha [N'/x]M'$
Back: As "substitution is well-defined with respect to \alpha-conversion."
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Suppose P \equiv_\alpha Q. How do FV(P) and FV(Q) relate to one another?
Back: FV(P) = FV(Q)
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Why is this implication true: P \equiv_\alpha Q \Rightarrow FV(P) = FV(Q)
Back: \alpha-conversions do not modify free variables in any way.
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
Simultaneous Substitution
Substitution can be generalized in the natural way to define simultaneous substitution [N_1/x_1, N_2/x_2, \ldots, N_n/x_n]M$ for $n \geq 2. As in equiv-trans#Substitution, simultaneous substitution is different from sequential substitution.
%%ANKI
Basic
How is simultaneous substitution of N_1 for x_1 and N_2 for x_2 in M denoted?
Back: [N_1/x_1, N_2/x]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
How is [N_1/x_1, N_2/x_2]M denoted in the equivalence-transformation system?
Back: M_{N_1, N_2}^{x_1, x_2}
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
How is M_{N_1, N_2}^{x_1, x_2} denoted in \lambda-calculus?
Back: [N_1/x_1, N_2/x_2]M
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Suppose M \equiv x_1x_2. What is the result of [u/x_1]([x_1/x_2]M)?
Back: uu
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
%%ANKI
Basic
Suppose M \equiv x_1x_2. What is the result of [u/x_1, x_1/x_2]M?
Back: ux_1
Reference: Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.
END%%
Bibliography
- Hindley, J Roger, and Jonathan P Seldin. “Lambda-Calculus and Combinators, an Introduction,” n.d. https://www.cin.ufpe.br/~djo/files/Lambda-Calculus%20and%20Combinators.pdf.