- Dale
Husemöller (also
spelled Husemoller) is an
American mathematician specializing in
algebraic topology and
homological algebra who is
known for his...
-
Grothendieck (1972) Théorème 3.6, p. 351
Husemöller (1987) pp.116-117
Husemoller (1987) pp.116-117
Husemöller (1987) pp.266-269 Tate, John (1975), "Algorithm...
- Positive-definite
function Positive-definite
matrix Polarization identity Milnor &
Husemoller 1973, p. 61. This is true only over a
field of
characteristic other than...
- the unit hyperbola. The
notation ⟨1⟩ ⊕ ⟨−1⟩ has been used by
Milnor and
Husemoller: 9 for the
hyperbolic plane as the
signs of the
terms of the bivariate...
-
trivial if and only if
there is a
section that
vanishes nowhere, see
Husemoller (1994),
Corollary 8.3. The
sections of the
tangent bundle are just vector...
-
Gauge theory (mathematics) Prin****l
bundle Pullback bundle Vector bundle Husemöller, Dale (1994),
Fibre Bundles,
Springer Verlag, p. 12, ISBN 0-387-94087-1...
- conjugate. As in
Husemöller 2002,
chapter 16
Heilbronn (1967) p.204
Heilbronn (1967) p. 205 Tate (1967) p.169
Heilbronn (1967) p.207
Husemoller (1987) pp. 299–300;...
- (2007).
Compact Lie Groups. Springer-Verlag. ISBN 978-0-387-30263-8.
Husemoller, D (1994),
Fibre bundles, Springer,
Chapter 5 "Local
coordinate description...
-
Covering space Fibration Hu, Sze-Tsen (1959).
Homotopy Theory. page 24
Husemoller, Dale (1994).
Fibre Bundles. page 7 Steenrod,
Norman (1951). The Topology...
- Bundles. Princeton:
Princeton University Press. ISBN 0-691-00548-6. page 35
Husemoller, Dale (1994).
Fibre Bundles (Third ed.). New York: Springer. ISBN 978-0-387-94087-8...
