Regular-closed spaces and proximities
Regular-closed spaces and proximities

∗-AUTONOMOUS CATEGORIES: ONCE MORE
โˆ—-AUTONOMOUS CATEGORIES: ONCE MORE

Algebraic Topology
Algebraic Topology

Involutions on algebras of operators
Involutions on algebras of operators

1. Quick intro 2. Classifying spaces
1. Quick intro 2. Classifying spaces

Sage Quick Reference - Sage Wiki
Sage Quick Reference - Sage Wiki

... V.dimension() V.basis() V.echelonized_basis() V.has_user_basis() with non-canonical basis? V.is_subspace(W) True if W is a subspace of V V.is_full() rank equals degree (as module)? Y = GF(7)^4, T = Y.subspaces(2) T is a generator object for 2-D subspaces of Y [U for U in T] is list of 2850 2-D subsp ...
What is a Dirac operator good for?
What is a Dirac operator good for?

Extreme Points in Isometric Banach Space Theory
Extreme Points in Isometric Banach Space Theory

BALANCING UNIT VECTORS
BALANCING UNIT VECTORS

Basic Linear Algebra - University of Glasgow, Department of
Basic Linear Algebra - University of Glasgow, Department of

Orthogonal bases are Schauder bases and a characterization
Orthogonal bases are Schauder bases and a characterization

... condition for a locally convex s-algebra with an unconditional orthogonal basis to be ^4-convex (Theorem 4.6); and we use this result to characterize the algebra s (Theorem 4.7). In the sequel, all topological algebras and topological vector spaces are Hausdorff with jointly continuous multiplicatio ...
OPERADS, FACTORIZATION ALGEBRAS, AND (TOPOLOGICAL
OPERADS, FACTORIZATION ALGEBRAS, AND (TOPOLOGICAL

Differential Topology Operations on vector bundles, and Homework
Differential Topology Operations on vector bundles, and Homework

Complex interpolation
Complex interpolation

Monomial regular sequences - Oklahoma State University
Monomial regular sequences - Oklahoma State University

SOME PARI COMMANDS IN ALGEBRAIC NUMBER
SOME PARI COMMANDS IN ALGEBRAIC NUMBER

continuity
continuity

MATH 240 – Spring 2013 – Exam 1
MATH 240 โ€“ Spring 2013 โ€“ Exam 1

Continuity and the Intermediate Value Theorem
Continuity and the Intermediate Value Theorem

Notes
Notes

NOETHERIANITY OF THE SPACE OF IRREDUCIBLE
NOETHERIANITY OF THE SPACE OF IRREDUCIBLE

A Hake-type theorem for integrals with respect to
A Hake-type theorem for integrals with respect to

§1: FROM METRIC SPACES TO TOPOLOGICAL SPACES We
ยง1: FROM METRIC SPACES TO TOPOLOGICAL SPACES We

Introduction to linear Lie groups
Introduction to linear Lie groups

8. The Lie algebra and the exponential map for general Lie groups
8. The Lie algebra and the exponential map for general Lie groups

Dual space

In mathematics, any vector space V has a corresponding dual vector space (or just dual space for short) consisting of all linear functionals on V together with a naturally induced linear structure. Dual vector spaces for finite-dimensional vector spaces show up in tensor analysis. When applied to vector spaces of functions (which are typically infinite-dimensional), dual spaces are used to describe measures, distributions, and Hilbert spaces. Consequently, the dual space is an important concept in functional analysis.There are two types of dual spaces: the algebraic dual space, and the continuous dual space. The algebraic dual space is defined for all vector spaces. When defined for a topological vector space there is a subspace of this dual space, corresponding to continuous linear functionals, which constitutes a continuous dual space.