In the past thirty years, differential geometry has undergone an enormous change with infusion of topology, Lie theory, complex analysis, algebraic geometry and partial differential equations. Professor Matsushima played a leading role in this transformation by bringing new techniques of Lie groups and Lie algebras into the study of real and complex manifolds. This volume is a collection of all the 46 papers written by him.Contents:On Algebraic Lie Groups and AlgebrasOn a Theorem Concerning the Prolongation of a Differential SystemSome Studies on Kaehlerian Homogeneous SpacesOn the First Betti Number of Compact Quotient Spaces of Higher-Dimensional Symmetric SpacesOn the Cohomology Groups Attached to Certain Vector Valued Differential Forms on the Product of the Upper Half PlanesOn Certain Cohomology Groups Attached to Hermitian Symmetric SpacesHolomorphic Vector Fields and the First Chern Class of a Hodge ManifoldOn the Tube DomainsOn a Problem of Stoll Concerning a Cohomology Map from a Flag Manifold into a Grassmann ManifoldOn the Intermediate Cohomology Group of a Holomorphic Line Bundle over a Complex Torusand other papersReadership: Mathematicians.Key Features:Caters to a wide range of interests and expertise in violin acousticsFirst book to bring together historical and scientific material concerning violins, particularly Cremona violins