Simon's problem

It is important to remember that the goal of Simon's Problem is to reduce the number of queries to the black box so that we can determine s exponentially fast.

For example, if ${\displaystyle n=3}$, then the following function is an example of a function that satisfies the required and just mentioned property:

${\displaystyle x}$	${\displaystyle f(x)}$
000	101
001	010
010	000
011	110
100	000
101	110
110	101
111	010

In this case, ${\displaystyle s=110}$ (i.e. the solution). It can easily be verified that every output of ${\displaystyle f}$ occurs twice, and the two input strings corresponding to any one given output have bitwise XOR equal to ${\displaystyle s=110}$.

For example, the input strings ${\displaystyle 010}$ and ${\displaystyle 100}$ are both mapped (by ${\displaystyle f}$) to the same output string ${\displaystyle 000}$. ${\displaystyle {\displaystyle f(010)=000}}$ and ${\displaystyle {\displaystyle f(100)=000}}$. If we apply XOR to 010 and 100 we obtain 110, that is ${\displaystyle {\displaystyle 010\oplus 100=110=s}.}$${\displaystyle s=110}$ can also be verified using input strings 001 and 111 that are both mapped (by f) to the same output string 010. If we apply XOR to 001 and 111, we obtain 110, that is ${\displaystyle 001\oplus 111=110=s}$. This gives the same solution ${\displaystyle s=110}$ we solved for before.

In this example the function f is indeed a two-to-one function where ${\displaystyle {\displaystyle s\neq 0^{n}}}$.

For a one-to-one function, ${\displaystyle f(x)=f(y)}$ such that ${\displaystyle f(1)=1,f(2)=2,f(3)=3,etc.}$

Intuitively, this is a very hard problem to solve in a "classical" way, even if one uses randomness and accepts a small probability of error. The intuition behind the hardness is reasonably simple: if you want to solve the problem classically, you need to find two different inputs ${\displaystyle x}$ and ${\displaystyle y}$ for which ${\displaystyle f(x)=f(y)}$. There is not necessarily any structure in the function ${\displaystyle f}$ that would help us to find two such inputs: more specifically, we can discover something about ${\displaystyle f}$ (or what it does) only when, for two different inputs, we obtain the same output. In any case, we would need to guess ${\displaystyle {\displaystyle \Omega ({\sqrt {2^{n}}})}}$ different inputs before being likely to find a pair on which ${\displaystyle f}$ takes the same output, as per the birthday problem. Since, classically to find s with a 100% certainty it would require checking up to ${\displaystyle 2^{n-1}+1}$ inputs, Simon's problem seeks to find s using fewer queries than this classical method.

The high-level idea behind Simon's algorithm is to "probe" (or "sample") a quantum circuit (see the picture below) "enough times" to find ${\displaystyle n-1}$ (linearly independent) n-bit strings, that is

${\displaystyle y_{1},y_{2},\dots ,y_{n-1}\in \{0,1\}^{n},}$

such that the following equations are satisfied

${\displaystyle \left\{{\begin{aligned}y_{1}\cdot s&=0\\y_{2}\cdot s&=0\\&\,\,\,\vdots \\y_{n-1}\cdot s&=0\end{aligned}}\right.}$

where ${\displaystyle y_{i}\cdot s}$ is the modulo-2 dot product; that is, ${\displaystyle y_{i}\cdot s=y_{i1}s_{1}\oplus y_{i2}s_{2}\oplus \dots \oplus y_{in}s_{n}}$, and ${\displaystyle y_{ij},s_{j}\in \{0,1\}}$, for ${\displaystyle i=1,\dots ,n-1}$ and for ${\displaystyle j=1,\dots ,n}$.

So, this linear system contains ${\displaystyle n-1}$ linear equations in ${\displaystyle n}$ unknowns (i.e. the bits of ${\displaystyle s\in \{0,1\}^{n}}$), and the goal is to solve it to obtain ${\displaystyle s}$, and ${\displaystyle s}$ is fixed for a given function ${\displaystyle f}$. There is not always a (unique) solution.

