a. You are likely to find it useful to have
b. Create a new Eclipse project and Java package for this lab. (I’d recommend that you also create a Git repository, but it’s up to you.)
c. Create a new class, Utils
, that will hold much of the library
code that you will write today.
d. Create a new class, Experiments
, that will hold your experiments
for today’s class. As you might expect, Experiments
should include
a main
method.
e. Add the following declaration to the main
method of
Experiments
.
String[] tmp =
new String[] { "alpha", "bravo", "charlie", "delta", "echo",
"foxtrot", "golf", "hotel", "india",
"juliett", "kilo", "lima", "mike",
"november", "oscar", "papa", "quebec",
"romeo", "sierra", "tango", "uniform",
"victor", "whiskey", "xray", "yankee", "zulu" };
ArrayList<String> strings = new ArrayList<String>(Arrays.asList(tmp));
You may recall from the reading that we often search arrays for values (or just the first value) that meets some predicate. At the end of the discussion, we noted that it would be even more general to implement a linear search for arbitrary iterable objects.
a. Write a procedure that searches an iterable for the first value for which a predicate holds.
/**
* Search values for the first value for which pred holds.
*/
public static <T> T search(Predicate<? super T> pred, Iterable<T> values) throws Exception {
// ...
}
b. What do you think the following expression expression does?
String ex1b = Utils.search((s) -> s.length() == 6, strings);
c. Confirm your answer experimentally.
d. Write an expression to find the first element of strings
that
contains a u
. (You may find the contains
method in the
String
class useful.)
e. Do you expect to be able to use search with tmp
? Why or why
not.
f. Check your answer experimentally.
Although the reading introduced a variety of techniques for designing generalized search algorithms, it’s probably easiest to start by focusing on a single type.
Implement the following procedure.
/**
* Search for val in values, return the index of an instance of val.
*
* @param val
* An integer we're searching for
* @param values
* A sorted array of integers
* @result
* index, an integer
* @throws Exception
* If there is no i s.t. values[i] == val
* @pre
* values is sorted in increasing order. That is, values[i] <
* values[i+1] for all reasonable i.
* @post
* values[index] == val
*/
public static int binarySearch (int i, int[] vals) throws Exception {
return 0; // STUB
} // binarySearch
Evidence suggests that (a) many programmers have difficulty implementing binary search coorectly and (b) many programmers do only casual testing of their binary search algorithm. But it’s really easy to write a relatively comprehensive test suit for binary search.
For each s from 1 to 32
Create an array of size s, containing the values 0, 2, 4, ... 2*(s-1)
For all i from 0 to s-1, inclusive
// Make sure that value 2*i is in position i
assert(binarySearch(2*i, array) == i)
// Make sure that odd values are not in the array
assertException(binarySearch(2*i+1, array))
assertException(-1, array)
Implement this test. Then repair any bugs you find in your implementation of binary search.
Note that I’ve found this test very useful. A surprising number of pieces of code fail just one or two of the many assertions in this test.
Citation: This test is closely based on one suggested by Jon Bentley in a Programming Pearls column.
As binary search is phrased in the reading, when we note that the
middle element is not equal to the target value, we either set ub
to mid-1
or lb
to mid+1
. But programmers often get confused
by the need for the +1
and -1
.
Determine experimentally what happens if you leave out the +1
and
-1
. Explain why that result happens.
In implementing binary search, you either wrote a loop or a recursive procedure. Write a second version of binary search that uses the other approach.
In theory, binary search should take O(log
Build some moderately large arrays (at least 1000 elements) to verify that you get the expected running times.
a. Implement the following procedure:
/**
* Find the "smallest" integer in an array of integers
*/
public static Integer smallest(Integer[] values, Comparator<Integer> compare) {
return null; // STUB
} // smallest(Integer[])
b. Run your procedure with a comparator that does the standard integer comparison.
c. Run your procedure with a comparator that does reverse integer
comparison (e.g., if x < y, compareTo(x,y)
should
return a positive number.
d. Run your procedure with a comparator that does closest-to-zero comparisons.
If you find that you have extra time, you might try the following exercises.
Implement a generic binary search that takes a comparator as a parameter. Once again, it should return the index of a value that we’ve found (or should throw an exception if no such character exists).
public static <T> int binarySearch(T value, T[] values, Comparator<T> compare) throws Exception {
// ...
} // binarySearch
How could we test our generic binary search? We could rewrite our
tests. Alternately, we could rewrite our integer binarySearch
method to call this method. Try the latter.
Use the generic binarySearch
procedure to search the array of strings
you created at the start of this lab.
This lab is closely based on a similar lab from the Fall 2014 section of 207.