Call Number (LC) Title Results
QA171.485 .L36 2013eb The poset of k-shapes and branching rules for k-Schur functions / 1
QA171.485 .W32 1997 The structure of k-CS-transitive cycle-free partial orders / 1
QA171.5 Axioms for lattices and boolean algebras /
Lattice theory /
The congruences of a finite lattice : a "proof-by-picture" approach /
Lattice rules : numerical integration, approximation, and discrepancy /
4
QA171.5 .A45 2012 The reflective Lorentzian lattices of rank 3 / 1
QA171.5 .A47 2003 Integer points in polyhedra : geometry, number theory, algebra, optimization : proceedings of an AMS-IMS-SIAM Joint Summer Research Conference on Integer Points in Polyhedra, Geometry, Number Theory, Algebra, Optimization, July 13-17, 2003, Snowbird, Utah /
Integer points in polyhedra : geometry, number theory, algebra, optimization : proceedings of an AMS-IMS-SIAM Joint Summer Research Conference on Integer Points in Polyhedra, July 13-17, 2003, Snowbird, Utah /
2
QA171.5 .B3 1990 Positive definite unimodular lattices with trivial automorphism groups / 1
QA171.5 .B6 1948 Lattice theory. 1
QA171.5 .B67 2013 Lattice sums then and now / 1
QA171.5 .C37 2001 Non-uniform lattices on uniform trees / 1
QA171.5 .C6 Continuous lattices : proceedings of the Conference on Topological and Categorical Aspects of Continuous Lattices (Workshop IV) : held at the University of Bremen, Germany, November 9-11, 1979 / 1
QA171.5 .C675 2003eb Continuous lattices and domains / 1
QA171.5 .D38 1990 Introduction to lattices and order / 1
QA171.5 .F72 1995 Free lattices / 1
QA171.5 .F74 The structure of modular lattices of width four with applications to varieties of lattices / 1
QA171.5 .F74 1977eb The structure of modular lattices of width four with applications to varieties of lattices / 1
QA171.5 .G66 2005 The complete dimension theory of partially ordered systems with equivalence and orthogonality / 1
QA171.5 .G76 General lattice theory / 1
QA171.5 .G77 Lattice theory; first concepts and distributive lattices. 1
QA171.5 .H644 2017eb Entire Solutions for Bistable Lattice Differential Equations with Obstacles. 1
QA171.5 .K43 2013eb The shape of congruence lattices / 1