Optimal search puzzle

Question

Consider the following puzzle: On the integer line from 1 to $t$ (top, let's say 1000 for this example), you have two operators: uniform random on 1 to $t$, and subtract 1. What is the optimal algorithm to reach 1 with the least number of operators?

For example, if you do one random sample and then always count down, on average it will take 500 steps (or maybe 501 if you count the initial step). An obviously better algorithm is to pick a random value until you get below some threshold, and then count down.

We programmed this for $t=1000$ and the best threshold was 42. Interestingly (perhaps obviously) below this you get a power function (about $x^{-0.812}$), and above this it linearly increases to 500.

Two questions: 1. Is there a better algorithm in general? 2. If ours is optimal what is the general equation for the minimum threshold? (Implicit third question: Presumably someone's already asked this...pointer please!)

Answer 1

You can solve the problem via dynamic programming. For $n\in\{1,\dots,t\}$, let $V(n)$ be the minimum expected number of steps starting from $n$. Then $V(1)=0$ and otherwise $$V(n) = 1+\min\left(\frac{1}{t}\sum_{k=1}^t V(k), V(n-1)\right).$$

Because $V(n)$ appears on both sides, you cannot just iterate the recursion. Instead, you can use linear programming as follows. The problem is to maximize $\sum_{n=1}^t V(n)$ subject to linear constraints \begin{align} V(1) &= 0 \\ V(n) &\le 1 + \frac{1}{t}\sum_{k=1}^t V(k) \\ V(n) &\le 1 + V(n-1) \\ \end{align} Here's a plot of $V(n)$ for $n\in\{1,\dots,1000\}$:

In particular, $$V(n)= \begin{cases} n-1 &\text{for $n \le 45$}, \\ 44+2/9 &\text{otherwise}. \\ \end{cases}$$

Answer 2

Because using the random operator destroys any potential gain from a previous subtraction, the optimal strategy must look like the one stated in the question. The solution of @RobPratt showed that in this case $$ V(n) = 1+\min\left(\frac{1}{t}\sum_{k=1}^t V(k), V(n-1)\right).$$ For $t=1000$ he showed that the threshold value is $m=44$ and for $n\geq m+2$ one has a constant $V(n) = m+\xi$ with $\xi=2/9$, whilst for $n\leq m+1$ one has $V(n)=n-1$. For general $t$ one can use the equation to infer that for some $0\leq \xi<1$ $$V(m+2) ~=~ 1+\frac{1}{t}\sum_{k=1}^t V(k) ~=~1+ \frac{1}{t}\sum_{k=1}^{m+1} (k-1) + \frac{(m+\xi) (t-m-1)}{t}. $$ Because $V(m+2) =m+\xi$ This gives $$m+\xi ~=~ 1+ \frac{1}{t} {m+1 \choose 2} + \frac{(m+\xi) (t-m-1)}{t},$$ and after solving for $\xi$: $$\xi= \frac{t}{m+1} -\frac{m}{2},~~{\rm or}~~0\leq \frac{t}{m+1} -\frac{m}{2}<1.$$ Rearranging gives $${m+1 \choose 2} \leq t< {m+2 \choose 2}, $$ which uniquely defines the threshold $m$ as $$m ~=~ \left\lfloor \frac{\sqrt{8\,t+1} -1}{2} \right\rfloor.$$