A Pin−-cobordism invariant and a generalization of the Rokhlin signature congruence

Date

1991-04-01

Author

Finashin, Sergey

Metadata

Show full item record

This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

Item Usage Stats

85
views

0
downloads

URI

https://hdl.handle.net/11511/92754

Journal

Leningrad Math. J., 2:4 (1991), 917–92

Collections

Department of Mathematics, Article

Suggestions

OpenMETU
Core

A NONCOMMUTATIVE-THEORY OF BADE FUNCTIONALS HADWIN, D; ORHON, M (Cambridge University Press (CUP), 1991-01-01) Since the pioneering work of W. G. Bade [3, 4] a great deal of work has been done on bounded Boolean algebras of projections on a Banach space ([11, XVII.3.XVIII.3], [21, V.3], [16], [6], [12], [13], [14], ]17], [18], [23], [24]). Via the Stone representation space of the Boolean algebra, the theory can be studied through Banach modules over C(K), where K is a compact Hausdorff space. One of the key concepts in the theory is the notion of Bade functionals. If X is a Banach C(K)-module and x ε X, then a Bade...
A generalized fixed point free automorphism of prime power order Ercan, Gülin (2012-06-01) Let G be a finite group and alpha be an automorphism of G of order p(n) for an odd prime p. Suppose that alpha acts fixed point freely on every alpha-invariant p'-section of G, and acts trivially or exceptionally on every elementary abelian alpha-invariant p-section of G. It is proved that G is a solvable p-nilpotent group of nilpotent length at most n + 1, and this bound is best possible.
A partial order on the group of contactomorphisms of R2n+1 via generating functions Bhupal, Mohan Lal (2001-1-01)
A GENERALIZED FIXED-POINT-FREE ACTION Güloğlu, İsmail Şuayip; Ercan, Gülin (2013-05-01) In this paper we study the structure of a finite group G admitting a solvable group A of automorphisms of coprime order so that for any x epsilon C-G(A) of prime order or of order 4, every conjugate of x in G is also contained in C-G(A). Under this hypothesis it is proven that the subgroup [G, A] is solvable. Also an upper bound for the nilpotent height of [G, A] in terms of the number of primes dividing the order of A is obtained in the case where A is abelian.
A generalizaton of the theorem of Riemann-Roch. Karakaş, H. İ.; Department of Mathematics (1970)

Citation Formats

S. Finashin, “A Pin−-cobordism invariant and a generalization of the Rokhlin signature congruence,” Leningrad Math. J., 2:4 (1991), 917–92, vol. 2, no. 4, pp. 917–924, 1991, Accessed: 00, 2021. [Online]. Available: https://hdl.handle.net/11511/92754.