Laegna Theorems

A comprehensive framework exploring four-valued logic systems and the nature of mathematical infinity

Two Fundamental Frameworks

The Laegna ecosystem presents revolutionary approaches to logic and infinity through rigorous mathematical proofs

Ponegation
A four-valued logic system replacing binary True/False with Negotion, Negation, Position, and Posetion

Three Forms of Application

  • SpiPonegation: Life and spiritual systems
  • SpaPonegation: Machine and material processes
  • ProPonegation: Programming and automata
Explore Ponegation
Essential Infinities
Three categories of mathematical proofs exploring the nature and behavior of infinite systems

Three Proof Categories

  • Spatial Infinities: Coordinate systems and geometric space
  • Infinity Mapping: Discrete numbers and function limits
  • Infinite Geometry: Projective theorems and relations
Explore Infinities

About the Author

Tambet Vali is an independent researcher and mathematician who has dedicated years to exploring the fundamental nature of logic and infinity. His work challenges conventional mathematical frameworks and offers new perspectives on how we understand truth, computation, and the infinite.

Through the development of Ponegation—a four-valued logic system—and his extensive work on infinity theorems, Tambet has created a comprehensive mathematical framework that bridges philosophical inquiry with rigorous proof. His research spans multiple domains, from spiritual and material systems to programming and automata theory.

The Laegna theorems represent a synthesis of years of careful mathematical work, documented across multiple repositories and publications. Tambet's approach combines formal mathematical rigor with accessible explanations, making complex concepts approachable for both specialists and curious minds.

Connect: GitHub · SpiReason

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