I am assuming the constraints are:
- An employee cannot go to the same location s/he is currently at.
- All sites must have at least one employee in each category, where an employee is expected.
The most important idea is to realize that you are not looking for a "random" assignment. You are looking for a permutation of positions, subject to the condition that everyone moves somewhere else.
I am going to describe an answer for managers. You will probably want three queries for each type of employee.
The key idea is a ManagerPositions table. This has a place, a sequential number, and a sequential number within the place. The following is an example:
Araria 1 1
Araria 2 2
Arwal 1 3
Arungabad 1 4
The query creates this table by joining to INFORMATION_SCHEMA.columns with a row_number() function to assign a sequence. This is a quick and dirty way to get a sequence in SQL Server -- but perfectly valid as long as the maximum number you need (that is, the maximum number of managers in any one location) is less than the number of columns in the database. There are other methods to handle the more general case.
The next key idea is to rotate the places, rather than randomly choosing them. This uses ideas from modulo arithmetic -- add an offset and take the remainder over the total number of positions. The final query looks like this:
with ManagerPositions as (
row_number() over (order by placerand, posseqnum) as seqnum,
from (select p.*, newid() as placerand
from places p
) p join
(select row_number() over (order by (select NULL)) as posseqnum
from INFORMATION_SCHEMA.COLUMNS c
on p.Manager <= nums.posseqnum
managers as (
select e.*, mp.seqnum
from (select e.*,
row_number() over (partition by currentposting order by newid()
) as posseqnum
from Employees e
where e.Designation = 'Manager'
) e join
on e.CurrentPosting = mp.PlaceName and
e.posseqnum = mp.posseqnum
select m.*, mp.PlaceId, mp.PlaceName
from managers m cross join
(select max(seqnum) as maxseqnum, max(posseqnum) as maxposseqnum
from managerPositions mp
) const join
on (m.seqnum+maxposseqnum+1) % maxseqnum + 1 = mp.seqnum
Okay, I realize this is complicated. You have a table for each manager position (not a count as in your statement, having a row for each position is important). There are two ways to identify a position. The first is by place and by the count within the place (posseqnum). The second is by an incremental id on the rows.
Find the current position in the table for each manager. This should be unique, because I'm taking into account the number of managers in each place. Then, add an offset to the position, and assign that place. By having the offset larger than the maxseqnum, the managers is guaranteed to move to another location (except in unusual boundary cases where one location has more than half the managers).
If all current manager positions are filled, then this guarantees that all will move to the next location. Because ManagerPositions uses a random id for assigning seqnum, the "next" place is random, not next by id or alphabetically.
This solution does have many employees traveling together to the same new location. You can fix this somewhat by trying values other than "1" in the expression
I realize that there is a way to modify this, to prevent the correlation between the current place and the next place. This does the following:
- Assigns the seqnum to ManagerPosition randomly
- Compare different offsets in the table, rating each by the number of times two positions in the table, separated by that offset, are the same.
- Choose the offset with the minimum rating (which is preferably 0).
- Use that offset in the final matching clause.
I don't have enough time right now to write the SQL for this.