- Frölicher space
In
mathematics , Frölicher spaces extend the notions ofcalculus andsmooth manifold s. They were introduced in 1982 by themathematician Alfred Frölicher .Definition
A Frölicher space consists of a non-empty set "X" together with a subset "C" of Hom(R, "X") called the set of smooth curves, and a subset "F" of Hom("X", R) called the set of smooth real functions, such that for each real function
:"f" : "X" → R
in "F" and each curve
:"c" : R → "X"
in "C", the following axioms are satisfied:
# "f" in "F" if and only if for each "γ" in "C", "f" . "γ" in C∞(R, R)
# "c" in "C" if and only if for each "φ" in "F", "φ" . "c" in C∞(R, R)Let "A" and "B" be two Frölicher spaces. A map
:"m" : "A" → "B"
is called "smooth" if for each smooth curve "c" in "C""A", "m"."c" is in "C""B". Furthermore the space of all such smooth maps has itself the structure of a Frölicher space. The smooth functions on ":"C∞("A", "B")
are the images of:
References
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