CSE 216 – Homework I
Instructor: Dr. Ritwik Banerjee
This homework document consists of 3 pages. Carefully read the entire document before you start coding. Note: All functions, unless otherwise specified, should be polymorphic (i.e., they should work with any data type). For example, if you are writing a method that should work for lists, the type must be ‘a list, and not int list.
1 Recursion and Higher-order Functions (60 points)
In this section, you may not use any functions available in the OCaml library that already solves all or most of the question. For example, OCaml provides a List.rev function, but you may not use that in this section.
1. Write a recursive function pow, which takes two integer parameters x and n, and returns xn. Also write (6) a function float pow, which does the same thing, but for x being a float (n is still an integer). You may
assume that n will always be non-negative.
2. Write a function compress to remove consecutive duplicates from a list. (6) # compress [“a”;”a”;”b”;”c”;”c”;”a”;”a”;”d”;”e”;”e”;”e”];;
– : string list = [“a”; “b”; “c”; “a”; “d”; “e”]
3. Write a function remove if of the type ‘a list -> (‘a -> bool) -> ‘a list, which takes a list and (6) a predicate, and removes all the elements that satisfy the condition expressed in the predicate.
# remove_if [1;2;3;4;5] (fun x -> x mod 2 = 1);;
– : int list = [2; 4]
4. Write a function equivs of the type (‘a -> ‘a -> bool) -> ‘a list -> ‘a list list, which par- (6) titions a list into equivalence classes according to the equivalence function.
# equivs (=) [1;2;3;4];;
– : int list list = [[1];[2];[3];[4]]
# equivs (fun x y -> (=) (x mod 2) (y mod 2)) [1; 2; 3; 4; 5; 6; 7; 8];;
– : int list list = [[1; 3; 5; 7]; [2; 4; 6; 8]]
5. Some programming languages (like Python) allow us to quickly slice a list based on two integers i and (6) j, to return the sublist from index i (inclusive) and j (not inclusive). We want such a slicing function
in OCaml as well.
Write a function slice as follows: given a list and two indices, i and j, extract the slice of the list containing the elements from the ith (inclusive) to the jth (not inclusive) positions in the original list.
# slice [“a”;”b”;”c”;”d”;”e”;”f”;”g”;”h”] 2 6;;
– : string list = [“c”; “d”; “e”; “f”]
Invalid index arguments should be handled gracefully. For example, # slice [“a”;”b”;”c”;”d”;”e”;”f”;”g”;”h”] 3 2;;
– : string list = []
# slice [“a”;”b”;”c”;”d”;”e”;”f”;”g”;”h”] 3 20;
– : string list = [“d”;”e”;”f”;”g”;”h”];
6. Write a function called composition, which takes two functions as its input, and returns their compo- (6) sition as the output.
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CSE 216 Homework I Submission Deadline: Sept 27, 2019
# let square_of_increment = composition square increment;;
val square_of_increment : int -> int =
# square_of_increment 4;; (* increments 4 to 5, and THEN computes square *)
– : int = 25
7. Write a function called equiv on, which takes three inputs: two functions f and g, and a list lst. It (6) returns true if and only if the functions f and g have identical behavior on every element of lst.
# let f i = i * i;;
val f : int -> int =
# let g i = 3 * i;;
val g : int -> int =
# equiv_on f g [3];;
– : bool = true
# equiv_on f g [1;2;3];;
– : bool = false
8. Write a functions called pairwisefilter with two parameters: (i) a function cmp that compares two (6) elements of a specific T and returns one of them, and (ii) a list lst of elements of that same type T. It
returns a list that applies cmp while taking two items at a time from lst. If lst has odd size, the last
element is returned “as is”.
# pairwisefilter min [14; 11; 20; 25; 10; 11];;
– : int list = [11; 20; 10]
# (* assuming that shorter : string * string -> string =
# pairwisefilter shorter [“and”; “this”; “makes”; “shorter”; “strings”; “always”; “win”];;
– : string list = [“and”; “makes”; “always”; “win”]
9. Write the polynomial function, which takes a list of tuples and returns the polynomial function corre- (6) sponding to that list. Each tuple in the input list consists of (i) the coefficient, and (ii) the exponent.
# (* below is the polynomial function f(x) = 3x^3 – 2x + 5 *)
# let f = polynomial [3, 3;; -2, 1; 5, 0];;
val f : int -> int =
# f 2;;
– : int = 25
10. The power set of a set S is the set of all subsets of S (including the empty set and the entire set). (6) Write a function powerset of the type ‘a list -> ‘a list list, which treats lists as unordered sets,
and returns the powerset of its input list. You may assume that the input list has no duplicates.
# powerset [3; 4; 10];;
– : int list list = [[]; [3]; [4]; [10]; [3; 4]; [3; 10]; [4; 10]; [3; 4; 10]];
2 Data Types
1. Let us define a language for expressions in Boolean logic:
type bool_expr =
| Lit of string
| Not of bool_expr
| And of bool_expr * bool_expr
| Or of bool_expr * bool_expr
(40 points)
using which we can write expressions in prefix notation. E.g., (a∧b)∨(¬a) is Or(And(Lit(“a”), Lit(“b”)), Not(Lit(“a”))). Your task is to write a function truth table, which takes as input a logical expression in two literals and returns its truth table as a list of triples, each a tuple of the form:
(truth-value-of-first-literal, truth-value-of-second-literal, truth-value-of-expression)
For example,
# (* the outermost parentheses are needed for OCaml to parse the third argument
correctly as a bool_expr *)
# truth_table “a” “b” (And(Lit(“a”), Lit(“b”)));;
– : (bool * bool * bool) list = [(true, true, true); (true, false, false);
(false, true, false); (false, false, false)]
(10)
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CSE 216 Homework I Submission Deadline: Sept 27, 2019
2. In this question you will use higher-order functions to implement an interpreter for a simple stack-based (30) evaluation language. This language has a fixed set of commands:
• start → Initializes an empty stack. This is always the first command in a program and never appears again.
• (push n) → Pushes the specified integer n on to the top of the stack. This command is always parenthesized.
• pop → Removes the top element of the stack.
• add → Pops the top two elements of the stack, computes their sum, and pushes the result back on
to the stack.
• mult → Pops the top two elements of the stack, computes their product, and pushes the result back
on to the stack.
• clone → Pushes a duplicate copy of the top element on to the stack.
• kpop → Pops the top element k of the stack, and if k is a positive number, pops k more elements
(or the stack becomes empty, whichever happens sooner).
• halt → Terminates the stack evaluation program. This is always the last command.
Your task is to define the stack data structure in OCaml (10 points), and then implement the above commands (20 points). Your stack must be implemented as a list. A complete running example would look something like the following:
# start (push 2) (push 3) (push 4) mult add halt;;
– : list int = [14]
You may assume that only valid commands will be provided. As such, you do not have to worry about exception handling.
NOTES:
• Late submissions or uncompilable code will not be graded.
• Please remember to verify what you are submitting. Make sure you are, indeed, submitting what you
think you are submitting!
• What to submit? A single .zip file comprising three .ml files. The first file must be named hw1.ml,
and should contain your code for the ten questions in section 1 of this assignment. The second file must be named hw1-bool.ml, and this should contain your code for question 2.1 (Boolean logic). Finally, the third file must be named hw1-stack.ml, with your code for question 2.2 (stack evaluation language). This assignment will be graded by a script, so be absolutely sure that the submission follows this structure.
Submission Deadline: Sept 27, 2019, 11:59 pm
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