Universality(Q875797) is technical terms defined in Mathematical Logic, however, as the word implies, its philosophical and operational implication reaches beyond the scope of mathematics, and logics. When used properly, universality can be a powerful tool to examine or categorize things/events that have generally applicable properties. It can have direct operational implication in designing data-intensive applications and engineering artifacts, particularly in the area of Internet of Things (IoT). Keep universality in mind during design, would significantly help the design and implementation quality of Information Architecture.

Universal Constructs

Universal property(Q1417809), also known as Universal construction, is a crucial concept pervasive in the literature of Category Theory. This concept, or the thesis of Category Theory, offered a very different approach to organize knowledge. According to Peloquin^[1]:

A universal property characterizes an object in a category, in an essentially unique way, in terms of its relation to other objects through arrows.

The statement shown above used a critical term, unique. It implies that all things, all phenomenon, if they were to be characterized uniquely, the unique way can be determined by the relation of the object to all other things^[2]. For staters, the uniqueness of relations may be verified using product, co-product, exponential, and other kind of arithmetic constructs. HandWiki has a detailed entry on the subject of property, explaining the concept of universal morphism.

This implication portrait a single, generalized relational mechanisms to define properties of individual things. All things can be characterized through relations with other things. This relationally-based approach means that you don't need to study anything else, unique properties of every individual can be universally represented using nothing but relations. All properties are just variants or descendants of this relational universal construct. PeloquinCite error: Invalid <ref> tag; invalid names, e.g. too many:

It allows us to avoid repeating the same proofs over and over again in different categories.

By not repeating oneself, it means we can apply this proven theory to generalize many kinds of proven results. This kind generalization, can be thought of as a rigorous belief mechanism, a universal construct.

Using the phrase:universal construct, Saint John Henry Newman who argued for all knowledge, including theology must be taught in a university, may have thought about the following logical argument, too. He stated:

If all things are descendants from a certain universal construct, religions must be derived from such construct.

The notion of utilizing universal construct to bridge understanding between different domain knowledge has been explicitly articulated by Olivia Caramello. She has several videos on this subject by Olivia Caramello^[3][4][5].

There are a few videos^[1][6][7] on Universal Properties.

Eugene Wigner's Comments

There is a video by Quanta Magzine:^[8] {{#ev:youtube |HrtJ3SRQF4E }}

Developmental History

The notion of universality has been discussed under a few different names. For example, Leibniz calls it Monad, which is a kind of universal construct that he claims to be the building block for anything, including material world, and non-material world, such as consciousness. The notion of Monad has since been extended by software engineers and mathematicians to model complex systems^[9][10]. As Richard Southwell explained in his video on Seven ways to visualize functions^[11], he stated that Category Theory is close to be the perfect language. This means that we should be able to represent all things in terms of functions. Paul Cohn published a book^[12] on Universal Algebra in 1965. The notion of representational universality has been proposed by Ben Koo that a small set of algebraic operations can represent systems of any kind in the paper^[13], Algebra of Systems. Brendan Fong's doctoral thesis^[14] on The Algebra of Open and Interconnected Systems may provide a theoretical foundation for creating such universal construct. The thesis explicitly presented the idea of decorated cospan as the central theme.

The Official Universal Data Type

Partially ordered set, or POSet is considered to be the universal data type for all things representable. As a mathematically rigorous property that applies to all cases in a domain explicitly represented by a fixed, often finite set of symbols. A short statement about POSet's Universality can be found on page 131 of Davey and Priestly^[15]Cite error: Invalid <ref> tag; invalid names, e.g. too many. More over, Eugene Wigner's talk on The Unreasonable Effectiveness of Mathematics in the Natural Sciences^[16], is also a good place to get a sense of universality.

Idealized Space

Another way to talk about universaily, is to think of it as a way to express the most ideal situation for representing certain concepts^[17]. There are also ways to operationalize the transformation of computable structure, such as work done by Michael Arbib^[18].

Namespace Management as a way to represent Idea Space

For the purpose of representability, using concrete names to denote ideas is a necessary practice. However, the practical matter of managing namespaces at large can be challenging. Therefore, using a general-purpose namespace management tool, such as MediaWiki, can be a pragmatic solution. Clearly, Wiki is not just about its database, but also the integrative user experience that come with its browser-friendly nature, so that everyone can use this namespace management infrastructure anywhere. Henceforth, Wiki's namespace management can be thought of as a kind of universal data abstraction mechanism. The three aspects of namespace management can be stated as:

1. Scalability: The sizes of application-specific namespaces can be scaled to requirements
2. Highly Available: The functionality of namespace management is always available
3. Security: Namespace data content can be protected in ways that will not be contaminated or destroyed.

Operational Advise

In order to attain universality operationally, it might be useful to read Peter Morville's book^[19] on Book/Planning for Everything.

References

Related Pages