Algorithms Index

Last edited: October 10, 2025

SU-CS161 Things to Review

Lectures

Divide and Conquer

SU-CS161 SEP232025

Sorting

merge sort: SU-CS161 SEP252025
recurrence solving: SU-CS161 SEP302025
median: SU-CS161 OCT022025
randomized algos + quicksort: SU-CS161 OCT072025
linear time sorting: SU-CS161 OCT092025

Data Structures

red-black trees: SU-CS161 OCT142025
hashing: SU-CS161 OCT212025

Graphs

DFS/BFS: SU-CS161 OCT232025
Strongly connected components: SU-CS161 OCT282025
Dijikstra and Bellman-Ford: SU-CS161 OCT302025

DP

Greedy Algorithms

Closing

backpropegation

Last edited: October 10, 2025

backpropegation is a special case of “backwards differentiation” to update a computation grap.h

constituents

chain rule: suppose \(J=J\qty(g_{1}…g_{k}), g_{i} = g_{i}\qty(\theta_{1} \dots \theta_{p})\), then \(\pdv{J}{\theta_{i}} = \sum_{j=1}^{K} \pdv{J}{g_{j}} \pdv{g_{j}}{\theta_{i}}\)
a neural network

requirements

Consider the notation in the following two layer NN:

\begin{equation} z = w^{(1)} x + b^{(1)} \end{equation}

\begin{equation} a = \text{ReLU}\qty(z) \end{equation}

\begin{equation} h_{\theta}\qty(x) = w^{(2)} a + b^{(2)} \end{equation}

\begin{equation} J = \frac{1}{2}\qty(y - h_{\theta}\qty(x))^{2} \end{equation}

in a forward pass, compute the values of each value \(z^{(1)}, a^{(1)}, \ldots\)
in a backward pass, compute…
1. \(\pdv{J}{z^{(f)}}\): by hand
2. \(\pdv{J}{a^{(f-1)}}\): lemma 3 below
3. \(\pdv{J}{z^{f-1}}\): lemma 2 below
4. \(\pdv{J}{a^{(f-2)}}\): lemma 3 below
5. \(\pdv{J}{z^{f-2}}\): lemme 2 below
6. and so on… until we get to the first layer
after obtaining all of these, we compute the weight matrices'
1. \(\pdv{J}{W^{(f)}}\): lemma 1 below
2. \(\pdv{J}{W^{(f-1)}}\): lemma 1 below
3. …, until we get tot he first layer

chain rule lemmas

Pattern match your expressions against these, from the last layer to the first layer, to amortize computation.

deep learning

Last edited: October 10, 2025

supervised learning with non-linear models.

Motivation

Previously, our learning method was linear in the parameters \(\theta\) (i.e. we can have non-linear \(x\), but our \(\theta\) is always linear). Today: with deep learning we can have non-linearity with both \(\theta\) and \(x\).

constituents

We have \(\qty {\qty(x^{(i)}, y^{(i)})}_{i=1}^{n}\) the dataset
Our loss \(J^{(i)}\qty(\theta) = \qty(y^{(i)} - h_{\theta}\qty(x^{(i)}))^{2}\)
Our overall cost: \(J\qty(\theta) = \frac{1}{n} \sum_{i=1}^{n} J^{(i)}\qty(\theta)\)
Optimization: \(\min_{\theta} J\qty(\theta)\)
Optimization step: \(\theta = \theta - \alpha \nabla_{\theta} J\qty(\theta)\)
Hyperparameters:
- Learning rate: \(\alpha\)
- Batch size \(B\)
- Iterations: \(n_{\text{iter}}\)
stochastic gradient descent (where we randomly sample a dataset point, etc.) or batch gradient descent (where we scale learning rate by batch size and comput e abatch)
neural network

requirements

additional information

Background

Notation:

Dijikstra's Algorithm

Last edited: October 10, 2025

constituents

a weighted directed graph, meaning edges have weights
where cost of a path is the sum of the weights along that path
the shortest path is the path with the minimum cost
starting node \(s\), target node \(t\)

Each node has two states:

unlabeled
labeled

And stores a piece of information:

\(d\qty(v) = \text{distance}\qty(s, v)\)

We initialize \(d\qty(v) = \infty, v \neq s\) , and \(d\qty(s) = 0\).

requirements

pick the node \(u\) that has unlabeled state with smallest \(d\qty(u)\)
for all neighbor v of u:
1. set \(d\qty(v) = \min \qty(d\qty(v), d\qty(u) + \text{edgeWeight}\qty(u,v))\)
mark \(v\) as labeled

def dike(G,s,t):
    set verticies to State.NOTSURE
    for v in G.V:
        d[v] = float("+inf")
    d[s] = 0
    while State.NOTSURE in G.V:
        u = min(V for v in G.V if v.state == State.NOTSURE)
        for v in u.neighbors and v.state != SURE:
            d[v] = min(d[v], d[u] + edgeWeight(u,v))
        u.state = State.SURE
    return d[t]

additional information

proof

Let’s start with a lemma

Gaussian mixture model

Last edited: October 10, 2025

Gaussian mixture model is a density estimation technique, which is useful for detecting out of distribution samples, etc.

We will use the superposition for a group of Gaussian distributions that would explain the dataset.

Suppose the data was generated from a Mixture of Gaussian; then for every data point \(x^{(i)}\) there is a latent \(z^{(i)}\) which tells you what Gaussian your data point is generated from.

So, for \(k\) Gaussian in your mixture:

\(z^{(i)} \in \qty {1, \dots, k}\) such that \(z^{(i)} \sim \text{MultiNom}\qty(\phi)\) (such that \(\phi_{j} \geq 0\), \(\sum_{j}^{} \phi_{j} = 1\))