No.1423
‹­§–@‚Ζ‹‘εŠξ”Œφ—
Forcing Method and Large Cardinal Axioms
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2004/10/27`2004/10/29
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Yasuo@Yoshinobu@
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1. Templates and iterations Luminy 2002 lecture notes (Forcing Method and Large Cardinal Axioms)-------------------------------------1
@@@@_ŒΛ‘εŠwŽ©‘R‰ΘŠwŒ€‹†‰Θ@@@Brendle, Jorg
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2. PRINC$(\kappa, \lambda)$, $C^s(\kappa)$, HP$(\kappa)$ etc. and variants of the bounding number (Forcing Method and Large Cardinal Axioms)---13
@@@@’†•”‘εŠwHŠw•”@@@ŸΊ–μ Ή@(Fuchino, Sakae)
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3. Some partition properties for measurable colourings of $\omega^2_1$ (Forcing Method and Large Cardinal Axioms)-------------------28
@@@@_ŒΛ‘εŠwŽ©‘R‰ΘŠwŒ€‹†‰Θ@@@Hirschorn, James
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4. Cofinal types around $\mathcal{P}_\kappa\lambda$ and the tree property for directed sets (Forcing Method and Large Cardinal Axioms)---53
@@@@‘ˆξ“c‘εŠw—HŠwŒ€‹†‰Θ@@@•ΏŒΛ ³”V@(Karato, Masayuki)
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5. Finite support iteration of c.c.c forcing notions and Parametrized $\diamondsuit$-principles (Forcing Method and Large Cardinal Axioms)---69
@@@@_ŒΛ‘εŠwŽ©‘R‰ΘŠwŒ€‹†‰Θ@@@“μ —T–Ύ@(Minami, Hiroaki)
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6. Weak Kurepa trees and weak diamonds (Forcing Method and Large Cardinal Axioms)---------------------------------------------------84
@@@@“μŽR‘εŠw”—ξ•ρŠw•”@@@‹{Œ³ ’‰•q@(Miyamoto, Tadatoshi)
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7. A square principle in the context of $\mathcal{P}_\kappa\lambda$ (Forcing Method and Large Cardinal Axioms)---------------------106
@@@@_ŒΛ‘εŠwŽ©‘R‰ΘŠwŒ€‹†‰Θ@@@Piper, Greg
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8. Some characterizations of strongly $\sigma$-short Boolean Algebras (Forcing Method and Large Cardinal Axioms)-------------------124
@@@@_ŒΛ‘εŠw”­’B‰ΘŠw•”@@@‚‹΄ ^@(Takahashi, Makoto)
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9. $\clubsuit$ and destructible gaps (Forcing Method and Large Cardinal Axioms)----------------------------------------------------128
@@@@_ŒΛ‘εŠwŽ©‘R‰ΘŠwŒ€‹†‰Θ@@@ˆΛ‰ͺ ‹PK@(Yorioka, Teruyuki)
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