Results 1 to 7 of about 9 (7)
A study of uniformities on the space of uniformly continuous mappings
Open Mathematics, 2020 New families of uniformities are introduced on UC(X,Y)UC(X,Y), the class of uniformly continuous mappings between X and Y, where (X,U)(X,{\mathcal{U}}) and (Y,V)(Y,{\mathcal{V}}) are uniform spaces.
Gupta Ankit +3 more
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A study of function space topologies for multifunctions
Applied General Topology, 2017 Function space topologies are investigated for the class of continuous multifunctions. Using the notion of continuous convergence, splittingness and admissibility are discussed for the topologies on continuous multifunctions. The theory of net of sets is
Ankit Gupta, Ratna Dev Sarma
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Dual uniformities in function spaces over uniform continuity
Open Mathematics, 2022 The notion of dual uniformity is introduced on UC(Y,Z)UC(Y,Z), the uniform space of uniformly continuous mappings between YY and ZZ, where (Y,V)(Y,{\mathcal{V}}) and (Z,U)(Z,{\mathcal{U}}) are two uniform spaces.
Gupta Ankit +3 more
doaj +1 more source
Photoionization of Excimers Produced in Naphthalene Clusters
Laser Chemistry, Volume 13, Issue 3-4, Page 241-257, 1994., 1994 The excited‐state dynamics of small naphthalene clusters that occur upon selective excitation into S1 vibronic levels have been investigated by mass‐selective pump‐probe photoionization spectroscopy. The results provide direct evidence for structural isomerization of the initially excited van der Waals cluster into an excimer geometry, consistent with ...
Hiroyuki Saigusa
wiley +1 more source
Splittingness of coatoms of the lattice of $I$-radical over perfect rings
Matematychni Studii, 2007 O. Horbachuk, Yu. Maturin
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UN ESTUDIO DE ESTRUCTURAS TOPOLÓGICAS EN MAPEOS EQUI-CONTINUOS
, 2021 Function space topologies are developed for EC(Y,Z), the class of equi-continuous mappings from a topological space Y to a uniform space Z. Properties such as splittingness, admissibility etc. are defined for such spaces. The net theoretic investigations
Gupta, Ankit +2 more
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Conditional Fredholm determinant for the S-periodic orbits in Hamiltonian systems
, 2011 For S being a symplectic orthogonal matrix on R2n, the S-periodic orbits in Hamiltonian systems are a solution which satisfies x(0)=Sx(T) for some period T.
Xijun Hu +3 more
core +1 more source