Obeliscus Pamphilius, also known as "Pamphilius' Obelisk," is an ancient Egyptian obelisk that was brought to Rome during the reign of Pope Sixtus V in the late 16th century. The obelisk originally stood in Heliopolis, Egypt, and is notable for its height and the hieroglyphics inscribed on its sides.
The "Pantometrum Kircherianum" is a work by the 17th-century Jesuit scholar Athanasius Kircher. It is essentially an elaborate description of a device he designed for various purposes, including the measurement of distances and the demonstration of scientific principles. Kircher was known for his wide-ranging interests in science, art, and invention, and his works often blended elements of mathematics, physics, and philosophy.
Correlation clustering is a type of clustering algorithm used to group a set of objects based on the correlations among the objects rather than traditional distance measures. Unlike typical clustering methods, which often rely on distance metrics (like Euclidean distance), correlation clustering focuses on maximizing the number of pairs of similar items within the same cluster while minimizing the pairs of dissimilar items in the same cluster.
A Hamiltonian path in a graph is a path that visits each vertex exactly once. If a Hamiltonian path exists that also returns to the starting vertex, forming a cycle, it is called a Hamiltonian cycle (or Hamiltonian circuit). Finding Hamiltonian paths and cycles is a well-known problem in graph theory and is closely related to many important problems in computer science, including the Traveling Salesman Problem (TSP).
A **spanning tree** is a concept from graph theory and is particularly important in the field of computer science, networking, and related disciplines. Here’s a breakdown of the concept: 1. **Definition**: A spanning tree of a graph is a subgraph that includes all the vertices of the original graph and is connected, without any cycles. This means it is a tree structure that spans all the vertices in the graph.
A crossed module is a concept from the field of algebraic topology and homological algebra, particularly in the study of algebraic structures that relate groups and their actions. A crossed module consists of two groups \( G \) and \( H \) along with two homomorphisms: 1. A group homomorphism \( \partial: H \to G \) (called the boundary map).
In mathematics, the term "solenoid" can refer to a few different concepts depending on the context, particularly in topology. The most common usage refers to a specific type of topological space, often related to concepts in algebraic topology. ### Topological Solenoid A **topological solenoid** can be thought of as a compact, connected, and locally connected topological space that can be constructed as an inverse limit of circles (S¹).
Twisted Poincaré duality is a concept in algebraic topology that extends classical Poincaré duality.
Category theory is a branch of mathematics that deals with abstract structures and relationships between them. A category consists of objects and morphisms (arrows) that represent relationships between those objects. The central concepts of category theory include: 1. **Objects:** These can be anything—sets, spaces, groups, or more abstract entities. 2. **Morphisms:** These are arrows that represent relationships or functions between objects.
Grothendieck's Galois theory is an advanced branch of algebraic geometry and algebraic number theory that generalizes classical Galois theory. Introduced by Alexander Grothendieck in the 1960s, it focuses on the relationship between fields, algebraic varieties, and their coverings, especially in the context of schemes.
Pointless topology, also known as "point-free topology," is a branch of topology that focuses on the study of topological structures without reference to points. Instead of using points as the fundamental building blocks, it emphasizes the relationships and structures formed by open sets, closed sets, or more general constructs such as locales or spaces. In typical point-set topology, a topological space is defined as a set of points along with a collection of open sets that satisfy certain axioms.
The term "divided domain" can refer to several concepts depending on the context in which it is used. Here are a few interpretations: 1. **Mathematics and Set Theory**: In mathematics, particularly in set theory and analysis, a divided domain may refer to a partitioned set where a domain is split into distinct subdomains or subsets. Each subset can be analyzed independently, often to simplify complex problems or to study properties that hold for each subset.
In category theory, a **subterminal object** is a specific type of object that generalizes the notion of a "singleton" in a categorical context. To understand it, let's first define a few key concepts: 1. **Category**: A category consists of objects and morphisms (arrows between objects) that satisfy certain properties (closure under composition, associativity, and identity).
In mathematics, a **topological category** is a category in which the morphisms (arrows) have certain continuity properties that are compatible with a topological structure on the objects. The concept arises in the field of category theory and topology and serves as a framework for studying topological spaces and continuous functions through categorical methods. ### Basic Components: 1. **Objects**: The objects in a topological category are typically topological spaces.
Pinned article: Introduction to the OurBigBook Project
Welcome to the OurBigBook Project! Our goal is to create the perfect publishing platform for STEM subjects, and get university-level students to write the best free STEM tutorials ever.
Everyone is welcome to create an account and play with the site: ourbigbook.com/go/register. We belive that students themselves can write amazing tutorials, but teachers are welcome too. You can write about anything you want, it doesn't have to be STEM or even educational. Silly test content is very welcome and you won't be penalized in any way. Just keep it legal!
Intro to OurBigBook
. Source. We have two killer features:
- topics: topics group articles by different users with the same title, e.g. here is the topic for the "Fundamental Theorem of Calculus" ourbigbook.com/go/topic/fundamental-theorem-of-calculusArticles of different users are sorted by upvote within each article page. This feature is a bit like:
- a Wikipedia where each user can have their own version of each article
- a Q&A website like Stack Overflow, where multiple people can give their views on a given topic, and the best ones are sorted by upvote. Except you don't need to wait for someone to ask first, and any topic goes, no matter how narrow or broad
This feature makes it possible for readers to find better explanations of any topic created by other writers. And it allows writers to create an explanation in a place that readers might actually find it.Figure 1. Screenshot of the "Derivative" topic page. View it live at: ourbigbook.com/go/topic/derivativeVideo 2. OurBigBook Web topics demo. Source. - local editing: you can store all your personal knowledge base content locally in a plaintext markup format that can be edited locally and published either:This way you can be sure that even if OurBigBook.com were to go down one day (which we have no plans to do as it is quite cheap to host!), your content will still be perfectly readable as a static site.
- to OurBigBook.com to get awesome multi-user features like topics and likes
- as HTML files to a static website, which you can host yourself for free on many external providers like GitHub Pages, and remain in full control
Figure 3. Visual Studio Code extension installation.Figure 4. Visual Studio Code extension tree navigation.Figure 5. Web editor. You can also edit articles on the Web editor without installing anything locally.Video 3. Edit locally and publish demo. Source. This shows editing OurBigBook Markup and publishing it using the Visual Studio Code extension.Video 4. OurBigBook Visual Studio Code extension editing and navigation demo. Source. - Infinitely deep tables of contents:
All our software is open source and hosted at: github.com/ourbigbook/ourbigbook
Further documentation can be found at: docs.ourbigbook.com
Feel free to reach our to us for any help or suggestions: docs.ourbigbook.com/#contact





