Yu, Liang - Institute of Mathematical Science, Nanjing University

• Genericity Theory from the Randomness Institute of Mathematical Science
• CHARACTERIZING NONSTANDARD RANDOMNESS VIA MARTIN-LOF RANDOMNESS
• # 1 INDISCERNIBLES IN C.E. DEGREES WEI WANG AND LIANG YU
• HIGHER RANDOMNESS NOTIONS AND THEIR LOWNESS PROPERTIES
• SOME NOTES ON RANKED STRUCTURES 1. Inductive definitions and 1
• ON 1-STRUCTURAL DIFFERENCES AMONG ERSHOV HIERARCHIES
• ELEMENTARY DIFFERENCES AMONG FINITE LEVELS OF THE ERSHOV HIERARCHY
• Lowness for weakly 1-generic and Kurtz-random Frank Stephan1
• 1-UNIFORMIZATION PRINCIPLE FOR REALS C. T. CHONG AND LIANG YU
• HIGHER KURTZ RANDOMNESS BJRN KJOS-HANSSEN, ANDRE NIES, FRANK STEPHAN, AND LIANG YU
• OSCILLATION IN THE INITIAL SEGMENT COMPLEXITY OF RANDOM REALS
• MAXIMAL PAIRS OF C.E. REALS IN THE COMPUTABLY LIPSCHITZ DEGREES
• Relativizations of Randomness and Genericity Notions
• A NEW PROOF OF FRIEDMAN'S CONJECTURE Abstract. We give a new proof of Friedman's conjecture that every uncountable
• DESCRIPTIVE SET THEORETICAL COMPLEXITY OF RANDOMNESS Abstract. We study the descriptive set theoretical complexity of various randomness notions.
• SOME QUESTIONS Abstract. These are some questions I am every interested in. Your solution
• Ershov Hierarchies and Degree Theory Department of mathematics
• Recursion Theory in the Constructible Institute of Mathematical Science
• nnnzzz November 23, 2008
• On strong 1 1-ML-randomness
• Characterizing nonstandard
• Polygonal Numbers, Primes and Ternary Quadratic Forms
• TURING DEGREES AND THE ERSHOV HIERARCHY FRANK STEPHAN, YUE YANG AND LIANG YU
• The Theory of Higher Randomness Department of mathematics
• LOWNESS FOR GENERICITY Abstract. We study lowness for genericity. We show that there
• THIN MAXIMAL ANTICHAINS IN THE TURING DEGREES C. T. CHONG AND LIANG YU
• BOUNDING NON-GL2 AND R.E.A. KLAUS AMBOS-SPIES, DECHENG DING, WEI WANG, AND LIANG YU
• Last update: March 20, 2005. Introduction to Zhi-Wei Sun's Papers on Covers
• ON THE DEFINABLE IDEAL GENERATED BY NONBOUNDING C.E. DEGREES
• Some questions in higher randomness Institute of Mathematical Science
• THE STRENGTH OF PROJECTIVE MARTIN CONJECTURE C. T. CHONG, WEI WANG AND LIANG YU
• THERE IS NO SW-COMPLETE C.E. REAL LIANG YU AND DECHENG DING
• ARITHMETICAL SACKS FORCING ROD DOWNEY AND LIANG YU
• LOWNESS AND 0 ROD DOWNEY, ANDRE NIES, REBECCA WEBER, AND LIANG YU
• WHEN VAN LAMBALGEN'S THEOREM FAILS Abstract. We prove that van Lambalgen's Theorem fails for both Schnorr
• THERE ARE NO MAXIMAL LOW D.C.E. DEGREES ROD DOWNEY, LIANG YU
• A talk given at Universite de Saint-Etienne (France) on Feb. 1, 2005 and at Institut Camille Jordan, Univ. Lyon I (France) on March 3, 2005
• Annals of Pure and Applied Logic 129 (2004) 163180 www.elsevier.com/locate/apal
• Cofinal Chains in Joint with Wei
• COFINAL MAXIMAL CHAINS IN THE TURING DEGREES WEI WANG, LIUZHEN WU, AND LIANG YU
• Recursion Theory: From a generalized point of view
• WHEN IS X STRONGLY HYPERIMMUNE-FREE RELATIVE TO Y WOLFGANG MERKLE, FRANK STEPHAN AND LIANG YU