Hilbert II is an innovative software designed to empower mathematicians by providing them with a system through which they can input theorems easily. The goal of the software is to streamline the process of theorem generation and enable effective management of mathematical findings.
This software suite provides mathematicians with tools that enable them to put theorems and proofs in the knowledge base. Moreover, they are automatically verified by a proof checker. This software also allows for the integration of texts written in "common mathematical language" into the formal format. The system follows the qedeq modules structure, which essentially combines mathematical axioms, definitions, and propositions to form a mathematical textbook with formal proofs.
Since the system is not centrally administered, and references to any location on the internet are possible, a comprehensive world-wide mathematical knowledge base could be built. The dependency of each theorem, definition, and axiom is easily derived, making it possible to drill down to the elementary rules and axioms for any theorem.
The software's basic concept is published in a PDF document called "basic concept" and already generated from the XML file called qedeq_basic_concept.xml. The Hilbert II project is still in the first development phase, and the working prototype called Principia Mathematica II can fully support the first-order predicate logic and showcase the main features and functions of Hilbert II.
The current release features a lot of improvements and bug fixes. These improvements include new build processes, additional reports, and the inclusion of the Eclipse project directories in the magnified src directory. Moreover, the Apache Commons library has been integrated for thread-safe date formatting, and the package subdivision has led to significant changes in the project structure.
In conclusion, Hilbert II is a cutting-edge software suite designed to make mathematical knowledge more accessible, efficient, and verifiable. Its focus on making mathematical theorems and proofs readable and comprehensible by everyone makes it a valuable addition to the world of mathematics.
Version 0.03.11: N/A