Cardinal arithmetic

Is the continuum hypothesis still open? If we interpret it as finding the laws of cardinal arithmetic (really exponentiation since addition and multiplication were classically solved), it was thought to be essentially solved by the independence results of Goedel and Cohen (and Easton) with some isolated positive results (like Galvin-Hajnal). It was expected that only more independence results remained to be proved. The author has come to change his view: we should stress ]*N0 (not 2] ) and mainly look at the cofinalities rather than cardinalities, in particular pp (), pcf ( ). Their properties are investigated here and conventional cardinal arithmetic is reduced to 2]*N (*N - regular, cases totally independent) and various cofinalities. This enables us to get new results for the conventional cardinal arithmetic, thus supporting the interest in our view. We also find other applications, extend older methods of using normal fiters and prove the existence of Jonsson algebra.

• 1. Basic confinalities of small reduced products
• 2. *N*w+1 has a Jonsson algebra
• 3. There are Jonsson algebras in many inaccessible cardinals
• 4. Jonsson algebras in inaccessibles *P , not *P-Mahlo
• 5. Bounding pp( ) when > cf( ) > *N[0 using ranks and normal filters
• 6. Bounds of power of singulars: Induction
• 7. Strong covering lemma and CH in V[r]
• 8. Advanced: Cofinalities of reduced products
• 9. Cardinal Arithmetic
• Appendix 1: Colorings
• Appendix 2: Entangled orders and narrow Boolean algebras