bio | website | |
---|---|---|
location | ||
age | ||
visits | member for | 4 years, 7 months |
seen | 6 hours ago | |
stats | profile views | 35 |
Apr 6 |
comment |
STL Sort vs median of medians
Can the person who downvoted explain why? The question should be clear: Is there a practical disadvantage to implementing Median-of-Medians Quicksort in place of Introsort? And someone has already given an answer. |
Nov 11 |
comment |
About Codd's Reduction Algorithm
Well, all I was asking for was a parser just as described. It could even be a homework/project someone has done- need not be a standard relational algebra based language at all. |
Nov 10 |
asked | About Codd's Reduction Algorithm |
Nov 10 |
comment |
Checking if Linked List is palindromic
@Billy, join the club, the interviewer too asked this question |
Nov 10 |
accepted | Checking if Linked List is palindromic |
Nov 10 |
comment |
Checking if Linked List is palindromic
Oh yes, I remember the Automata analogy from my Computation theory books. Thanks |
Nov 9 |
comment |
Checking if Linked List is palindromic
No, it isn't std::list. You can't do a --last on a singly linked list. |
Nov 9 |
comment |
Checking if Linked List is palindromic
Two issues: Order n^2 complexity, and the midpoint criterion isn't used. |
Nov 9 |
comment |
Checking if Linked List is palindromic
Nothing at all, it needs to be general. |
Nov 9 |
revised |
Checking if Linked List is palindromic
deleted 17 characters in body; edited tags |
Nov 9 |
comment |
Checking if Linked List is palindromic
Well, this is about C/C++, not Lisp |
Nov 9 |
asked | Checking if Linked List is palindromic |
Oct 16 |
awarded | Scholar |
Oct 16 |
accepted | int ** vs int [ROWS][COLS] |
Sep 20 |
comment |
STL Sort vs median of medians
The median of medians version of quicksort has a worst case of O(n log n) & is worst case optimal |
Sep 18 |
asked | STL Sort vs median of medians |
Sep 18 |
comment |
Reducing Planning to Quantified Boolean Formulae
There is no probability involved anywhere, I'm talking only about classical planning. By "reducing to TQBF", I mean "convert an instance of planning problem to an equiv. instance of TQBF". |
Sep 17 |
asked | Reducing Planning to Quantified Boolean Formulae |
Jun 6 |
accepted | 0/1 Knapsack with irrational weights |
Jun 3 |
comment |
0/1 Knapsack with irrational weights
No, I'm not in school/univ :-) This is something I have thinking about off and on. And as an SPOJ participant, I also tried very hard to solve their Pibonacci problem here:tiny.cc/kmsjt |