This **crossword clue** is for the definition: *School orgs..*

it’s A 12 letters **crossword puzzle definition**.

Next time, when searching for online help with your puzzle, try using the search term “School orgs. crossword” or “School orgs. crossword clue”. The possible answerss for School orgs. are listed below.

Did you find what you needed?

We hope you did!.

## Possible Answers: **PTAS**.

Last seen on: LA Times Crossword 6 Nov 18, Tuesday

### Random information on the term “PTAS”:

In computer science, a polynomial-time approximation scheme (PTAS) is a type of approximation algorithm for optimization problems (most often, NP-hard optimization problems).

A PTAS is an algorithm which takes an instance of an optimization problem and a parameter ε > 0 and, in polynomial time, produces a solution that is within a factor 1 + ε of being optimal (or 1 − ε for maximization problems). For example, for the Euclidean traveling salesman problem, a PTAS would produce a tour with length at most (1 + ε)L, with L being the length of the shortest tour.[1] There exists also PTAS for the class of all dense CSP problems.[2][clarification needed]

The running time of a PTAS is required to be polynomial in n for every fixed ε but can be different for different ε. Thus an algorithm running in time O(n1/ε) or even O(nexp(1/ε)) counts as a PTAS.

A practical problem with PTAS algorithms is that the exponent of the polynomial could increase dramatically as ε shrinks, for example if the runtime is O(n(1/ε)!). One way of addressing this is to define the efficient polynomial-time approximation scheme or EPTAS, in which the running time is required to be O(nc) for a constant c independent of ε. This ensures that an increase in problem size has the same relative effect on runtime regardless of what ε is being used; however, the constant under the big-O can still depend on ε arbitrarily. Even more restrictive, and useful in practice, is the fully polynomial-time approximation scheme or FPTAS, which requires the algorithm to be polynomial in both the problem size n and 1/ε. All problems in FPTAS are fixed-parameter tractable. Both the knapsack problem and bin packing problem admit an FPTAS.[3]