<buttonid="sidebar-toggle"class="icon-button"type="button"title="Toggle Table of Contents"aria-label="Toggle Table of Contents"aria-controls="sidebar">
<inputtype="search"id="searchbar"name="searchbar"placeholder="Search this book ..."aria-controls="searchresults-outer"aria-describedby="searchresults-header">
<p>A permutation is a one-to-one and onto mapping of a set onto itself. A permutation can be
factored uniquely into a composition of cycles (up to ordering of cycles, and rotation of
each cycle).</p>
<p>We sometimes use <ahref="https://en.wikipedia.org/wiki/Permutation#Cycle_notation">cycle notation</a>
to write permutations. Let <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">(</span><spanclass="mord mathnormal">a</span><spanclass="mspace"></span><spanclass="mord mathnormal">b</span><spanclass="mspace"></span><spanclass="mord mathnormal">c</span><spanclass="mclose">)</span></span></span></span> denote a cycle where <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">a</span></span></span></span> maps to <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal">b</span></span></span></span>, <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal">b</span></span></span></span> maps to
<spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">c</span></span></span></span>, and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">c</span></span></span></span> maps to <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">a</span></span></span></span> (with the obvious generalisation to arbitrary-sized cycles).
Writing two or more cycles next to each other denotes a composition of the corresponding
permutations. For example, <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">(</span><spanclass="mord mathnormal">a</span><spanclass="mspace"></span><spanclass="mord mathnormal">b</span><spanclass="mclose">)</span><spanclass="mspace"></span><spanclass="mopen">(</span><spanclass="mord mathnormal">c</span><spanclass="mspace"></span><spanclass="mord mathnormal">d</span><spanclass="mclose">)</span></span></span></span> denotes the permutation that maps <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">a</span></span></span></span> to <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal">b</span></span></span></span>,
<spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal">b</span></span></span></span> to <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">a</span></span></span></span>, <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">c</span></span></span></span> to <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal">d</span></span></span></span>, and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal">d</span></span></span></span> to <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">c</span></span></span></span>.</p>
<p>From this we have the equality-constraint sets <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">{</span><spanclass="mord mathnormal">a</span><spanclass="mpunct">,</span><spanclass="mspace"style="margin-right:0.16666666666666666em;"></span><spanclass="mord mathnormal">b</span><spanclass="mpunct">,</span><spanclass="mspace"style="margin-right:0.16666666666666666em;"></span><spanclass="mord mathnormal">c</span><spanclass="mclose">}</span></span></span></span> and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">{</span><spanclass="mord mathnormal">d</span><spanclass="mpunct">,</span><spanclass="mspace"style="margin-right:0.16666666666666666em;"></span><spanclass="mord mathnormal">e</span><spanclass="mclose">}</span></span></span></span>. We want to
<li>an array <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.87381em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathsf"style="margin-right:0.01389em;">mapping</span></span></span></span></span> for the permutation itself;</li>
<li>an auxiliary array <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.44444em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathsf">aux</span></span></span></span></span> that keeps track of a distinguished element of each
<li>another array <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.67937em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathsf">sizes</span></span></span></span></span> that keeps track of the size of each cycle.</li>
<p>We have the invariant that for each element <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span> in a given cycle <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.07153em;">C</span></span></span></span>, <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf">aux</span></span><spanclass="mopen">(</span><spanclass="mord mathnormal">x</span><spanclass="mclose">)</span></span></span></span>
points to the same element <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.5782em;vertical-align:-0.0391em;"></span><spanclass="mord mathnormal">c</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">∈</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.07153em;">C</span></span></span></span>. This allows us to quickly decide whether two given
elements <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span> and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.625em;vertical-align:-0.19444em;"></span><spanclass="mord mathnormal"style="margin-right:0.03588em;">y</span></span></span></span> are in the same cycle, by checking whether
size of the cycle containing <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span>. (This is guaranteed only for
<spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf">sizes</span></span><spanclass="mopen">(</span><spanclass="mord"><spanclass="mord mathsf">aux</span></span><spanclass="mopen">(</span><spanclass="mord mathnormal">x</span><spanclass="mclose">)))</span></span></span></span>, not for <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf">sizes</span></span><spanclass="mopen">(</span><spanclass="mord mathnormal">x</span><spanclass="mclose">)</span></span></span></span>.)</p>
for all <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span>, we set <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf"style="margin-right:0.01389em;">mapping</span></span><spanclass="mopen">(</span><spanclass="mord mathnormal">x</span><spanclass="mclose">)</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">=</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span>, <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf">aux</span></span><spanclass="mopen">(</span><spanclass="mord mathnormal">x</span><spanclass="mclose">)</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">=</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span>, and
<li>Check whether <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">left</span></span></span></span></span> and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">right</span></span></span></span></span> are already in the same cycle, i.e.
