Actually, it would be better to choose a sequence like 1,2,3,... not because the chances of winning are different, but because your chances of having to split the prize are lower if you do win. Also, it is a good idea to pick numbers larger than 31, due to the large number of people using their birthdays.
There is actually a way to increase your chances of winning small prizes in a lottery if you usually buy several tickets for each lottery. For example, the UK lottery pays ten pounds if you get three out of the six numbers correct. If you choose a sequence 1,2,3,4,5,6 for your first ticket, 2,3,4,5,6,7 for the next 3,4,5,6,7,8 for the next etc. then you increase your expected winnings from 10 pound prizes compared to picking sequences with no numbers in common. It is an elemenatary exercise in probability to figure this out. Unfortunately, this does not change the probability of winning the jackpot. Another elementary exercise in probability will convince you that no selection can.
I only buy tickets once a year when the grand prize is like 50 million NIS!
It would be interesting to know the statistics of how many people do this sort of thing. Since a lot of people only enter when the prize is high, the chances of having to split the prize are higher and it might mean that the expected payout if you win is not that much larger, or even possibly lower than if you eneterd when there is a normal jackpot. If you are enjoying elementary exercises in probability, you can calculate this, assuming the number of people entering is a function of the prize money. If you are really enjoying this, then you can try to figure out a good statistical model and a way of estimating the function from data about lottery entries. Then you can figure out the optimal prize money level to enter the lottery. If you did that well, then you can apply for a job as an analyst in a financial institution, where the expected payoff is far larger than from the lottery.
