Geodesic
Left Cauchy Integral Bases in Linear Topological Spaces
Canadian mathematical bulletin, Tome 13 (1970) no. 4, pp. 431-439

Voir la notice de l'article provenant de la source Cambridge University Press

The purpose of this paper is to consider a representation for the elements of a linear topological space in the form of a σ-integral over a linearly ordered subset of V; this ordered subset is what will be called an L basis. The formal definition of an L basis is essentially an abstraction from ideas used, often tacitly, in proofs of many of the theorems concerning integral representations for continuous linear functionals on function spaces.The L basis constructed in this paper differs in several basic ways from the integral basis considered by Edwards in [5]. Since the integrals used here are of Hellinger type rather than Radon type one has in the approximating sums for the integral an immediate and natural analogue to the partial sum operators of summation basis theory. 
Dyer, James A. Left Cauchy Integral Bases in Linear Topological Spaces. Canadian mathematical bulletin, Tome 13 (1970) no. 4, pp. 431-439. doi: 10.4153/CMB-1970-080-2
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