whether <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf">aux</span></span><spanclass="mopen">(</span><spanclass="mord"><spanclass="mord mathit">left</span></span><spanclass="mclose">)</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">=</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf">aux</span></span><spanclass="mopen">(</span><spanclass="mord"><spanclass="mord mathit">right</span></span><spanclass="mclose">)</span></span></span></span>. If so, there is
<li>Otherwise, <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">left</span></span></span></span></span> and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">right</span></span></span></span></span> belong to different cycles. Make
<spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">left</span></span></span></span></span> the larger cycle and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">right</span></span></span></span></span> the smaller one, by swapping them
<li>Following the mapping around the right (smaller) cycle, for each element <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">x</span></span></span></span> set
<li>Splice the smaller cycle into the larger one by swapping <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf"style="margin-right:0.01389em;">mapping</span></span><spanclass="mopen">(</span><spanclass="mord"><spanclass="mord mathit">left</span></span><spanclass="mclose">)</span></span></span></span>
with <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathsf"style="margin-right:0.01389em;">mapping</span></span><spanclass="mopen">(</span><spanclass="mord"><spanclass="mord mathit">right</span></span><spanclass="mclose">)</span></span></span></span>.</li>
<p>For example, given two disjoint cycles <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">(</span><spanclass="mord mathnormal">A</span><spanclass="mspace"></span><spanclass="mord mathnormal"style="margin-right:0.05017em;">B</span><spanclass="mspace"></span><spanclass="mord mathnormal"style="margin-right:0.07153em;">C</span><spanclass="mspace"></span><spanclass="mord mathnormal"style="margin-right:0.02778em;">D</span><spanclass="mclose">)</span></span></span></span> and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">(</span><spanclass="mord mathnormal"style="margin-right:0.05764em;">E</span><spanclass="mspace"></span><spanclass="mord mathnormal"style="margin-right:0.13889em;">F</span><spanclass="mspace"></span><spanclass="mord mathnormal">G</span><spanclass="mspace"></span><spanclass="mord mathnormal"style="margin-right:0.08125em;">H</span><spanclass="mclose">)</span></span></span></span>:</p>
<pre><codeclass="language-plaintext">A +---> B
^ +
| |
+ v
D <---+ C E +---> F
^ +
| |
+ v
H <---+ G
</code></pre>
<p>After adding constraint <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.05017em;">B</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">≡</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.05764em;">E</span></span></span></span> the above algorithm produces the cycle:</p>
<pre><codeclass="language-plaintext">A +---> B +-------------+
<p>If we did not check whether <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">left</span></span></span></span></span> and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.8888799999999999em;vertical-align:-0.19444em;"></span><spanclass="mord"><spanclass="mord mathit">right</span></span></span></span></span> were already in the same
algorithm, then we would end up constructing the cycle <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mopen">(</span><spanclass="mord mathnormal">a</span><spanclass="mspace"></span><spanclass="mord mathnormal">b</span><spanclass="mclose">)</span><spanclass="mspace"></span><spanclass="mopen">(</span><spanclass="mord mathnormal">c</span><spanclass="mspace"></span><spanclass="mord mathnormal">d</span><spanclass="mclose">)</span></span></span></span>, rather than the
<p>We need to check a permutation of cells in <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">m</span></span></span></span> columns, represented in Lagrange basis by
<p>We first label each cell in those <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">m</span></span></span></span> columns with a unique element of <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.771331em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathbb">F</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.771331em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mbin mtight">×</span></span></span></span></span></span></span></span></span></span></span>.</p>
<p>Let <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.03588em;">ω</span></span></span></span> be a <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.849108em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord">2</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.849108em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight"style="margin-right:0.03148em;">k</span></span></span></span></span></span></span></span></span></span></span> root of unity and let <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.69444em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.03785em;">δ</span></span></span></span> be a <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.13889em;">T</span></span></span></span> root of unity, where
<spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.13889em;">T</span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span><spanclass="mbin">⋅</span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.924661em;vertical-align:-0.08333em;"></span><spanclass="mord"><spanclass="mord">2</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.8413309999999999em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight"style="margin-right:0.05764em;">S</span></span></span></span></span></span></span></span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span><spanclass="mbin">+</span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.64444em;vertical-align:0em;"></span><spanclass="mord">1</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">=</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.625em;vertical-align:-0.19444em;"></span><spanclass="mord mathnormal">p</span></span></span></span> with <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.13889em;">T</span></span></span></span> odd and <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.83041em;vertical-align:-0.13597em;"></span><spanclass="mord mathnormal"style="margin-right:0.03148em;">k</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">≤</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.68333em;vertical-align:0em;"></span><spanclass="mord mathnormal"style="margin-right:0.05764em;">S</span></span></span></span>.