Quantum circuit representing/implementing Simon's algorithm

The quantum circuit (see the picture) is the implementation (and visualization) of the quantum part of Simon's algorithm.

A quantum state of all zeros is first prepared (this can easily be done). The state ${\displaystyle |0\rangle }$ represents ${\displaystyle |0^{n}\rangle }$ where ${\displaystyle n}$ is the number of qubits. Half of this state is then transformed using a Hadamard transform. The result is then fed into an oracle (or "black box"), which knows how to compute ${\displaystyle f}$. Where ${\displaystyle U_{f}}$ acts on the two registers as ${\displaystyle |x\rangle |0^{n}\rangle \rightarrow |x\rangle |f(x)\rangle }$. After that, part of the output produced by the oracle is transformed using another Hadamard transform. Finally, a measurement on the overall resulting quantum state is performed. It is during this measurement that we retrieve the n-bit strings, ${\displaystyle y_{1},y_{2},\dots ,y_{n-1}\in \{0,1\}^{n}}$, mentioned in the previous sub-section.

Simon's algorithm can be thought of as an iterative algorithm (which makes use of a quantum circuit) followed by a (possibly) classical algorithm to find the solution to a linear system of equations.

Simon's algorithm starts with the input ${\displaystyle |0^{n}\rangle \otimes |0^{n}\rangle =|0^{n}\rangle |0^{n}\rangle }$, where ${\displaystyle |0^{n}\rangle }$ is the quantum state with ${\displaystyle n}$ zeros.

(The symbol ${\displaystyle \otimes }$ is the typical symbol used to represent the tensor product. To not clutter the notation, the symbol ${\displaystyle \otimes }$ is sometimes omitted: for example, in the previous sentence, ${\displaystyle |0^{n}\rangle \otimes |0^{n}\rangle }$ is equivalent to ${\displaystyle |0^{n}\rangle |0^{n}\rangle }$. In this article, it is (often) used to remove ambiguity or to avoid confusion.)

So, for example, if ${\displaystyle n=2}$, then the initial input is

${\displaystyle |0^{2}\rangle \otimes |0^{2}\rangle =|00\rangle \otimes |00\rangle =(|0\rangle \otimes |0\rangle )\otimes (|0\rangle \otimes |0\rangle )=|0\rangle \otimes |0\rangle \otimes |0\rangle \otimes |0\rangle =|0000\rangle =|0^{4}\rangle =|0^{2n}\rangle }$.

After that, the input (as described in the previous sub-section) is transformed using a Hadamard transform. Specifically, the Hadamard transform ${\displaystyle H^{\otimes n}}$ (the tensor product can also be applied to matrices) is applied to the first ${\displaystyle n}$ qubits, that is, to the "partial" state ${\displaystyle |0^{n}\rangle }$, so that the composite state after this operation is

${\displaystyle |\Psi \rangle =\left(H^{\otimes n}|0^{n}\rangle \right)\otimes |0^{n}\rangle =\left(\sum _{x\in \{0,1\}^{n}}{\frac {1}{\sqrt {2^{n}}}}\left|x\right\rangle \right)\otimes \left|0^{n}\right\rangle =\left({\frac {1}{\sqrt {2^{n}}}}\sum _{x\in \{0,1\}^{n}}\left|x\right\rangle \right)\otimes \left|0^{n}\right\rangle ={\frac {1}{2^{\frac {n}{2}}}}\sum _{x\in \{0,1\}^{n}}\left(\left|x\right\rangle \otimes \left|0^{n}\right\rangle \right)}$

where ${\displaystyle x\in \{0,1\}^{n}}$ denotes any n-bit string (i.e. the summation is over any n-bit string). The term ${\displaystyle {\frac {1}{\sqrt {2^{n}}}}}$ can be factored out of the summation because it does not depend on ${\displaystyle x}$ (i.e. it is a constant with respect to ${\displaystyle x}$), and ${\displaystyle {\frac {1}{\sqrt {2^{n}}}}={\frac {1}{2^{\frac {n}{2}}}}}$.

