Founded in 1951 by

E.F. Beckenbach (1906-1982) and F. Wolf (1904-1989)

### Volume 92, Number 1

#### Publication Date: 1981

Miscellaneous front pages, Pacific Journal of Mathematics, volume 92, issue 1 (1981)

Lattices with unique complementation.

M. E. Adams and J. Sichler; 1-13

Positive solutions and spectral properties of second order elliptic operators.

W. Allegretto; 15-25

Holomorphy on spaces of distribution.

Philip J. Boland and Seán Dineen; 27-34

Duncan A. Buell, Philip A. Leonard and Kenneth S. Williams; 35-38

Two theorems on general symmetric spaces.

H. Busemann and B. B. Phadke; 39-48

Bounds for the Perron root of a nonnegative irreducible partitioned matrix.

Emeric Deutsch; 49-56

A difference equation and Hahn polynomials in two variables.

Charles F. Dunkl; 57-71

The Riemann mapping theorem for planar Nash rings.

G. Efroymson; 73-78

Tauberian theorems for matrices generated by analytic functions.

John A. Fridy and Robert E. Powell; 79-85

Some exact solutions of the nonlinear problem of water waves.

Denton E. Hewgill, John Reeder and Marvin Shinbrot; 87-109

The symplectic group over a ring with one in its stable range.

B. Kirkwood and B. R. McDonald; 111-125

Transitive groups of isometries on $H^{n}$.

Esther Portnoy; 127-139

On the sign of Green's functions for multipoint boundary value problems.

Jerry Ridenhour; 141-150

An $M$-ideal characterization of $G$-spaces.

Nina M. Roy; 151-160

On incomplete polynomials. II.

E. B. Saff and R. S. Varga; 161-172

The equations $\Delta u=Pu$ $(P\geq 0)$ on Riemann surfaces and isomorphisms between relative Hardy spaces.

Takeyoshi Satō; 173-194

Correction to: Peano models with many generic classes''.

J. H. Schmerl; 195-198

On the closed ideals in $A(W)$.

Charles M. Stanton; 199-209

Unitary equivalence to integral operators.

V. S. Sunder; 211-215

New explicit formulas for the $n$th derivative of composite functions.

Pavel G. Todorov; 217-236

Approximation by rational modules on boundary sets.

James Li Ming Wang; 237-239

The class number of ${\bf Q}(\sqrt{p})$ modulo $4$, for $p\equiv 5$ $({\rm mod}$ $8)$ a prime.

Kenneth S. Williams; 241-248

Miscellaneous back pages, Pacific Journal of Mathematics, volume 92, issue 1 (1981)