报告题目:On linear preservers between matrices over an arbitrary field
报告人:黄毅青 教授 台湾中山大学
邀请人:刘 磊
报告时间:2023年11月10日(周五)下午14:30-15:30
报告地点:腾讯会议598-998-219
报告人简介:黄毅青 (Ngai-Ching Wong) ,台湾中山大学教授。黄毅青在泛函分析、算子代数领域开展了卓有成效的研究工作,获得了丰硕的研究成果。2004年,黄毅青教收受华人数学家大会 ICCM 2004邀请做45分钟报告。黄毅青教授发表SCI论文一百多篇,同时在多份著名SCI数学期刊,如Operators and Matrices, Linear and Multilinear Algebra, Banach Journal of Mathematical Analysis等, 担任编辑委员。
报告摘要:Let
be a linear map between matrices (maybe of different sizes) over an arbitrary field 
. Many preserver problems can be formulated as the one preserving matrices annihilated by a fixed polynomial
, i.e.,
For example, if
, the above is equivalent to that 
preserves idempotent matrices; while if 
, the above is equivalent to that preserves involution matrices. We find that when the domain 
, the zero set of 
is ``simple enough'' and 
is central in the range of , any such linear preserver assumes a canonical form, namely, 
for some invertible 
, and diagonal matrices 
of appropriate sizes. The diagonal entries 
of 
satisfy the multiplier condition 
. Here, by saying is ``simple enough'' we mean that the zeroes of does not form an additive coset of . The result is indeed a consequence of our new finding that any disjoint idempotent preserver assumes such a canonical form when the domain of is not 
.
