Volume 100

## Genetics of homotopy theory and the Adams conjecture

Pages 1-79 by Dennis Sullivan | From volume 100-1

## Automorphisms of the lattice of recursively enumerable sets. Part I. Maximal sets

Pages 80-120 by Robert I. Soare | From volume 100-1

## Curvature preserving diffeomorphisms

Pages 121-130 by Shing-Tung Yau | From volume 100-1

## On zeta functions associated with prehomogeneous vector spaces

Pages 131-170 by Mikio Sato, Takuro Shintani | From volume 100-1

## The multiplicity one theorem for $GL_n$

Pages 171-193 by Joseph Andrew Shalika | From volume 100-2

## Surgery with coefficients

Pages 194-248 by R. James Milgram | From volume 100-2

## Chevalley groups over function fields and automorphic forms

Pages 249-306 by Günter Harder | From volume 100-2

## The topological Schur lemma and related results

Pages 307-321 by Theodore Chang, Tor Skjelbred | From volume 100-2

## The Borel formula and the topological splitting principle for torus actions on a Poincaré duality space

Pages 322-325 by Christopher Allday, Tor Skjelbred | From volume 100-2

## The Selberg trace formula for groups of $F$-rank one

Pages 326-385 by James Arthur | From volume 100-2

## Counterexamples to the Seifert conjectures and opening closed leaves of foliations

Pages 386-400 by Paul A. Schweitzer, S. J. | From volume 100-2

## An exotic sphere with nonnegative sectional curvature

Pages 401-406 by Detlef Gromoll, Wolfgang Meyer | From volume 100-2

## Derivations of matroid $C^\ast$-algebras. II

Pages 407-422 by George A. Elliott | From volume 100-2

## Chern classes for singular algebraic varieties

Pages 423-432 by Robert D. MacPherson | From volume 100-2

## Operator algebras and invariant subspaces

Pages 433-532 by William Arveson | From volume 100-3

## On the Bezout problem for entire analytic sets

Pages 533-552 by Phillip A. Griffiths | From volume 100-3

## Some tempered distributions on semisimple groups of real rank one

Pages 553-584 by James Arthur | From volume 100-3

## The Wightman axioms and particle structure in the $\mathscr{P}(\phi)_2$ quantum field model

Pages 585-632 by James Glimm, Arthur Jaffe, Thomas Spencer | From volume 100-3

## Exact colimits. I

Pages 633-637 by John Isbell | From volume 100-3