Non Additive Geometry

Non Additive Geometry introduces a groundbreaking approach to arithmetic geometry, replacing traditional structure of a commutative rings with Props and Bioperads — algebraic systems that can handle matrix multiplication and block direct sums. These structures allow for a deeper exploration of algebraic geometry, where addition no longer holds as a universal operation, particularly at the critical "Real prime."

The book presents an innovative and comprehensive study of this new geometric framework, discussing its implications for arithmetic geometry and its potential applications in physics. Chapters explore topics such as generalized schemes, sheaves, ideals and primes, localization, and higher K-theory, following Grothendieck's pioneering methods while extending them to accommodate the needs of arithmetic. The text also addresses future applications, leaving room for readers to explore new directions and potential breakthroughs.

This monograph is essential reading for advanced graduate students, researchers, and professionals in mathematics and theoretical physics interested in the foundations of arithmetic geometry, the role of Props and Bioperads, and their applications to broaden our concept of geometry, and therefore have new geometrical data, such asSpec(𝕫 ⊗ 𝕫).

• Props
• Associating Props with Rings
• Bio(perads)
• Commutativity for Bios
• Ideals and Primes
• The Spectrum
• Localization
• Sheaves
• Generalized Schemes
• Pro-Schemes
• Valuations and Beta Integrals
• Categorical Objects and A-modules
• Derivations and Differential
• Simplicial Objects and the Cotangent Complex
• Properties of Generalized Schemes
• Higher K-theory
• The Witt Ring
• Modules over the Sphere Spectrum