Suppose (again) ${\displaystyle n=2}$, then the input is ${\displaystyle |0000\rangle }$ and the Hadamard transform ${\displaystyle H^{\otimes 2}}$ is

${\displaystyle H^{\otimes 2}={\frac {1}{\sqrt {2}}}{\begin{bmatrix}1&1\\1&-1\end{bmatrix}}\otimes {\frac {1}{\sqrt {2}}}{\begin{bmatrix}1&1\\1&-1\end{bmatrix}}={\frac {1}{\sqrt {2}}}{\begin{bmatrix}{\frac {1}{\sqrt {2}}}{\begin{bmatrix}1&1\\1&-1\end{bmatrix}}&{\frac {1}{\sqrt {2}}}{\begin{bmatrix}1&1\\1&-1\end{bmatrix}}\\{\frac {1}{\sqrt {2}}}{\begin{bmatrix}1&1\\1&-1\end{bmatrix}}&-\left({\frac {1}{\sqrt {2}}}{\begin{bmatrix}1&1\\1&-1\end{bmatrix}}\right)\end{bmatrix}}={\frac {1}{2}}{\begin{bmatrix}1&1&1&1\\1&-1&1&-1\\1&1&-1&-1\\1&-1&-1&1\end{bmatrix}}}$

If we now apply ${\displaystyle H^{\otimes 2}}$ to the first ${\displaystyle |00\rangle }$, i.e. to the state

${\displaystyle |00\rangle ={\begin{bmatrix}1\\0\\0\\0\end{bmatrix}}}$

we obtain

${\displaystyle {\begin{aligned}H^{\otimes 2}|00\rangle &={\frac {1}{2}}{\begin{bmatrix}1&1&1&1\\1&-1&1&-1\\1&1&-1&-1\\1&-1&-1&1\end{bmatrix}}{\begin{bmatrix}1\\0\\0\\0\end{bmatrix}}={\frac {1}{2}}{\begin{bmatrix}1\\1\\1\\1\end{bmatrix}}\\[6pt]&={\frac {1}{2}}\left({\begin{bmatrix}1\\0\\0\\0\end{bmatrix}}+{\begin{bmatrix}0\\1\\0\\0\end{bmatrix}}+{\begin{bmatrix}0\\0\\1\\0\end{bmatrix}}+{\begin{bmatrix}0\\0\\0\\1\end{bmatrix}}\right)={\frac {1}{2}}\left(|00\rangle +|01\rangle +|10\rangle +|11\rangle \right)={\frac {1}{2^{2/2}}}\sum _{x\in \{0,1\}^{2}}\left|x\right\rangle \end{aligned}}}$

To obtain the final composite quantum state, we can now tensor product ${\displaystyle H^{\otimes 2}|00\rangle }$ with ${\displaystyle |00\rangle }$, that is

${\displaystyle {\begin{aligned}\left(H^{\otimes 2}|00\rangle \right)\otimes |00\rangle &=\left({\frac {1}{2}}\sum _{x\in \{0,1\}^{2}}\left|x\right\rangle \right)\otimes |00\rangle ={\frac {1}{2}}\left(|00\rangle +|01\rangle +|10\rangle +|11\rangle \right)\otimes |00\rangle \\[6pt]&={\frac {1}{2}}\left(|00\rangle \otimes |00\rangle +|01\rangle \otimes |00\rangle +|10\rangle \otimes |00\rangle +|11\rangle \otimes |00\rangle \right)={\frac {1}{2}}\sum _{x\in \{0,1\}^{2}}\left(\left|x\right\rangle \otimes |00\rangle \right).\end{aligned}}}$

We then call the oracle or black-box (${\displaystyle U_{f}}$ in the picture above) to compute the function ${\displaystyle f}$ on the transformed input ${\displaystyle |\Psi \rangle ={\frac {1}{2^{n/2}}}\sum _{x\in \{0,1\}^{n}}\left(\left|x\right\rangle \otimes \left|0^{n}\right\rangle \right)}$, to obtain the state