We will use <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.824664em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathnormal"style="margin-right:0.03785em;">δ</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.824664em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight">i</span></span></span></span></span></span></span></span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span><spanclass="mbin">⋅</span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.863764em;vertical-align:-0.0391em;"></span><spanclass="mord"><spanclass="mord mathnormal"style="margin-right:0.03588em;">ω</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.824664em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight"style="margin-right:0.05724em;">j</span></span></span></span></span></span></span></span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">∈</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.771331em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathbb">F</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.771331em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mbin mtight">×</span></span></span></span></span></span></span></span></span></span></span> as the label for the
cell in the <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.85396em;vertical-align:-0.19444em;"></span><spanclass="mord mathnormal"style="margin-right:0.05724em;">j</span></span></span></span>th row of the <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.65952em;vertical-align:0em;"></span><spanclass="mord mathnormal">i</span></span></span></span>th column of the permutation argument.</p>
we can represent it as a vector of <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">m</span></span></span></span> polynomials <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathnormal">s</span><spanclass="msupsub"><spanclass="vlist-t vlist-t2"><spanclass="vlist-r"><spanclass="vlist"style="height:0.31166399999999994em;"><spanstyle="top:-2.5500000000000003em;margin-left:0em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight">i</span></span></span></span><spanclass="vlist-s"></span></span><spanclass="vlist-r"><spanclass="vlist"style="height:0.15em;"><span></span></span></span></span></span></span><spanclass="mopen">(</span><spanclass="mord mathnormal"style="margin-right:0.07847em;">X</span><spanclass="mclose">)</span></span></span></span> such that <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:1.0746639999999998em;vertical-align:-0.25em;"></span><spanclass="mord"><spanclass="mord mathnormal">s</span><spanclass="msupsub"><spanclass="vlist-t vlist-t2"><spanclass="vlist-r"><spanclass="vlist"style="height:0.31166399999999994em;"><spanstyle="top:-2.5500000000000003em;margin-left:0em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight">i</span></span></span></span><spanclass="vlist-s"></span></span><spanclass="vlist-r"><spanclass="vlist"style="height:0.15em;"><span></span></span></span></span></span></span><spanclass="mopen">(</span><spanclass="mord"><spanclass="mord mathnormal"style="margin-right:0.03588em;">ω</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.824664em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight"style="margin-right:0.05724em;">j</span></span></span></span></span></span></span></span><spanclass="mclose">)</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span><spanclass="mrel">=</span><spanclass="mspace"style="margin-right:0.2777777777777778em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.94248em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathnormal"style="margin-right:0.03785em;">δ</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.94248em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mtight"><spanclass="mord mtight"><spanclass="mord mathnormal mtight">i</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.8278285714285715em;"><spanstyle="top:-2.931em;margin-right:0.07142857142857144em;"><spanclass="pstrut"style="height:2.5em;"></span><spanclass="sizing reset-size3 size1 mtight"><spanclass="mord mtight"><spanclass="mord mtight">′</span></span></span></span></span></span></span></span></span></span></span></span></span></span></span></span></span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span><spanclass="mbin">⋅</span><spanclass="mspace"style="margin-right:0.2222222222222222em;"></span></span><spanclass="base"><spanclass="strut"style="height:0.94248em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathnormal"style="margin-right:0.03588em;">ω</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.94248em;"><spanstyle="top:-3.06
<p>Notice that the identity permutation can be represented by the vector of <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.43056em;vertical-align:0em;"></span><spanclass="mord mathnormal">m</span></span></span></span> polynomials
<p>The optimization used to obtain the simple representation of the identity permutation was suggested
by Vitalik Buterin for PLONK, and is described at the end of section 8 of the PLONK paper. Note that
the <spanclass="katex"><spanclass="katex-html"aria-hidden="true"><spanclass="base"><spanclass="strut"style="height:0.824664em;vertical-align:0em;"></span><spanclass="mord"><spanclass="mord mathnormal"style="margin-right:0.03785em;">δ</span><spanclass="msupsub"><spanclass="vlist-t"><spanclass="vlist-r"><spanclass="vlist"style="height:0.824664em;"><spanstyle="top:-3.063em;margin-right:0.05em;"><spanclass="pstrut"style="height:2.7em;"></span><spanclass="sizing reset-size6 size3 mtight"><spanclass="mord mathnormal mtight">i</span></span></span></span></span></span></span></span></span></span></span> are all distinct quadratic non-residues.</p>
