Add to ORKGKollar\u27s effective base point free theorem for kawamata log terminal pairs is very important and was used in Hacon-McKernan\u27s proof of pl flips. In this paper, we generalize Kollar\u27s theorem for log canonical pairs
Abstract. We classify log-canonical pairs (X,∆) of dimension two with KX+∆ an ample Cartier divisor ...
Let (X, Delta) be a projective log canonical Calabi-Yau pair and L an ample Q-line bundle on X, we s...
Assume that $X$ is a normal projective variety over ${\Bbb C}$, of dimension $\leqq 3$, and that $(X...
Abstract. Kollár’s effective base point free theorem for kawa-mata log terminal pairs is very impor...
Abstract. We give a new proof to the base point free theorem for log canonical pairs
The main purpose of this paper is to advertise the power of the new cohomological technique introduc...
We prove that one can run the log minimal model program for log canonical 3-fold pairs in characteri...
We establish a Koll\'ar-type gluing theory for generalized log canonical pairs associated with crepa...
Abstract. We explain the fundamental theorems for the log min-imal model program for log canonical p...
Abstract. We prove the termination of 4-fold log flips for klt pairs of Kodaira dimension κ ≥ 2. 1
Abstract. In this paper, we prove that the log minimal model program in dimension d − 1 implies the ...
Abstract. In this paper, we discuss a proof of existence of log minimal models or Mori fibre spaces ...
Minimal log discrepancies (mld’s) are related not only to termina-tion of log flips [22], and thus t...
We use Koll\'ar's gluing theory to prove the contraction theorem for generalized pairs. In particula...
We prove that the target space of an extremal Fano contraction from a log canonical pair has only lo...
Abstract. We classify log-canonical pairs (X,∆) of dimension two with KX+∆ an ample Cartier divisor ...
Let (X, Delta) be a projective log canonical Calabi-Yau pair and L an ample Q-line bundle on X, we s...
Assume that $X$ is a normal projective variety over ${\Bbb C}$, of dimension $\leqq 3$, and that $(X...
Abstract. Kollár’s effective base point free theorem for kawa-mata log terminal pairs is very impor...
Abstract. We give a new proof to the base point free theorem for log canonical pairs
The main purpose of this paper is to advertise the power of the new cohomological technique introduc...
We prove that one can run the log minimal model program for log canonical 3-fold pairs in characteri...
We establish a Koll\'ar-type gluing theory for generalized log canonical pairs associated with crepa...
Abstract. We explain the fundamental theorems for the log min-imal model program for log canonical p...
Abstract. We prove the termination of 4-fold log flips for klt pairs of Kodaira dimension κ ≥ 2. 1
Abstract. In this paper, we prove that the log minimal model program in dimension d − 1 implies the ...
Abstract. In this paper, we discuss a proof of existence of log minimal models or Mori fibre spaces ...
Minimal log discrepancies (mld’s) are related not only to termina-tion of log flips [22], and thus t...
We use Koll\'ar's gluing theory to prove the contraction theorem for generalized pairs. In particula...
We prove that the target space of an extremal Fano contraction from a log canonical pair has only lo...
Abstract. We classify log-canonical pairs (X,∆) of dimension two with KX+∆ an ample Cartier divisor ...
Let (X, Delta) be a projective log canonical Calabi-Yau pair and L an ample Q-line bundle on X, we s...
Assume that $X$ is a normal projective variety over ${\Bbb C}$, of dimension $\leqq 3$, and that $(X...