${\displaystyle |\Psi \rangle '={\frac {1}{2^{n/2}}}\sum _{x\in \{0,1\}^{n}}\left(\left|x\right\rangle \otimes \left|f(x)\right\rangle \right)}$

We then apply the Hadamard transform ${\displaystyle H^{\otimes n}}$ to the states of the first ${\displaystyle n}$ qubits of the state ${\displaystyle |\Psi \rangle '}$, to obtain

${\displaystyle {\begin{aligned}|\Psi \rangle ''&={\frac {1}{2^{n/2}}}\sum _{x\in \{0,1\}^{n}}\left(\left(H^{\otimes n}\left|x\right\rangle \right)\otimes \left|f(x)\right\rangle \right)\\[4pt]&={\frac {1}{2^{n/2}}}\sum _{x\in \{0,1\}^{n}}\left(\left({\frac {1}{2^{n/2}}}\sum _{y\in \{0,1\}^{n}}(-1)^{x\cdot y}\left|y\right\rangle \right)\otimes \left|f(x)\right\rangle \right)={\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left(\sum _{y\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|y\right\rangle \otimes \left|f(x)\right\rangle \right)\right)\end{aligned}}}$

where ${\displaystyle (-1)^{x\cdot y}}$ can either be ${\displaystyle -1}$ or ${\displaystyle 1}$, depending on ${\displaystyle x\cdot y=x_{1}y_{1}+\dots +x_{n}y_{n}}$, where ${\displaystyle x_{i},y_{i}\in \{0,1\}}$, for ${\displaystyle i=1,\dots ,n}$. So, for example, if ${\displaystyle x=101}$ and ${\displaystyle y=111}$, then ${\displaystyle x\cdot y=1*1+0*1+1*1=2}$, which is an even number. Thus, in this case, ${\displaystyle (-1)^{x\cdot y}=(-1)^{1*1+0*1+1*1}=(-1)^{2}=1}$, and ${\displaystyle {x\cdot y}}$ is always a non-negative number.

Intuition behind this inverse Hadamard transformation that is applied here can be found on CMUs lecture notes

Let's now rewrite

${\displaystyle |\Psi \rangle ''={\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left(\sum _{y\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|y\right\rangle \otimes \left|f(x)\right\rangle \right)\right)}$

as follows

${\displaystyle |\Psi \rangle ''=\sum _{y\in \{0,1\}^{n}}\left(\left|y\right\rangle \otimes \left({\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right)\right)\right)}$

This manipulation will be convenient to understand the explanations in the next sections. The order of the summations has been reversed.

After having performed all previously described operations, at the end of the circuit, a measurement is performed.

There are now two possible cases we need to consider separately

• ${\displaystyle x\oplus y=0^{n}}$ or
• ${\displaystyle x\oplus y=s}$, where ${\displaystyle s\neq 0^{n}}$.

Let's first analyze the (special) case ${\displaystyle x\oplus y=0^{n}}$, which means that ${\displaystyle f}$ is (by requirement) a one-to-one function (as explained above in the "problem description").

Let's keep in mind that the quantum state before the measurement is

${\displaystyle \sum _{y\in \{0,1\}^{n}}\left|y\right\rangle \otimes \left({\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right)\right)}$

Now, the probability that the measurement results in each string ${\displaystyle y\in \{0,1\}^{n}}$ is

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right){\Bigg \|}}^{2}={\frac {1}{2^{n}}}}$

This follows from

${\displaystyle {{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right){\Bigg \|}}^{2}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|x\right\rangle \right){\Bigg \|}}^{2}}$

because the two vectors only differ in the ordering of their entries, given that ${\displaystyle f}$ is one-to-one.

The value of the right-hand side, that is

${\displaystyle {{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|x\right\rangle \right){\Bigg \|}}^{2}}$

is more easily seen to be ${\displaystyle {\frac {1}{2^{n}}}}$.

Thus, when ${\displaystyle x\oplus y=0^{n}}$, the outcome is simply a uniformly distributed ${\displaystyle n}$-bit string.

