Browsing Department of Mathematics by Title
Now showing items 1425 of 25

Maslov theory and singularities
(20130207) 
Modular bootstrap data
(20200603)This data set includes the numerical data from the papers "Highdimensional sphere packing and the modular bootstrap" (by AfkhamiJeddi, Cohn, Hartman, de Laat, and Tajdini) and "Free partition functions and an averaged ... 
PaleyWiener theorems and surjectivity of invariant differential operators on symmetric spaces and Lie groups
(American Mathematical Society, 1973) 
The Picard Scheme
(201309)This article introduces, informally, the substance and the spirit of Grothendieck's theory of the Picard scheme, highlighting its elegant simplicity, natural generality, and ingenious originality against the larger ... 
Point configurations minimizing harmonic energy on spheres
(20210613)This data set contains updated numerical data for the paper "Experimental study of energyminimizing point configurations on spheres" (Experiment. Math. 18 (2009), no. 3, 257283). 
RadonFourier transforms on symmetric spaces and related group representations
(American Mathematical Society, 1965) 
Response to Steele Prize Award
(American Mathematical Society, 1988) 
Some results on invariant theory
(American Mathematical Society, 1962) 
Strictly small representations and a reduction theorem for the unitary dual
(American Mathematical Society, 2001)To any irreducible unitary representation X of a real reductive Lie group we associate in a canonical way, a Levi subgroup Gsu and a representation of this subgroup. Assuming a conjecture of the authors on the infinitesimal ... 
A term of Commutative Algebra
(Worldwide Center of Mathematics, 20130504)There is no shortage of books on Commutative Algebra, but the present book is different. Most books are monographs, with extensive coverage. But there is one notable exception: Atiyah and Macdonald's 1969 classic. It ... 
Topologies of group algebras and a theorem of Littlewood
(American Mathematical Society, 1957)An important problem in Fourier analysis is that of investigating the relationship between the "size" of a function and the "size" of its Fourier transform. The present paper can be regarded as a contribution to this problem. 
Two formulas for the BR multiplicity
(SpringerVerlag, 201607)We prove a projection formula, expressing a relative Buchsbaum–Rim multiplicity in terms of corresponding ones over a modulefinite algebra of pure degree, generalizing an old formula for the ordinary (Samuel) multiplicity. ...