In the mathematical field of category theory, the product of two categories C and D, denoted C × D and called a product category, is an extension of the concept of the Cartesian product of two sets. Product categories are used to define bifunctors and multifunctors. (Wikipedia).
Building A Product From The Ground Up
For most seasoned business owners and aspiring entrepreneurs, the product development process often carries a mystical aura. Product development refers to the complete process of taking a product to market. It also covers renewing an existing product and introducing an old product to a new
From playlist Product Development
Webinar: If I build it, will they come? Understanding Product-Market Fit
Learn more at: https://stanford.io/370yNcZ So your company has a product idea. How do you know if this product is worth building? Will there be a demand for it? Enter: product-market fit. Put simply, product-market fit means that there are enough people out there who will buy what your c
From playlist Leadership & Management
What It Takes To Become A Great Product Manager
You have probably heard other people refer to Product Managers as the “CEO of the product.” I disagree because product managers simply don’t have any direct authority over most of the things needed to make their products successful: from user and data research through design and developmen
From playlist Product Development
Product Management: Transforming Opportunities into Great Products
Join Stanford Online course "Product Management: Transforming Opportunities into Great Products". https://stanford.io/3OeEOCW Game-changing products come from all sorts of companies, and often reshape industries overnight. But what do these products have in common? They’re all created an
From playlist Product Management
Category theory for JavaScript programmers #9: products in other categories
http://jscategory.wordpress.com/source-code/
From playlist Category theory for JavaScript programmers
The Explainer: Don’t Just Sell Stuff — Satisfy Needs
Theodore Levitt's classic theory says that an industry is a customer-satisfying process, not a goods-producing process. An industry begins with the customer and his or her needs, not with a patent, a raw material, or a selling skill. Given the customer’s needs, the industry develops bac
From playlist The Explainer
You Want to Be a Product Manager? 12-Step Guide
Whether you’re making a career change or striving to break into the industry for the first time, the path to becoming a product manager can be successfully navigated if approached properly. Watch this video to learn about the steps you need to take in order to become a successful Product
From playlist Product Manager
What Is Industrial Design?: Understanding Design
Industrial design, which is also known as product design, is the creation of consumer goods, from the smallest spoon to the largest machine. Industrial designers seek to optimize the function, value and appearance of products and systems. Join Prasad Boradkar, a professor emeritus of ind
From playlist Understanding Design
Product Manager Roles And Responsibilities | Who Is A Product Manager? | Simplilearn
This video on who is a product manager by simplilearn is dedicated to helping aspiring product managers and professionals to have a detailed understanding on who is a product manager, skills required to become a product management professional and the roles and responsibilities of a produc
From playlist Product Management
How To Create Grocery Delivery Web App In Python | Session 09 | #python | #webapp | #programming
Don’t forget to subscribe! In this project, we will create a simple grocery store web app in Python; Django, and PostgreSQL, we will learn how to create categories and subcategories, how to create products, manage stock, add to cart, completing an order, and creating a profile. Using Dja
From playlist Create Grocery Delivery Web App In Python
Category Theory 7.1: Functoriality, bifunctors
Functoriality, bifunctors
From playlist Category Theory
Category Theory 10.2: Monoid in the category of endofunctors
Monad as a monoid in the category of endofunctors
From playlist Category Theory
On the classification of fusion categories – Sonia Natale – ICM2018
Algebra Invited Lecture 2.5 On the classification of fusion categories Sonia Natale Abstract: We report, from an algebraic point of view, on some methods and results on the classification problem of fusion categories over an algebraically closed field of characteristic zero. © Interna
From playlist Algebra
Categories 6 Monoidal categories
This lecture is part of an online course on categories. We define strict monoidal categories, and then show how to relax the definition by introducing coherence conditions to define (non-strict) monoidal categories. We finish by defining symmetric monoidal categories and showing how super
From playlist Categories for the idle mathematician
Rapid E-Commerce with Angular and Moltin - Easy, Fast E-Commerce Development
Let's build an E-Commerce site FAST with Angular and Moltin. Signup for Moltin's Free Tier Here: http://midga.me/1zSkKYS Again, this is a sponsored video - Moltin asked if I'd be interested in featuring their product, and I clearly approve. Wanna see a full-blown implementation in angula
From playlist MEAN Stack Tutorials (MongoDB, Express, Angular, Node)
Higher Algebra 9: Symmetric monoidal infinity categories
In this video, we introduce the notion of a symmetric monoidal infinity categories and give some examples. Feel free to post comments and questions at our public forum at https://www.uni-muenster.de/TopologyQA/index.php?qa=tc-lecture Homepage with further information: https://www.uni-mu
From playlist Higher Algebra
The dependent product as universal construction
In this video I elaborate on the general arrow theoretic characterization of dependent product (or the dependent product functor) that exists in a Cartesian closed category. This is the dependent product that gives dependent product types its name, and it arises in concrete cases in geomet
From playlist Logic
Categories 5 Limits and colimits
This lecture is part of an online course on category theory. We define limits and colimits of functors, and show how various constructions (products, kernels, inverse limits, and so on) are special cases of this. We also describe how adoint functors preserve limits or colimits. For the
From playlist Categories for the idle mathematician
Towards a modular "2 realizations" equivalence - Simon Riche
Geometric and Modular Representation Theory Seminar Topic: Towards a modular "2 realizations" equivalence Speaker: Simon Riche Affiliation: Université Clermont Auvergne; Member, School of Mathematics Date: May 05, 2021 For more video please visit http://video.ias.edu
From playlist Seminar on Geometric and Modular Representation Theory