Let's now analyze the case ${\displaystyle x\oplus y=s}$, where ${\displaystyle s\neq 0^{n}}$. In this case, ${\displaystyle f}$ is a two-to-one function, that is, there are two inputs that map to the same output of ${\displaystyle f}$.

The analysis performed in the first case is still valid for this second case, that is, the probability to measure any given string ${\displaystyle y\in \{0,1\}^{n}}$ can still be represented as

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right){\Bigg \|}}^{2}}$

However, in this second case, we still need to figure out what this value of ${\displaystyle p_{y}}$ is. Let's see why in the following explanations.

Let ${\displaystyle A=f(\{0,1\}^{n})}$, the image of ${\displaystyle f}$. Let ${\displaystyle z\in A}$ (i.e. ${\displaystyle z}$ is some output of the function ${\displaystyle f}$), then for every ${\displaystyle x_{1}\in \{0,1\}^{n}}$, there is one (and only one) ${\displaystyle x_{2}\in \{0,1\}^{n}}$, such that ${\displaystyle f(x_{1})=f(x_{2})=z}$; moreover, we also have ${\displaystyle x_{1}\oplus x_{2}=s}$, which is equivalent to ${\displaystyle x_{2}=s\oplus x_{1}}$ (see "the problem description" section above for a review of this concept).

Hence, we have

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right){\Bigg \|}}^{2}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{z\in A}\left(((-1)^{x_{1}\cdot y}+(-1)^{x_{2}\cdot y})\left|z\right\rangle \right){\Bigg \|}}^{2}}$

Given that ${\displaystyle x_{2}=s\oplus x_{1}}$, then we can rewrite the coefficient ${\displaystyle (-1)^{x_{1}\cdot y}+(-1)^{x_{2}\cdot y}}$ as follows

${\displaystyle (-1)^{x_{1}\cdot y}+(-1)^{x_{2}\cdot y}=(-1)^{x_{1}\cdot y}+(-1)^{(x_{1}\oplus s)\cdot y}}$

Given that ${\displaystyle (x_{1}\oplus s)\cdot y=(x_{1}\cdot y)\oplus (s\cdot y)}$, then we can further write the expression above as

${\displaystyle (-1)^{x_{1}\cdot y}(1+(-1)^{y\cdot s})}$

So, ${\displaystyle p_{y}}$ can further be written as

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{z\in A}\left((-1)^{x_{1}\cdot y}(1+(-1)^{y\cdot s})\left|z\right\rangle \right){\Bigg \|}}^{2}}$

Now, if ${\displaystyle y\cdot s=y_{1}s_{1}+\dots +y_{n}s_{n}}$ is an odd number, then ${\displaystyle (-1)^{y\cdot s}=-1}$. In that case,

${\displaystyle (-1)^{x_{1}\cdot y}(1+(-1)^{y\cdot s})=(-1)^{x_{1}\cdot y}(1-1)=0}$

Consequently, we have

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{z\in A}\left((-1)^{x_{1}\cdot y}(1+(-1)^{y\cdot s})\left|z\right\rangle \right){\Bigg \|}}^{2}=0}$

Given that ${\displaystyle p_{y}=0}$, then we never have this case, that is, no string ${\displaystyle y\in \{0,1\}^{n}}$ is seen (after the measurement) in this case.

(This is the case where we have destructive interference.)

If, instead, ${\displaystyle y\cdot s}$ is an even number (e.g. zero), then ${\displaystyle (-1)^{y\cdot s}=1}$. In that case,

${\displaystyle (-1)^{x_{1}\cdot y}(1+(-1)^{y\cdot s})=(-1)^{x_{1}\cdot y}2}$

So, we have

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{z\in A}\left((-1)^{x_{1}\cdot y}(2)\left|z\right\rangle \right){\Bigg \|}}^{2}={{\Bigg \|}{\frac {2}{2^{n}}}\sum _{z\in A}\left((-1)^{x_{1}\cdot y}\left|z\right\rangle \right){\Bigg \|}}^{2}={{\Bigg \|}{\frac {1}{2^{n-1}}}\sum _{z\in A}\left((-1)^{x_{1}\cdot y}\left|z\right\rangle \right){\Bigg \|}}^{2}}$

Is the case of constructive interference,

${\displaystyle {\frac {2}{2^{n}}}=2*2^{-n}=2^{1}*2^{-n}=2^{-n+1}=2^{-(n-1)}={\frac {1}{2^{n-1}}}}$. So, in summary, for this second case, we have the following probabilities

${\displaystyle p_{y}={{\Bigg \|}{\frac {1}{2^{n}}}\sum _{x\in \{0,1\}^{n}}\left((-1)^{x\cdot y}\left|f(x)\right\rangle \right){\Bigg \|}}^{2}={\begin{cases}{\frac {1}{2^{n-1}}}&\quad {\text{if }}y\cdot s{\text{ is even}}\\0&\quad {\text{if }}y\cdot s{\text{ is odd}}\\\end{cases}}}$

When we run the circuit (operations) above, there are two cases:

• in the (special) case where ${\displaystyle x\oplus y=0^{n}}$, the measurement results in each string ${\displaystyle y\in \{0,1\}^{n}}$ with probability ${\displaystyle p_{y}={\frac {1}{2^{n}}}}$

• in the case ${\displaystyle x\oplus y=s}$ (where ${\displaystyle s\neq 0^{n}}$), the probability to obtain each string ${\displaystyle y\in \{0,1\}^{n}}$ is given by

${\displaystyle p_{y}={\begin{cases}{\frac {1}{2^{n-1}}}&\quad {\text{if }}y\cdot s{\text{ is even}}\\0&\quad {\text{if }}y\cdot s{\text{ is odd}}\\\end{cases}}}$

Thus, in both cases, the measurement results in some string ${\displaystyle y\in \{0,1\}^{n}}$ that satisfies ${\displaystyle s\cdot y=0}$, and the distribution is uniform over all of the strings that satisfy this constraint.

Is this enough information to determine ${\displaystyle s}$? The answer is "yes", provided that the process (above) is repeated several times (and a small probability of failure is accepted). Specifically, if the above process is run ${\displaystyle n-1}$ times, we get ${\displaystyle n-1}$ strings ${\displaystyle y_{1},y_{2},\dots ,y_{n-1}\in \{0,1\}^{n}}$, such that

${\displaystyle {\begin{cases}y_{1}\cdot s&=0\\y_{2}\cdot s&=0\\&\vdots \\y_{n-1}\cdot s&=0\end{cases}}}$

This is a system of ${\displaystyle n-1}$ linear equations in ${\displaystyle n}$ unknowns (i.e. the bits of ${\displaystyle s}$), and the goal is to solve it to obtain ${\displaystyle s}$. Note that each of the ${\displaystyle y_{1},y_{2},\dots ,y_{n-1}\in \{0,1\}^{n}}$ that we obtain after each measurement (for each "round" of the process) is, of course, the result of a measurement, so it is known (at the end of each "round").

We only get a unique non-zero solution ${\displaystyle s}$ if we are "lucky" and ${\displaystyle y_{1},y_{2},\dots ,y_{n-1}\in \{0,1\}^{n}}$ are linearly independent. The probability that ${\displaystyle y_{1},y_{2},\dots ,y_{n-1}}$ are linearly independent is at least

${\displaystyle \prod _{k=1}^{\infty }\left(1-{\frac {1}{2^{k}}}\right)=0.288788\dots >{\frac {1}{4}}}$

If we have linear independence, we can solve the system to get a candidate solution ${\displaystyle s'\neq 0^{n}}$ and test that ${\displaystyle f(0^{n})=f(s')}$. If ${\displaystyle f(0^{n})=f(s')}$, we know that ${\displaystyle s=s'}$, and the problem has been solved. If ${\displaystyle f(0^{n})\neq f(s')}$, it must be that ${\displaystyle s=0^{n}}$ (because, if this were not so, the unique non-zero solution to the linear equations would have been ${\displaystyle s}$). Either way, once we have linear independence, we can solve the problem.